\chapter{Basic Language Elements}\label{ch:pure-syntax}
Subsequently, we introduce the main part of Pure Isar theory and proof
commands, together with fundamental proof methods and attributes.
Chapter~\ref{ch:gen-tools} describes further Isar elements provided by generic
tools and packages (such as the Simplifier) that are either part of Pure
Isabelle or pre-installed by most object logics. Chapter~\ref{ch:hol-tools}
refers to actual object-logic specific elements of Isabelle/HOL.
\medskip
Isar commands may be either \emph{proper} document constructors, or
\emph{improper commands}. Some proof methods and attributes introduced later
are classified as improper as well. Improper Isar language elements, which
are subsequently marked by ``$^*$'', are often helpful when developing proof
documents, while their use is discouraged for the final outcome. Typical
examples are diagnostic commands that print terms or theorems according to the
current context; other commands even emulate old-style tactical theorem
proving.
\section{Theory specification commands}
\subsection{Defining theories}\label{sec:begin-thy}
\indexisarcmd{header}\indexisarcmd{theory}\indexisarcmd{end}\indexisarcmd{context}
\begin{matharray}{rcl}
\isarcmd{header} & : & \isarkeep{toplevel} \\
\isarcmd{theory} & : & \isartrans{toplevel}{theory} \\
\isarcmd{context}^* & : & \isartrans{toplevel}{theory} \\
\isarcmd{end} & : & \isartrans{theory}{toplevel} \\
\end{matharray}
Isabelle/Isar ``new-style'' theories are either defined via theory files or
interactively. Both theory-level specifications and proofs are handled
uniformly --- occasionally definitional mechanisms even require some explicit
proof as well. In contrast, ``old-style'' Isabelle theories support batch
processing only, with the proof scripts collected in separate ML files.
The first actual command of any theory has to be $\THEORY$, starting a new
theory based on the merge of existing ones. Just preceding $\THEORY$, there
may be an optional $\isarkeyword{header}$ declaration, which is relevant to
document preparation only; it acts very much like a special pre-theory markup
command (cf.\ \S\ref{sec:markup-thy} and \S\ref{sec:markup-thy}). The theory
context may be also changed by $\CONTEXT$ without creating a new theory. In
both cases, $\END$ concludes the theory development; it has to be the very
last command of any theory file.
\begin{rail}
'header' text
;
'theory' name '=' (name + '+') filespecs? ':'
;
'context' name
;
'end'
;;
filespecs: 'files' ((name | parname) +);
\end{rail}
\begin{descr}
\item [$\isarkeyword{header}~text$] provides plain text markup just preceding
the formal beginning of a theory. In actual document preparation the
corresponding {\LaTeX} macro \verb,\isamarkupheader, may be redefined to
produce chapter or section headings. See also \S\ref{sec:markup-thy} and
\S\ref{sec:markup-prf} for further markup commands.
\item [$\THEORY~A = B@1 + \cdots + B@n\colon$] commences a new theory $A$
based on existing ones $B@1 + \cdots + B@n$. Isabelle's theory loader
system ensures that any of the base theories are properly loaded (and fully
up-to-date when $\THEORY$ is executed interactively). The optional
$\isarkeyword{files}$ specification declares additional dependencies on ML
files. Unless put in parentheses, any file will be loaded immediately via
$\isarcmd{use}$ (see also \S\ref{sec:ML}). The optional ML file
\texttt{$A$.ML} that may be associated with any theory should \emph{not} be
included in $\isarkeyword{files}$, though.
\item [$\CONTEXT~B$] enters an existing theory context, basically in read-only
mode, so only a limited set of commands may be performed without destroying
the theory. Just as for $\THEORY$, the theory loader ensures that $B$ is
loaded and up-to-date.
\item [$\END$] concludes the current theory definition or context switch.
Note that this command cannot be undone, but the whole theory definition has
to be retracted.
\end{descr}
\subsection{Theory markup commands}\label{sec:markup-thy}
\indexisarcmd{chapter}\indexisarcmd{section}\indexisarcmd{subsection}
\indexisarcmd{subsubsection}\indexisarcmd{text}\indexisarcmd{text-raw}
\begin{matharray}{rcl}
\isarcmd{chapter} & : & \isartrans{theory}{theory} \\
\isarcmd{section} & : & \isartrans{theory}{theory} \\
\isarcmd{subsection} & : & \isartrans{theory}{theory} \\
\isarcmd{subsubsection} & : & \isartrans{theory}{theory} \\
\isarcmd{text} & : & \isartrans{theory}{theory} \\
\isarcmd{text_raw} & : & \isartrans{theory}{theory} \\
\end{matharray}
Apart from formal comments (see \S\ref{sec:comments}), markup commands provide
a structured way to insert text into the document generated from a theory (see
\cite{isabelle-sys} for more information on Isabelle's document preparation
tools).
\railalias{textraw}{text\_raw}
\railterm{textraw}
\begin{rail}
('chapter' | 'section' | 'subsection' | 'subsubsection' | 'text' | textraw) text
;
\end{rail}
\begin{descr}
\item [$\isarkeyword{chapter}$, $\isarkeyword{section}$,
$\isarkeyword{subsection}$, and $\isarkeyword{subsubsection}$] mark chapter
and section headings.
\item [$\TEXT$] specifies paragraphs of plain text, including references to
formal entities (see also \S\ref{sec:antiq} on ``antiquotations'').
\item [$\isarkeyword{text_raw}$] inserts {\LaTeX} source into the output,
without additional markup. Thus the full range of document manipulations
becomes available.
\end{descr}
Any of these markup elements corresponds to a {\LaTeX} command with the name
prefixed by \verb,\isamarkup,. For the sectioning commands this is a plain
macro with a single argument, e.g.\ \verb,\isamarkupchapter{,\dots\verb,}, for
$\isarkeyword{chapter}$. The $\isarkeyword{text}$ markup results in a
{\LaTeX} environment \verb,\begin{isamarkuptext}, {\dots}
\verb,\end{isamarkuptext},, while $\isarkeyword{text_raw}$ causes the text
to be inserted directly into the {\LaTeX} source.
\medskip
Additional markup commands are available for proofs (see
\S\ref{sec:markup-prf}). Also note that the $\isarkeyword{header}$
declaration (see \S\ref{sec:begin-thy}) admits to insert section markup just
preceding the actual theory definition.
\subsection{Type classes and sorts}\label{sec:classes}
\indexisarcmd{classes}\indexisarcmd{classrel}\indexisarcmd{defaultsort}
\begin{matharray}{rcl}
\isarcmd{classes} & : & \isartrans{theory}{theory} \\
\isarcmd{classrel} & : & \isartrans{theory}{theory} \\
\isarcmd{defaultsort} & : & \isartrans{theory}{theory} \\
\end{matharray}
\begin{rail}
'classes' (classdecl comment? +)
;
'classrel' nameref ('<' | subseteq) nameref comment?
;
'defaultsort' sort comment?
;
\end{rail}
\begin{descr}
\item [$\isarkeyword{classes}~c \subseteq \vec c$] declares class $c$ to be a
subclass of existing classes $\vec c$. Cyclic class structures are ruled
out.
\item [$\isarkeyword{classrel}~c@1 \subseteq c@2$] states a subclass relation
between existing classes $c@1$ and $c@2$. This is done axiomatically! The
$\INSTANCE$ command (see \S\ref{sec:axclass}) provides a way to introduce
proven class relations.
\item [$\isarkeyword{defaultsort}~s$] makes sort $s$ the new default sort for
any type variables given without sort constraints. Usually, the default
sort would be only changed when defining new object-logics.
\end{descr}
\subsection{Primitive types and type abbreviations}\label{sec:types-pure}
\indexisarcmd{typedecl}\indexisarcmd{types}\indexisarcmd{nonterminals}\indexisarcmd{arities}
\begin{matharray}{rcl}
\isarcmd{types} & : & \isartrans{theory}{theory} \\
\isarcmd{typedecl} & : & \isartrans{theory}{theory} \\
\isarcmd{nonterminals} & : & \isartrans{theory}{theory} \\
\isarcmd{arities} & : & \isartrans{theory}{theory} \\
\end{matharray}
\begin{rail}
'types' (typespec '=' type infix? comment? +)
;
'typedecl' typespec infix? comment?
;
'nonterminals' (name +) comment?
;
'arities' (nameref '::' arity comment? +)
;
\end{rail}
\begin{descr}
\item [$\TYPES~(\vec\alpha)t = \tau$] introduces \emph{type synonym}
$(\vec\alpha)t$ for existing type $\tau$. Unlike actual type definitions,
as are available in Isabelle/HOL for example, type synonyms are just purely
syntactic abbreviations without any logical significance. Internally, type
synonyms are fully expanded.
\item [$\isarkeyword{typedecl}~(\vec\alpha)t$] declares a new type constructor
$t$, intended as an actual logical type. Note that object-logics such as
Isabelle/HOL override $\isarkeyword{typedecl}$ by their own version.
\item [$\isarkeyword{nonterminals}~\vec c$] declares $0$-ary type constructors
$\vec c$ to act as purely syntactic types, i.e.\ nonterminal symbols of
Isabelle's inner syntax of terms or types.
\item [$\isarkeyword{arities}~t::(\vec s)s$] augments Isabelle's order-sorted
signature of types by new type constructor arities. This is done
axiomatically! The $\INSTANCE$ command (see \S\ref{sec:axclass}) provides a
way to introduce proven type arities.
\end{descr}
\subsection{Constants and simple definitions}\label{sec:consts}
\indexisarcmd{consts}\indexisarcmd{defs}\indexisarcmd{constdefs}\indexoutertoken{constdecl}
\begin{matharray}{rcl}
\isarcmd{consts} & : & \isartrans{theory}{theory} \\
\isarcmd{defs} & : & \isartrans{theory}{theory} \\
\isarcmd{constdefs} & : & \isartrans{theory}{theory} \\
\end{matharray}
\begin{rail}
'consts' (constdecl +)
;
'defs' ('(overloaded)')? (axmdecl prop comment? +)
;
'constdefs' (constdecl prop comment? +)
;
constdecl: name '::' type mixfix? comment?
;
\end{rail}
\begin{descr}
\item [$\CONSTS~c::\sigma$] declares constant $c$ to have any instance of type
scheme $\sigma$. The optional mixfix annotations may attach concrete syntax
to the constants declared.
\item [$\DEFS~name: eqn$] introduces $eqn$ as a definitional axiom for some
existing constant. See \cite[\S6]{isabelle-ref} for more details on the
form of equations admitted as constant definitions.
The $overloaded$ option declares definitions to be potentially overloaded.
Unless this option is given, a warning message would be issued for any
definitional equation with a more special type than that of the
corresponding constant declaration.
\item [$\isarkeyword{constdefs}~c::\sigma~eqn$] combines declarations and
definitions of constants, using the canonical name $c_def$ for the
definitional axiom.
\end{descr}
\subsection{Syntax and translations}\label{sec:syn-trans}
\indexisarcmd{syntax}\indexisarcmd{translations}
\begin{matharray}{rcl}
\isarcmd{syntax} & : & \isartrans{theory}{theory} \\
\isarcmd{translations} & : & \isartrans{theory}{theory} \\
\end{matharray}
\railalias{rightleftharpoons}{\isasymrightleftharpoons}
\railterm{rightleftharpoons}
\railalias{rightharpoonup}{\isasymrightharpoonup}
\railterm{rightharpoonup}
\railalias{leftharpoondown}{\isasymleftharpoondown}
\railterm{leftharpoondown}
\begin{rail}
'syntax' ('(' ( name | 'output' | name 'output' ) ')')? (constdecl +)
;
'translations' (transpat ('==' | '=>' | '<=' | rightleftharpoons | rightharpoonup | leftharpoondown) transpat comment? +)
;
transpat: ('(' nameref ')')? string
;
\end{rail}
\begin{descr}
\item [$\isarkeyword{syntax}~(mode)~decls$] is similar to $\CONSTS~decls$,
except that the actual logical signature extension is omitted. Thus the
context free grammar of Isabelle's inner syntax may be augmented in
arbitrary ways, independently of the logic. The $mode$ argument refers to
the print mode that the grammar rules belong; unless the \texttt{output}
flag is given, all productions are added both to the input and output
grammar.
\item [$\isarkeyword{translations}~rules$] specifies syntactic translation
rules (i.e.\ \emph{macros}): parse~/ print rules (\texttt{==} or
\isasymrightleftharpoons), parse rules (\texttt{=>} or
\isasymrightharpoonup), or print rules (\texttt{<=} or
\isasymleftharpoondown). Translation patterns may be prefixed by the
syntactic category to be used for parsing; the default is \texttt{logic}.
\end{descr}
\subsection{Axioms and theorems}\label{sec:axms-thms}
\indexisarcmd{axioms}\indexisarcmd{lemmas}\indexisarcmd{theorems}
\begin{matharray}{rcl}
\isarcmd{axioms} & : & \isartrans{theory}{theory} \\
\isarcmd{lemmas} & : & \isartrans{theory}{theory} \\
\isarcmd{theorems} & : & \isartrans{theory}{theory} \\
\end{matharray}
\begin{rail}
'axioms' (axmdecl prop comment? +)
;
('lemmas' | 'theorems') (thmdef? thmrefs comment? + 'and')
;
\end{rail}
\begin{descr}
\item [$\isarkeyword{axioms}~a: \phi$] introduces arbitrary statements as
axioms of the meta-logic. In fact, axioms are ``axiomatic theorems'', and
may be referred later just as any other theorem.
Axioms are usually only introduced when declaring new logical systems.
Everyday work is typically done the hard way, with proper definitions and
actual proven theorems.
\item [$\isarkeyword{lemmas}~a = \vec b$] stores existing facts. Typical
applications would also involve attributes, to declare Simplifier rules, for
example.
\item [$\isarkeyword{theorems}$] is essentially the same as
$\isarkeyword{lemmas}$, but marks the result as a different kind of facts.
\end{descr}
\subsection{Name spaces}
\indexisarcmd{global}\indexisarcmd{local}\indexisarcmd{hide}
\begin{matharray}{rcl}
\isarcmd{global} & : & \isartrans{theory}{theory} \\
\isarcmd{local} & : & \isartrans{theory}{theory} \\
\isarcmd{hide} & : & \isartrans{theory}{theory} \\
\end{matharray}
\begin{rail}
'global' comment?
;
'local' comment?
;
'hide' name (nameref + ) comment?
;
\end{rail}
Isabelle organizes any kind of name declarations (of types, constants,
theorems etc.) by separate hierarchically structured name spaces. Normally
the user does not have to control the behavior of name spaces by hand, yet the
following commands provide some way to do so.
\begin{descr}
\item [$\isarkeyword{global}$ and $\isarkeyword{local}$] change the current
name declaration mode. Initially, theories start in $\isarkeyword{local}$
mode, causing all names to be automatically qualified by the theory name.
Changing this to $\isarkeyword{global}$ causes all names to be declared
without the theory prefix, until $\isarkeyword{local}$ is declared again.
Note that global names are prone to get hidden accidently later, when
qualified names of the same base name are introduced.
\item [$\isarkeyword{hide}~space~names$] removes declarations from a given
name space (which may be $class$, $type$, or $const$). Hidden objects
remain valid within the logic, but are inaccessible from user input. In
output, the special qualifier ``$\mathord?\mathord?$'' is prefixed to the
full internal name.
Unqualified (global) names may not be hidden deliberately.
\end{descr}
\subsection{Incorporating ML code}\label{sec:ML}
\indexisarcmd{use}\indexisarcmd{ML}\indexisarcmd{ML-command}
\indexisarcmd{ML-setup}\indexisarcmd{setup}
\indexisarcmd{method-setup}
\begin{matharray}{rcl}
\isarcmd{use} & : & \isartrans{\cdot}{\cdot} \\
\isarcmd{ML} & : & \isartrans{\cdot}{\cdot} \\
\isarcmd{ML_command} & : & \isartrans{\cdot}{\cdot} \\
\isarcmd{ML_setup} & : & \isartrans{theory}{theory} \\
\isarcmd{setup} & : & \isartrans{theory}{theory} \\
\isarcmd{method_setup} & : & \isartrans{theory}{theory} \\
\end{matharray}
\railalias{MLsetup}{ML\_setup}
\railterm{MLsetup}
\railalias{methodsetup}{method\_setup}
\railterm{methodsetup}
\railalias{MLcommand}{ML\_command}
\railterm{MLcommand}
\begin{rail}
'use' name comment?
;
('ML' | MLcommand | MLsetup | 'setup') text comment?
;
methodsetup name '=' text text comment?
;
\end{rail}
\begin{descr}
\item [$\isarkeyword{use}~file$] reads and executes ML commands from $file$.
The current theory context (if present) is passed down to the ML session,
but may not be modified. Furthermore, the file name is checked with the
$\isarkeyword{files}$ dependency declaration given in the theory header (see
also \S\ref{sec:begin-thy}).
\item [$\isarkeyword{ML}~text$ and $\isarkeyword{ML_command}~text$] execute ML
commands from $text$. The theory context is passed in the same way as for
$\isarkeyword{use}$, but may not be changed. Note that the output of
$\isarkeyword{ML_command}$ is less verbose than plain $\isarkeyword{ML}$.
\item [$\isarkeyword{ML_setup}~text$] executes ML commands from $text$. The
theory context is passed down to the ML session, and fetched back
afterwards. Thus $text$ may actually change the theory as a side effect.
\item [$\isarkeyword{setup}~text$] changes the current theory context by
applying $text$, which refers to an ML expression of type
\texttt{(theory~->~theory)~list}. The $\isarkeyword{setup}$ command is the
canonical way to initialize any object-logic specific tools and packages
written in ML.
\item [$\isarkeyword{method_setup}~name = text~description$] defines a proof
method in the current theory. The given $text$ has to be an ML expression
of type \texttt{Args.src -> Proof.context -> Proof.method}. Parsing
concrete method syntax from \texttt{Args.src} input can be quite tedious in
general. The following simple examples are for methods without any explicit
arguments, or a list of theorems, respectively.
{\footnotesize
\begin{verbatim}
Method.no_args (Method.METHOD (fn facts => foobar_tac))
Method.thms_args (fn thms => Method.METHOD (fn facts => foobar_tac))
Method.ctxt_args (fn ctxt => Method.METHOD (fn facts => foobar_tac))
Method.thms_ctxt_args (fn thms => fn ctxt =>
Method.METHOD (fn facts => foobar_tac))
\end{verbatim}
}
Note that mere tactic emulations may ignore the \texttt{facts} parameter
above. Proper proof methods would do something ``appropriate'' with the list
of current facts, though. Single-rule methods usually do strict
forward-chaining (e.g.\ by using \texttt{Method.multi_resolves}), while
automatic ones just insert the facts using \texttt{Method.insert_tac} before
applying the main tactic.
\end{descr}
\subsection{Syntax translation functions}
\indexisarcmd{parse-ast-translation}\indexisarcmd{parse-translation}
\indexisarcmd{print-translation}\indexisarcmd{typed-print-translation}
\indexisarcmd{print-ast-translation}\indexisarcmd{token-translation}
\begin{matharray}{rcl}
\isarcmd{parse_ast_translation} & : & \isartrans{theory}{theory} \\
\isarcmd{parse_translation} & : & \isartrans{theory}{theory} \\
\isarcmd{print_translation} & : & \isartrans{theory}{theory} \\
\isarcmd{typed_print_translation} & : & \isartrans{theory}{theory} \\
\isarcmd{print_ast_translation} & : & \isartrans{theory}{theory} \\
\isarcmd{token_translation} & : & \isartrans{theory}{theory} \\
\end{matharray}
\railalias{parseasttranslation}{parse\_ast\_translation}
\railterm{parseasttranslation}
\railalias{parsetranslation}{parse\_translation}
\railterm{parsetranslation}
\railalias{printtranslation}{print\_translation}
\railterm{printtranslation}
\railalias{typedprinttranslation}{typed\_print\_translation}
\railterm{typedprinttranslation}
\railalias{printasttranslation}{print\_ast\_translation}
\railterm{printasttranslation}
\railalias{tokentranslation}{token\_translation}
\railterm{tokentranslation}
\begin{rail}
( parseasttranslation | parsetranslation | printtranslation | typedprinttranslation |
printasttranslation | tokentranslation ) text comment?
\end{rail}
Syntax translation functions written in ML admit almost arbitrary
manipulations of Isabelle's inner syntax. Any of the above commands have a
single \railqtoken{text} argument that refers to an ML expression of
appropriate type.
\begin{ttbox}
val parse_ast_translation : (string * (ast list -> ast)) list
val parse_translation : (string * (term list -> term)) list
val print_translation : (string * (term list -> term)) list
val typed_print_translation :
(string * (bool -> typ -> term list -> term)) list
val print_ast_translation : (string * (ast list -> ast)) list
val token_translation :
(string * string * (string -> string * real)) list
\end{ttbox}
See \cite[\S8]{isabelle-ref} for more information on syntax transformations.
\subsection{Oracles}
\indexisarcmd{oracle}
\begin{matharray}{rcl}
\isarcmd{oracle} & : & \isartrans{theory}{theory} \\
\end{matharray}
Oracles provide an interface to external reasoning systems, without giving up
control completely --- each theorem carries a derivation object recording any
oracle invocation. See \cite[\S6]{isabelle-ref} for more information.
\begin{rail}
'oracle' name '=' text comment?
;
\end{rail}
\begin{descr}
\item [$\isarkeyword{oracle}~name=text$] declares oracle $name$ to be ML
function $text$, which has to be of type
\texttt{Sign.sg~*~Object.T~->~term}.
\end{descr}
\section{Proof commands}
Proof commands perform transitions of Isar/VM machine configurations, which
are block-structured, consisting of a stack of nodes with three main
components: logical proof context, current facts, and open goals. Isar/VM
transitions are \emph{typed} according to the following three different modes
of operation:
\begin{descr}
\item [$proof(prove)$] means that a new goal has just been stated that is now
to be \emph{proven}; the next command may refine it by some proof method,
and enter a sub-proof to establish the actual result.
\item [$proof(state)$] is like a nested theory mode: the context may be
augmented by \emph{stating} additional assumptions, intermediate results
etc.
\item [$proof(chain)$] is intermediate between $proof(state)$ and
$proof(prove)$: existing facts (i.e.\ the contents of the special ``$this$''
register) have been just picked up in order to be used when refining the
goal claimed next.
\end{descr}
%FIXME diagram?
\subsection{Proof markup commands}\label{sec:markup-prf}
\indexisarcmd{sect}\indexisarcmd{subsect}\indexisarcmd{subsubsect}
\indexisarcmd{txt}\indexisarcmd{txt-raw}
\begin{matharray}{rcl}
\isarcmd{sect} & : & \isartrans{proof}{proof} \\
\isarcmd{subsect} & : & \isartrans{proof}{proof} \\
\isarcmd{subsubsect} & : & \isartrans{proof}{proof} \\
\isarcmd{txt} & : & \isartrans{proof}{proof} \\
\isarcmd{txt_raw} & : & \isartrans{proof}{proof} \\
\end{matharray}
These markup commands for proof mode closely correspond to the ones of theory
mode (see \S\ref{sec:markup-thy}).
\railalias{txtraw}{txt\_raw}
\railterm{txtraw}
\begin{rail}
('sect' | 'subsect' | 'subsubsect' | 'txt' | txtraw) text
;
\end{rail}
\subsection{Proof context}\label{sec:proof-context}
\indexisarcmd{fix}\indexisarcmd{assume}\indexisarcmd{presume}\indexisarcmd{def}
\begin{matharray}{rcl}
\isarcmd{fix} & : & \isartrans{proof(state)}{proof(state)} \\
\isarcmd{assume} & : & \isartrans{proof(state)}{proof(state)} \\
\isarcmd{presume} & : & \isartrans{proof(state)}{proof(state)} \\
\isarcmd{def} & : & \isartrans{proof(state)}{proof(state)} \\
\end{matharray}
The logical proof context consists of fixed variables and assumptions. The
former closely correspond to Skolem constants, or meta-level universal
quantification as provided by the Isabelle/Pure logical framework.
Introducing some \emph{arbitrary, but fixed} variable via $\FIX x$ results in
a local value that may be used in the subsequent proof as any other variable
or constant. Furthermore, any result $\edrv \phi[x]$ exported from the
context will be universally closed wrt.\ $x$ at the outermost level: $\edrv
\All x \phi$ (this is expressed using Isabelle's meta-variables).
Similarly, introducing some assumption $\chi$ has two effects. On the one
hand, a local theorem is created that may be used as a fact in subsequent
proof steps. On the other hand, any result $\chi \drv \phi$ exported from the
context becomes conditional wrt.\ the assumption: $\edrv \chi \Imp \phi$.
Thus, solving an enclosing goal using such a result would basically introduce
a new subgoal stemming from the assumption. How this situation is handled
depends on the actual version of assumption command used: while $\ASSUMENAME$
insists on solving the subgoal by unification with some premise of the goal,
$\PRESUMENAME$ leaves the subgoal unchanged in order to be proved later by the
user.
Local definitions, introduced by $\DEF{}{x \equiv t}$, are achieved by
combining $\FIX x$ with another version of assumption that causes any
hypothetical equation $x \equiv t$ to be eliminated by the reflexivity rule.
Thus, exporting some result $x \equiv t \drv \phi[x]$ yields $\edrv \phi[t]$.
\railalias{equiv}{\isasymequiv}
\railterm{equiv}
\begin{rail}
'fix' (vars comment? + 'and')
;
('assume' | 'presume') (props comment? + 'and')
;
'def' thmdecl? \\ name ('==' | equiv) term termpat? comment?
;
\end{rail}
\begin{descr}
\item [$\FIX{\vec x}$] introduces local \emph{arbitrary, but fixed} variables
$\vec x$.
\item [$\ASSUME{a}{\vec\phi}$ and $\PRESUME{a}{\vec\phi}$] introduce local
theorems $\vec\phi$ by assumption. Subsequent results applied to an
enclosing goal (e.g.\ by $\SHOWNAME$) are handled as follows: $\ASSUMENAME$
expects to be able to unify with existing premises in the goal, while
$\PRESUMENAME$ leaves $\vec\phi$ as new subgoals.
Several lists of assumptions may be given (separated by
$\isarkeyword{and}$); the resulting list of current facts consists of all of
these concatenated.
\item [$\DEF{a}{x \equiv t}$] introduces a local (non-polymorphic) definition.
In results exported from the context, $x$ is replaced by $t$. Basically,
$\DEF{}{x \equiv t}$ abbreviates $\FIX{x}~\ASSUME{}{x \equiv t}$, with the
resulting hypothetical equation solved by reflexivity.
The default name for the definitional equation is $x_def$.
\end{descr}
The special name $prems$\indexisarthm{prems} refers to all assumptions of the
current context as a list of theorems.
\subsection{Facts and forward chaining}
\indexisarcmd{note}\indexisarcmd{then}\indexisarcmd{from}\indexisarcmd{with}
\begin{matharray}{rcl}
\isarcmd{note} & : & \isartrans{proof(state)}{proof(state)} \\
\isarcmd{then} & : & \isartrans{proof(state)}{proof(chain)} \\
\isarcmd{from} & : & \isartrans{proof(state)}{proof(chain)} \\
\isarcmd{with} & : & \isartrans{proof(state)}{proof(chain)} \\
\end{matharray}
New facts are established either by assumption or proof of local statements.
Any fact will usually be involved in further proofs, either as explicit
arguments of proof methods, or when forward chaining towards the next goal via
$\THEN$ (and variants). Note that the special theorem name
$this$\indexisarthm{this} refers to the most recently established facts.
\begin{rail}
'note' (thmdef? thmrefs comment? + 'and')
;
'then' comment?
;
('from' | 'with') (thmrefs comment? + 'and')
;
\end{rail}
\begin{descr}
\item [$\NOTE{a}{\vec b}$] recalls existing facts $\vec b$, binding the result
as $a$. Note that attributes may be involved as well, both on the left and
right hand sides.
\item [$\THEN$] indicates forward chaining by the current facts in order to
establish the goal to be claimed next. The initial proof method invoked to
refine that will be offered the facts to do ``anything appropriate'' (cf.\
also \S\ref{sec:proof-steps}). For example, method $rule$ (see
\S\ref{sec:pure-meth-att}) would typically do an elimination rather than an
introduction. Automatic methods usually insert the facts into the goal
state before operation. This provides a simple scheme to control relevance
of facts in automated proof search.
\item [$\FROM{\vec b}$] abbreviates $\NOTE{}{\vec b}~\THEN$; thus $\THEN$ is
equivalent to $\FROM{this}$.
\item [$\WITH{\vec b}$] abbreviates $\FROM{\vec b~this}$; thus the forward
chaining is from earlier facts together with the current ones.
\end{descr}
Basic proof methods (such as $rule$, see \S\ref{sec:pure-meth-att}) expect
multiple facts to be given in their proper order, corresponding to a prefix of
the premises of the rule involved. Note that positions may be easily skipped
using something like $\FROM{\Text{\texttt{_}}~a~b}$, for example. This
involves the trivial rule $\PROP\psi \Imp \PROP\psi$, which happens to be
bound in Isabelle/Pure as ``\texttt{_}''
(underscore).\indexisarthm{_@\texttt{_}}
Forward chaining with an empty list of theorems is the same as not chaining.
Thus $\FROM{nothing}$ has no effect apart from entering $prove(chain)$ mode,
since $nothing$\indexisarthm{nothing} is bound to the empty list of facts.
\subsection{Goal statements}
\indexisarcmd{lemma}\indexisarcmd{theorem}\indexisarcmd{corollary}
\indexisarcmd{have}\indexisarcmd{show}\indexisarcmd{hence}\indexisarcmd{thus}
\begin{matharray}{rcl}
\isarcmd{lemma} & : & \isartrans{theory}{proof(prove)} \\
\isarcmd{theorem} & : & \isartrans{theory}{proof(prove)} \\
\isarcmd{corollary} & : & \isartrans{theory}{proof(prove)} \\
\isarcmd{have} & : & \isartrans{proof(state) ~|~ proof(chain)}{proof(prove)} \\
\isarcmd{show} & : & \isartrans{proof(state) ~|~ proof(chain)}{proof(prove)} \\
\isarcmd{hence} & : & \isartrans{proof(state)}{proof(prove)} \\
\isarcmd{thus} & : & \isartrans{proof(state)}{proof(prove)} \\
\end{matharray}
From a theory context, proof mode is entered from theory mode by initial goal
commands $\LEMMANAME$, $\THEOREMNAME$, and $\COROLLARYNAME$. Within a proof,
new claims may be introduced locally as well; four variants are available,
indicating whether the result is meant to solve some pending goal or whether
forward chaining is indicated.
Goals may consist of multiple statements, resulting in a list of facts
eventually. A pending multi-goal is internally represented as a meta-level
conjunction (printed as \verb,&&,), which is automatically split into the
corresponding number of sub-goals prior to any initial method application, via
$\PROOFNAME$ (\S\ref{sec:proof-steps}) or $\APPLYNAME$
(\S\ref{sec:tactic-commands}).\footnote{Deviating from the latter principle,
the $induct$ method covered in \S\ref{sec:cases-induct-meth} acts on
multiple claims simultaneously.}
%FIXME define locale, context
\begin{rail}
('lemma' | 'theorem' | 'corollary') locale context goal
;
('have' | 'show' | 'hence' | 'thus') goal
;
goal: (props comment? + 'and')
;
\end{rail}
\begin{descr}
\item [$\LEMMA{a}{\vec\phi}$] enters proof mode with $\vec\phi$ as main goal,
eventually resulting in some fact $\turn \vec\phi$ to be put back into the
theory context, and optionally into the specified locale, cf.\
\S\ref{sec:locale}. An additional \railnonterm{context} specification may
build an initial proof context for the subsequent claim; this may include
local definitions and syntax as well, see \S\ref{sec:locale} for more
information.
\item [$\THEOREM{a}{\vec\phi}$ and $\COROLLARY{a}{\vec\phi}$] are essentially
the same as $\LEMMA{a}{\vec\phi}$, but the facts are internally marked as
being of a different kind. This discrimination acts like a formal comment.
\item [$\HAVE{a}{\vec\phi}$] claims a local goal, eventually resulting in a
fact within the current logical context. This operation is completely
independent of any pending sub-goals of an enclosing goal statements, so
$\HAVENAME$ may be freely used for experimental exploration of potential
results within a proof body.
\item [$\SHOW{a}{\vec\phi}$] is like $\HAVE{a}{\vec\phi}$ plus a second stage
to refine some pending sub-goal for each one of the finished result, after
having been exported into the corresponding context (at the head of the
sub-proof that the $\SHOWNAME$ command belongs to).
To accommodate interactive debugging, resulting rules are printed before
being applied internally. Even more, interactive execution of $\SHOWNAME$
predicts potential failure after finishing its proof, and displays the
resulting error message as a warning beforehand, adding this header:
\begin{ttbox}
Problem! Local statement will fail to solve any pending goal
\end{ttbox}
\item [$\HENCENAME$] abbreviates $\THEN~\HAVENAME$, i.e.\ claims a local goal
to be proven by forward chaining the current facts. Note that $\HENCENAME$
is also equivalent to $\FROM{this}~\HAVENAME$.
\item [$\THUSNAME$] abbreviates $\THEN~\SHOWNAME$. Note that $\THUSNAME$ is
also equivalent to $\FROM{this}~\SHOWNAME$.
\end{descr}
Any goal statement causes some term abbreviations (such as $\Var{thesis}$,
$\dots$) to be bound automatically, see also \S\ref{sec:term-abbrev}.
Furthermore, the local context of a (non-atomic) goal is provided via the
$rule_context$\indexisarcase{rule-context} case, see also
\S\ref{sec:rule-cases}.
\medskip
\begin{warn}
Isabelle/Isar suffers theory-level goal statements to contain \emph{unbound
schematic variables}, although this does not conform to the aim of
human-readable proof documents! The main problem with schematic goals is
that the actual outcome is usually hard to predict, depending on the
behavior of the actual proof methods applied during the reasoning. Note
that most semi-automated methods heavily depend on several kinds of implicit
rule declarations within the current theory context. As this would also
result in non-compositional checking of sub-proofs, \emph{local goals} are
not allowed to be schematic at all. Nevertheless, schematic goals do have
their use in Prolog-style interactive synthesis of proven results, usually
by stepwise refinement via emulation of traditional Isabelle tactic scripts
(see also \S\ref{sec:tactic-commands}). In any case, users should know what
they are doing.
\end{warn}
\subsection{Initial and terminal proof steps}\label{sec:proof-steps}
\indexisarcmd{proof}\indexisarcmd{qed}\indexisarcmd{by}
\indexisarcmd{.}\indexisarcmd{..}\indexisarcmd{sorry}
\begin{matharray}{rcl}
\isarcmd{proof} & : & \isartrans{proof(prove)}{proof(state)} \\
\isarcmd{qed} & : & \isartrans{proof(state)}{proof(state) ~|~ theory} \\
\isarcmd{by} & : & \isartrans{proof(prove)}{proof(state) ~|~ theory} \\
\isarcmd{.\,.} & : & \isartrans{proof(prove)}{proof(state) ~|~ theory} \\
\isarcmd{.} & : & \isartrans{proof(prove)}{proof(state) ~|~ theory} \\
\isarcmd{sorry} & : & \isartrans{proof(prove)}{proof(state) ~|~ theory} \\
\end{matharray}
Arbitrary goal refinement via tactics is considered harmful. Properly, the
Isar framework admits proof methods to be invoked in two places only.
\begin{enumerate}
\item An \emph{initial} refinement step $\PROOF{m@1}$ reduces a newly stated
goal to a number of sub-goals that are to be solved later. Facts are passed
to $m@1$ for forward chaining, if so indicated by $proof(chain)$ mode.
\item A \emph{terminal} conclusion step $\QED{m@2}$ is intended to solve
remaining goals. No facts are passed to $m@2$.
\end{enumerate}
The only other proper way to affect pending goals is by $\SHOWNAME$, which
involves an explicit statement of what is to be solved.
\medskip
Also note that initial proof methods should either solve the goal completely,
or constitute some well-understood reduction to new sub-goals. Arbitrary
automatic proof tools that are prone leave a large number of badly structured
sub-goals are no help in continuing the proof document in any intelligible
way.
\medskip
Unless given explicitly by the user, the default initial method is ``$rule$'',
which applies a single standard elimination or introduction rule according to
the topmost symbol involved. There is no separate default terminal method.
Any remaining goals are always solved by assumption in the very last step.
\begin{rail}
'proof' interest? meth? comment?
;
'qed' meth? comment?
;
'by' meth meth? comment?
;
('.' | '..' | 'sorry') comment?
;
meth: method interest?
;
\end{rail}
\begin{descr}
\item [$\PROOF{m@1}$] refines the goal by proof method $m@1$; facts for
forward chaining are passed if so indicated by $proof(chain)$ mode.
\item [$\QED{m@2}$] refines any remaining goals by proof method $m@2$ and
concludes the sub-proof by assumption. If the goal had been $\SHOWNAME$ (or
$\THUSNAME$), some pending sub-goal is solved as well by the rule resulting
from the result \emph{exported} into the enclosing goal context. Thus
$\QEDNAME$ may fail for two reasons: either $m@2$ fails, or the resulting
rule does not fit to any pending goal\footnote{This includes any additional
``strong'' assumptions as introduced by $\ASSUMENAME$.} of the enclosing
context. Debugging such a situation might involve temporarily changing
$\SHOWNAME$ into $\HAVENAME$, or weakening the local context by replacing
some occurrences of $\ASSUMENAME$ by $\PRESUMENAME$.
\item [$\BYY{m@1}{m@2}$] is a \emph{terminal proof}\index{proof!terminal}; it
abbreviates $\PROOF{m@1}~\QED{m@2}$, with backtracking across both methods,
though. Debugging an unsuccessful $\BYY{m@1}{m@2}$ commands might be done
by expanding its definition; in many cases $\PROOF{m@1}$ is already
sufficient to see what is going wrong.
\item [``$\DDOT$''] is a \emph{default proof}\index{proof!default}; it
abbreviates $\BY{rule}$.
\item [``$\DOT$''] is a \emph{trivial proof}\index{proof!trivial}; it
abbreviates $\BY{this}$.
\item [$\SORRY$] is a \emph{fake proof}\index{proof!fake} pretending to solve
the pending claim without further ado. This only works in interactive
development, or if the \texttt{quick_and_dirty} flag is enabled. Certainly,
any facts emerging from fake proofs are not the real thing. Internally,
each theorem container is tainted by an oracle invocation, which is
indicated as ``$[!]$'' in the printed result.
The most important application of $\SORRY$ is to support experimentation and
top-down proof development in a simple manner.
\end{descr}
\subsection{Fundamental methods and attributes}\label{sec:pure-meth-att}
The following proof methods and attributes refer to basic logical operations
of Isar. Further methods and attributes are provided by several generic and
object-logic specific tools and packages (see chapters \ref{ch:gen-tools} and
\ref{ch:hol-tools}).
\indexisarmeth{assumption}\indexisarmeth{this}\indexisarmeth{rule}\indexisarmeth{$-$}
\indexisaratt{intro}\indexisaratt{elim}\indexisaratt{dest}\indexisaratt{rule}
\indexisaratt{OF}\indexisaratt{of}
\begin{matharray}{rcl}
assumption & : & \isarmeth \\
this & : & \isarmeth \\
rule & : & \isarmeth \\
- & : & \isarmeth \\
OF & : & \isaratt \\
of & : & \isaratt \\
intro & : & \isaratt \\
elim & : & \isaratt \\
dest & : & \isaratt \\
rule & : & \isaratt \\
\end{matharray}
\begin{rail}
'rule' thmrefs?
;
'OF' thmrefs
;
'of' insts ('concl' ':' insts)?
;
'rule' 'del'
;
\end{rail}
\begin{descr}
\item [$assumption$] solves some goal by a single assumption step. Any facts
given (${} \le 1$) are guaranteed to participate in the refinement. Recall
that $\QEDNAME$ (see \S\ref{sec:proof-steps}) already concludes any
remaining sub-goals by assumption.
\item [$this$] applies all of the current facts directly as rules. Recall
that ``$\DOT$'' (dot) abbreviates $\BY{this}$.
\item [$rule~\vec a$] applies some rule given as argument in backward manner;
facts are used to reduce the rule before applying it to the goal. Thus
$rule$ without facts is plain \emph{introduction}, while with facts it
becomes \emph{elimination}.
When no arguments are given, the $rule$ method tries to pick appropriate
rules automatically, as declared in the current context using the $intro$,
$elim$, $dest$ attributes (see below). This is the default behavior of
$\PROOFNAME$ and ``$\DDOT$'' (double-dot) steps (see
\S\ref{sec:proof-steps}).
\item [``$-$''] does nothing but insert the forward chaining facts as premises
into the goal. Note that command $\PROOFNAME$ without any method actually
performs a single reduction step using the $rule$ method; thus a plain
\emph{do-nothing} proof step would be $\PROOF{-}$ rather than $\PROOFNAME$
alone.
\item [$OF~\vec a$] applies some theorem to given rules $\vec a$ (in
parallel). This corresponds to the \texttt{MRS} operator in ML
\cite[\S5]{isabelle-ref}, but note the reversed order. Positions may be
skipped by including ``$\_$'' (underscore) as argument.
\item [$of~\vec t$] performs positional instantiation. The terms $\vec t$ are
substituted for any schematic variables occurring in a theorem from left to
right; ``\texttt{_}'' (underscore) indicates to skip a position. Arguments
following a ``$concl\colon$'' specification refer to positions of the
conclusion of a rule.
\item [$intro$, $elim$, and $dest$] declare introduction, elimination, and
destruct rules, respectively. Note that the classical reasoner (see
\S\ref{sec:classical-basic}) introduces different versions of these
attributes, and the $rule$ method, too. In object-logics with classical
reasoning enabled, the latter version should be used all the time to avoid
confusion!
\item [$rule~del$] undeclares introduction, elimination, or destruct rules.
\end{descr}
\subsection{Term abbreviations}\label{sec:term-abbrev}
\indexisarcmd{let}
\begin{matharray}{rcl}
\isarcmd{let} & : & \isartrans{proof(state)}{proof(state)} \\
\isarkeyword{is} & : & syntax \\
\end{matharray}
Abbreviations may be either bound by explicit $\LET{p \equiv t}$ statements,
or by annotating assumptions or goal statements with a list of patterns
$\ISS{p@1\;\dots}{p@n}$. In both cases, higher-order matching is invoked to
bind extra-logical term variables, which may be either named schematic
variables of the form $\Var{x}$, or nameless dummies ``\texttt{_}''
(underscore).\indexisarvar{_@\texttt{_}} Note that in the $\LETNAME$ form the
patterns occur on the left-hand side, while the $\ISNAME$ patterns are in
postfix position.
Polymorphism of term bindings is handled in Hindley-Milner style, as in ML.
Type variables referring to local assumptions or open goal statements are
\emph{fixed}, while those of finished results or bound by $\LETNAME$ may occur
in \emph{arbitrary} instances later. Even though actual polymorphism should
be rarely used in practice, this mechanism is essential to achieve proper
incremental type-inference, as the user proceeds to build up the Isar proof
text.
\medskip
Term abbreviations are quite different from actual local definitions as
introduced via $\DEFNAME$ (see \S\ref{sec:proof-context}). The latter are
visible within the logic as actual equations, while abbreviations disappear
during the input process just after type checking. Also note that $\DEFNAME$
does not support polymorphism.
\begin{rail}
'let' ((term + 'and') '=' term comment? + 'and')
;
\end{rail}
The syntax of $\ISNAME$ patterns follows \railnonterm{termpat} or
\railnonterm{proppat} (see \S\ref{sec:term-decls}).
\begin{descr}
\item [$\LET{\vec p = \vec t}$] binds any text variables in patters $\vec p$
by simultaneous higher-order matching against terms $\vec t$.
\item [$\IS{\vec p}$] resembles $\LETNAME$, but matches $\vec p$ against the
preceding statement. Also note that $\ISNAME$ is not a separate command,
but part of others (such as $\ASSUMENAME$, $\HAVENAME$ etc.).
\end{descr}
Some \emph{automatic} term abbreviations\index{term abbreviations} for goals
and facts are available as well. For any open goal,
$\Var{thesis}$\indexisarvar{thesis} refers to its object-level statement,
abstracted over any meta-level parameters (if present). Likewise,
$\Var{this}$\indexisarvar{this} is bound for fact statements resulting from
assumptions or finished goals. In case $\Var{this}$ refers to an object-logic
statement that is an application $f(t)$, then $t$ is bound to the special text
variable ``$\dots$''\indexisarvar{\dots} (three dots). The canonical
application of the latter are calculational proofs (see
\S\ref{sec:calculation}).
\subsection{Block structure}
\indexisarcmd{next}\indexisarcmd{\{}\indexisarcmd{\}}
\begin{matharray}{rcl}
\NEXT & : & \isartrans{proof(state)}{proof(state)} \\
\BG & : & \isartrans{proof(state)}{proof(state)} \\
\EN & : & \isartrans{proof(state)}{proof(state)} \\
\end{matharray}
\railalias{lbrace}{\ttlbrace}
\railterm{lbrace}
\railalias{rbrace}{\ttrbrace}
\railterm{rbrace}
\begin{rail}
'next' comment?
;
lbrace comment?
;
rbrace comment?
;
\end{rail}
While Isar is inherently block-structured, opening and closing blocks is
mostly handled rather casually, with little explicit user-intervention. Any
local goal statement automatically opens \emph{two} blocks, which are closed
again when concluding the sub-proof (by $\QEDNAME$ etc.). Sections of
different context within a sub-proof may be switched via $\NEXT$, which is
just a single block-close followed by block-open again. Thus the effect of
$\NEXT$ to reset the local proof context. There is no goal focus involved
here!
For slightly more advanced applications, there are explicit block parentheses
as well. These typically achieve a stronger forward style of reasoning.
\begin{descr}
\item [$\NEXT$] switches to a fresh block within a sub-proof, resetting the
local context to the initial one.
\item [$\BG$ and $\EN$] explicitly open and close blocks. Any current facts
pass through ``$\BG$'' unchanged, while ``$\EN$'' causes any result to be
\emph{exported} into the enclosing context. Thus fixed variables are
generalized, assumptions discharged, and local definitions unfolded (cf.\
\S\ref{sec:proof-context}). There is no difference of $\ASSUMENAME$ and
$\PRESUMENAME$ in this mode of forward reasoning --- in contrast to plain
backward reasoning with the result exported at $\SHOWNAME$ time.
\end{descr}
\subsection{Emulating tactic scripts}\label{sec:tactic-commands}
The Isar provides separate commands to accommodate tactic-style proof scripts
within the same system. While being outside the orthodox Isar proof language,
these might come in handy for interactive exploration and debugging, or even
actual tactical proof within new-style theories (to benefit from document
preparation, for example). See also \S\ref{sec:tactics} for actual tactics,
that have been encapsulated as proof methods. Proper proof methods may be
used in scripts, too.
\indexisarcmd{apply}\indexisarcmd{apply-end}\indexisarcmd{done}
\indexisarcmd{defer}\indexisarcmd{prefer}\indexisarcmd{back}
\indexisarcmd{declare}
\begin{matharray}{rcl}
\isarcmd{apply}^* & : & \isartrans{proof(prove)}{proof(prove)} \\
\isarcmd{apply_end}^* & : & \isartrans{proof(state)}{proof(state)} \\
\isarcmd{done}^* & : & \isartrans{proof(prove)}{proof(state)} \\
\isarcmd{defer}^* & : & \isartrans{proof}{proof} \\
\isarcmd{prefer}^* & : & \isartrans{proof}{proof} \\
\isarcmd{back}^* & : & \isartrans{proof}{proof} \\
\isarcmd{declare}^* & : & \isartrans{theory}{theory} \\
\end{matharray}
\railalias{applyend}{apply\_end}
\railterm{applyend}
\begin{rail}
( 'apply' | applyend ) method comment?
;
'done' comment?
;
'defer' nat? comment?
;
'prefer' nat comment?
;
'back' comment?
;
'declare' thmrefs comment?
;
\end{rail}
\begin{descr}
\item [$\APPLY{m}$] applies proof method $m$ in initial position, but unlike
$\PROOFNAME$ it retains ``$proof(prove)$'' mode. Thus consecutive method
applications may be given just as in tactic scripts.
Facts are passed to $m$ as indicated by the goal's forward-chain mode, and
are \emph{consumed} afterwards. Thus any further $\APPLYNAME$ command would
always work in a purely backward manner.
\item [$\isarkeyword{apply_end}~(m)$] applies proof method $m$ as if in
terminal position. Basically, this simulates a multi-step tactic script for
$\QEDNAME$, but may be given anywhere within the proof body.
No facts are passed to $m$. Furthermore, the static context is that of the
enclosing goal (as for actual $\QEDNAME$). Thus the proof method may not
refer to any assumptions introduced in the current body, for example.
\item [$\isarkeyword{done}$] completes a proof script, provided that the
current goal state is already solved completely. Note that actual
structured proof commands (e.g.\ ``$\DOT$'' or $\SORRY$) may be used to
conclude proof scripts as well.
\item [$\isarkeyword{defer}~n$ and $\isarkeyword{prefer}~n$] shuffle the list
of pending goals: $defer$ puts off goal $n$ to the end of the list ($n = 1$
by default), while $prefer$ brings goal $n$ to the top.
\item [$\isarkeyword{back}$] does back-tracking over the result sequence of
the latest proof command.\footnote{Unlike the ML function \texttt{back}
\cite{isabelle-ref}, the Isar command does not search upwards for further
branch points.} Basically, any proof command may return multiple results.
\item [$\isarkeyword{declare}~thms$] declares theorems to the current theory
context. No theorem binding is involved here, unlike
$\isarkeyword{theorems}$ or $\isarkeyword{lemmas}$ (cf.\
\S\ref{sec:axms-thms}). So $\isarkeyword{declare}$ only has the effect of
applying attributes as included in the theorem specification.
\end{descr}
Any proper Isar proof method may be used with tactic script commands such as
$\APPLYNAME$. A few additional emulations of actual tactics are provided as
well; these would be never used in actual structured proofs, of course.
\subsection{Meta-linguistic features}
\indexisarcmd{oops}
\begin{matharray}{rcl}
\isarcmd{oops} & : & \isartrans{proof}{theory} \\
\end{matharray}
The $\OOPS$ command discontinues the current proof attempt, while considering
the partial proof text as properly processed. This is conceptually quite
different from ``faking'' actual proofs via $\SORRY$ (see
\S\ref{sec:proof-steps}): $\OOPS$ does not observe the proof structure at all,
but goes back right to the theory level. Furthermore, $\OOPS$ does not
produce any result theorem --- there is no claim to be able to complete the
proof anyhow.
A typical application of $\OOPS$ is to explain Isar proofs \emph{within} the
system itself, in conjunction with the document preparation tools of Isabelle
described in \cite{isabelle-sys}. Thus partial or even wrong proof attempts
can be discussed in a logically sound manner. Note that the Isabelle {\LaTeX}
macros can be easily adapted to print something like ``$\dots$'' instead of an
``$\OOPS$'' keyword.
\medskip The $\OOPS$ command is undo-able, unlike $\isarkeyword{kill}$ (see
\S\ref{sec:history}). The effect is to get back to the theory \emph{before}
the opening of the proof.
\section{Other commands}
\subsection{Diagnostics}
\indexisarcmd{pr}\indexisarcmd{thm}\indexisarcmd{term}
\indexisarcmd{prop}\indexisarcmd{typ}
\begin{matharray}{rcl}
\isarcmd{pr}^* & : & \isarkeep{\cdot} \\
\isarcmd{thm}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{term}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{prop}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{typ}^* & : & \isarkeep{theory~|~proof} \\
\end{matharray}
These diagnostic commands assist interactive development. Note that $undo$
does not apply here, the theory or proof configuration is not changed.
\begin{rail}
'pr' modes? nat? (',' nat)?
;
'thm' modes? thmrefs comment?
;
'term' modes? term comment?
;
'prop' modes? prop comment?
;
'typ' modes? type comment?
;
modes: '(' (name + ) ')'
;
\end{rail}
\begin{descr}
\item [$\isarkeyword{pr}~goals, prems$] prints the current proof state (if
present), including the proof context, current facts and goals. The
optional limit arguments affect the number of goals and premises to be
displayed, which is initially 10 for both. Omitting limit values leaves the
current setting unchanged.
\item [$\isarkeyword{thm}~\vec a$] retrieves theorems from the current theory
or proof context. Note that any attributes included in the theorem
specifications are applied to a temporary context derived from the current
theory or proof; the result is discarded, i.e.\ attributes involved in $\vec
a$ do not have any permanent effect.
\item [$\isarkeyword{term}~t$ and $\isarkeyword{prop}~\phi$] read, type-check
and print terms or propositions according to the current theory or proof
context; the inferred type of $t$ is output as well. Note that these
commands are also useful in inspecting the current environment of term
abbreviations.
\item [$\isarkeyword{typ}~\tau$] reads and prints types of the meta-logic
according to the current theory or proof context.
\end{descr}
All of the diagnostic commands above admit a list of $modes$ to be specified,
which is appended to the current print mode (see also \cite{isabelle-ref}).
Thus the output behavior may be modified according particular print mode
features. For example, $\isarkeyword{pr}~(latex~xsymbols~symbols)$ would
print the current proof state with mathematical symbols and special characters
represented in {\LaTeX} source, according to the Isabelle style
\cite{isabelle-sys}.
Note that antiquotations (cf.\ \S\ref{sec:antiq}) provide a more systematic
way to include formal items into the printed text document.
\subsection{Inspecting the context}
\indexisarcmd{print-facts}\indexisarcmd{print-binds}
\indexisarcmd{print-commands}\indexisarcmd{print-syntax}
\indexisarcmd{print-methods}\indexisarcmd{print-attributes}
\indexisarcmd{thms-containing}\indexisarcmd{thm-deps}
\indexisarcmd{print-theorems}
\begin{matharray}{rcl}
\isarcmd{print_commands}^* & : & \isarkeep{\cdot} \\
\isarcmd{print_syntax}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{print_methods}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{print_attributes}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{print_theorems}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{thms_containing}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{thms_deps}^* & : & \isarkeep{theory~|~proof} \\
\isarcmd{print_facts}^* & : & \isarkeep{proof} \\
\isarcmd{print_binds}^* & : & \isarkeep{proof} \\
\end{matharray}
\railalias{thmscontaining}{thms\_containing}
\railterm{thmscontaining}
\railalias{thmdeps}{thm\_deps}
\railterm{thmdeps}
\begin{rail}
thmscontaining (term * )
;
thmdeps thmrefs
;
\end{rail}
These commands print certain parts of the theory and proof context. Note that
there are some further ones available, such as for the set of rules declared
for simplifications.
\begin{descr}
\item [$\isarkeyword{print_commands}$] prints Isabelle's outer theory syntax,
including keywords and command.
\item [$\isarkeyword{print_syntax}$] prints the inner syntax of types and
terms, depending on the current context. The output can be very verbose,
including grammar tables and syntax translation rules. See \cite[\S7,
\S8]{isabelle-ref} for further information on Isabelle's inner syntax.
\item [$\isarkeyword{print_methods}$] prints all proof methods available in
the current theory context.
\item [$\isarkeyword{print_attributes}$] prints all attributes available in
the current theory context.
\item [$\isarkeyword{print_theorems}$] prints theorems available in the
current theory context. In interactive mode this actually refers to the
theorems left by the last transaction; this allows to inspect the result of
advanced definitional packages, such as $\isarkeyword{datatype}$.
\item [$\isarkeyword{thms_containing}~\vec t$] retrieves theorems from the
theory context containing all of the constants occurring in the terms $\vec
t$. Note that giving the empty list yields \emph{all} theorems of the
current theory.
\item [$\isarkeyword{thm_deps}~\vec a$] visualizes dependencies of facts,
using Isabelle's graph browser tool (see also \cite{isabelle-sys}).
\item [$\isarkeyword{print_facts}$] prints any named facts of the current
context, including assumptions and local results.
\item [$\isarkeyword{print_binds}$] prints all term abbreviations present in
the context.
\end{descr}
\subsection{History commands}\label{sec:history}
\indexisarcmd{undo}\indexisarcmd{redo}\indexisarcmd{kill}
\begin{matharray}{rcl}
\isarcmd{undo}^{{*}{*}} & : & \isarkeep{\cdot} \\
\isarcmd{redo}^{{*}{*}} & : & \isarkeep{\cdot} \\
\isarcmd{kill}^{{*}{*}} & : & \isarkeep{\cdot} \\
\end{matharray}
The Isabelle/Isar top-level maintains a two-stage history, for theory and
proof state transformation. Basically, any command can be undone using
$\isarkeyword{undo}$, excluding mere diagnostic elements. Its effect may be
revoked via $\isarkeyword{redo}$, unless the corresponding
$\isarkeyword{undo}$ step has crossed the beginning of a proof or theory. The
$\isarkeyword{kill}$ command aborts the current history node altogether,
discontinuing a proof or even the whole theory. This operation is \emph{not}
undo-able.
\begin{warn}
History commands should never be used with user interfaces such as
Proof~General \cite{proofgeneral,Aspinall:TACAS:2000}, which takes care of
stepping forth and back itself. Interfering by manual $\isarkeyword{undo}$,
$\isarkeyword{redo}$, or even $\isarkeyword{kill}$ commands would quickly
result in utter confusion.
\end{warn}
\subsection{System operations}
\indexisarcmd{cd}\indexisarcmd{pwd}\indexisarcmd{use-thy}\indexisarcmd{use-thy-only}
\indexisarcmd{update-thy}\indexisarcmd{update-thy-only}
\begin{matharray}{rcl}
\isarcmd{cd}^* & : & \isarkeep{\cdot} \\
\isarcmd{pwd}^* & : & \isarkeep{\cdot} \\
\isarcmd{use_thy}^* & : & \isarkeep{\cdot} \\
\isarcmd{use_thy_only}^* & : & \isarkeep{\cdot} \\
\isarcmd{update_thy}^* & : & \isarkeep{\cdot} \\
\isarcmd{update_thy_only}^* & : & \isarkeep{\cdot} \\
\end{matharray}
\begin{descr}
\item [$\isarkeyword{cd}~name$] changes the current directory of the Isabelle
process.
\item [$\isarkeyword{pwd}~$] prints the current working directory.
\item [$\isarkeyword{use_thy}$, $\isarkeyword{use_thy_only}$,
$\isarkeyword{update_thy}$, $\isarkeyword{update_thy_only}$] load some
theory given as $name$ argument. These commands are basically the same as
the corresponding ML functions\footnote{The ML versions also change the
implicit theory context to that of the theory loaded.} (see also
\cite[\S1,\S6]{isabelle-ref}). Note that both the ML and Isar versions may
load new- and old-style theories alike.
\end{descr}
These system commands are scarcely used when working with the Proof~General
interface, since loading of theories is done fully transparently.
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