(* Title: HOL/PreList.thy
ID: $Id$
Author: Tobias Nipkow and Markus Wenzel
Copyright 2000 TU Muenchen
A basis for building theory List on. Is defined separately to serve as a
basis for theory ToyList in the documentation.
*)
theory PreList =
Option + Wellfounded_Relations + NatSimprocs + Recdef + Record +
Relation_Power + Calculation + SVC_Oracle:
(*belongs to theory HOL*)
declare case_split [cases type: bool]
(*belongs to theory Wellfounded_Recursion*)
declare wf_induct [induct set: wf]
(*belongs to theory Datatype_Universe; hides popular names *)
hide const Node Atom Leaf Numb Lim Funs Split Case
hide type node item
(* generic summation indexed over nat *)
(*FIXME move to Ring_and_Field, when it is made part of main HOL (!?)*)
(*FIXME port theorems from Algebra/abstract/NatSum*)
consts
Summation :: "(nat => 'a::{zero,plus}) => nat => 'a"
primrec
"Summation f 0 = 0"
"Summation f (Suc n) = Summation f n + f n"
syntax
"_Summation" :: "idt => nat => 'a => nat" ("\<Sum>_<_. _" [0, 51, 10] 10)
translations
"\<Sum>i < n. b" == "Summation (\<lambda>i. b) n"
theorem Summation_step:
"0 < n ==> (\<Sum>i < n. f i) = (\<Sum>i < n - 1. f i) + f (n - 1)"
by (induct n) simp_all
end