Conversion of all main protocols from "Shared" to "Public".
Removal of Key_supply_ax: modifications to possibility theorems.
Improved presentation.
(* Title: HOL/Auth/Public
ID: $Id$
Author: Lawrence C Paulson, Cambridge University Computer Laboratory
Copyright 1996 University of Cambridge
Theory of Public Keys (common to all public-key protocols)
Private and public keys; initial states of agents
*)
theory Public = Event:
lemma invKey_K: "K \<in> symKeys ==> invKey K = K"
by (simp add: symKeys_def)
subsection{*Asymmetric Keys*}
consts
(*the bool is TRUE if a signing key*)
publicKey :: "[bool,agent] => key"
syntax
pubEK :: "agent => key"
pubSK :: "agent => key"
privateKey :: "[bool,agent] => key"
priEK :: "agent => key"
priSK :: "agent => key"
translations
"pubEK" == "publicKey False"
"pubSK" == "publicKey True"
(*BEWARE!! priEK, priSK DON'T WORK with inj, range, image, etc.*)
"privateKey b A" == "invKey (publicKey b A)"
"priEK A" == "privateKey False A"
"priSK A" == "privateKey True A"
text{*These translations give backward compatibility. They represent the
simple situation where the signature and encryption keys are the same.*}
syntax
pubK :: "agent => key"
priK :: "agent => key"
translations
"pubK A" == "pubEK A"
"priK A" == "invKey (pubEK A)"
text{*By freeness of agents, no two agents have the same key. Since
@{term "True\<noteq>False"}, no agent has identical signing and encryption keys*}
specification (publicKey)
injective_publicKey:
"publicKey b A = publicKey c A' ==> b=c & A=A'"
apply (rule exI [of _ "%b A. 2 * agent_case 0 (\<lambda>n. n + 2) 1 A + (if b then 1 else 0)"])
apply (auto simp add: inj_on_def split: agent.split, presburger+)
(*faster would be this:
apply (drule_tac f="%x. x mod 2" in arg_cong, simp add: mod_Suc)+
*)
done
axioms
(*No private key equals any public key (essential to ensure that private
keys are private!) *)
privateKey_neq_publicKey [iff]: "privateKey b A \<noteq> publicKey c A'"
declare privateKey_neq_publicKey [THEN not_sym, iff]
subsection{*Basic properties of @{term pubK} and @{term priK}*}
lemma [iff]: "(publicKey b A = publicKey c A') = (b=c & A=A')"
by (blast dest!: injective_publicKey)
lemma not_symKeys_pubK [iff]: "publicKey b A \<notin> symKeys"
by (simp add: symKeys_def)
lemma not_symKeys_priK [iff]: "privateKey b A \<notin> symKeys"
by (simp add: symKeys_def)
lemma symKey_neq_priEK: "K \<in> symKeys ==> K \<noteq> priEK A"
by auto
lemma symKeys_neq_imp_neq: "(K \<in> symKeys) \<noteq> (K' \<in> symKeys) ==> K \<noteq> K'"
by blast
lemma symKeys_invKey_iff [iff]: "(invKey K \<in> symKeys) = (K \<in> symKeys)"
by (unfold symKeys_def, auto)
lemma analz_symKeys_Decrypt:
"[| Crypt K X \<in> analz H; K \<in> symKeys; Key K \<in> analz H |]
==> X \<in> analz H"
by (auto simp add: symKeys_def)
subsection{*"Image" equations that hold for injective functions*}
lemma invKey_image_eq [simp]: "(invKey x \<in> invKey`A) = (x \<in> A)"
by auto
(*holds because invKey is injective*)
lemma publicKey_image_eq [simp]:
"(publicKey b x \<in> publicKey c ` AA) = (b=c & x \<in> AA)"
by auto
lemma privateKey_notin_image_publicKey [simp]: "privateKey b x \<notin> publicKey c ` AA"
by auto
lemma privateKey_image_eq [simp]:
"(privateKey b A \<in> invKey ` publicKey c ` AS) = (b=c & A\<in>AS)"
by auto
lemma publicKey_notin_image_privateKey [simp]: "publicKey b A \<notin> invKey ` publicKey c ` AS"
by auto
subsection{*Symmetric Keys*}
text{*For some protocols, it is convenient to equip agents with symmetric as
well as asymmetric keys. The theory @{text Shared} assumes that all keys
are symmetric.*}
consts
shrK :: "agent => key" --{*long-term shared keys*}
specification (shrK)
inj_shrK: "inj shrK"
--{*No two agents have the same long-term key*}
apply (rule exI [of _ "agent_case 0 (\<lambda>n. n + 2) 1"])
apply (simp add: inj_on_def split: agent.split)
done
axioms
sym_shrK [iff]: "shrK X \<in> symKeys" --{*All shared keys are symmetric*}
(*Injectiveness: Agents' long-term keys are distinct.*)
declare inj_shrK [THEN inj_eq, iff]
lemma invKey_shrK [simp]: "invKey (shrK A) = shrK A"
by (simp add: invKey_K)
lemma analz_shrK_Decrypt:
"[| Crypt (shrK A) X \<in> analz H; Key(shrK A) \<in> analz H |] ==> X \<in> analz H"
by auto
lemma analz_Decrypt':
"[| Crypt K X \<in> analz H; K \<in> symKeys; Key K \<in> analz H |] ==> X \<in> analz H"
by (auto simp add: invKey_K)
lemma priK_neq_shrK [iff]: "shrK A \<noteq> privateKey b C"
by (simp add: symKeys_neq_imp_neq)
declare priK_neq_shrK [THEN not_sym, simp]
lemma pubK_neq_shrK [iff]: "shrK A \<noteq> publicKey b C"
by (simp add: symKeys_neq_imp_neq)
declare pubK_neq_shrK [THEN not_sym, simp]
lemma priEK_noteq_shrK [simp]: "priEK A \<noteq> shrK B"
by auto
lemma publicKey_notin_image_shrK [simp]: "publicKey b x \<notin> shrK ` AA"
by auto
lemma privateKey_notin_image_shrK [simp]: "privateKey b x \<notin> shrK ` AA"
by auto
lemma shrK_notin_image_publicKey [simp]: "shrK x \<notin> publicKey b ` AA"
by auto
lemma shrK_notin_image_privateKey [simp]: "shrK x \<notin> invKey ` publicKey b ` AA"
by auto
lemma shrK_image_eq [simp]: "(shrK x \<in> shrK ` AA) = (x \<in> AA)"
by auto
text{*For some reason, moving this up can make some proofs loop!*}
declare invKey_K [simp]
subsection{*Initial States of Agents*}
text{*Note: for all practical purposes, all that matters is the initial
knowledge of the Spy. All other agents are automata, merely following the
protocol.*}
primrec
(*Agents know their private key and all public keys*)
initState_Server:
"initState Server =
{Key (priEK Server), Key (priSK Server)} \<union>
(Key ` range pubEK) \<union> (Key ` range pubSK) \<union> (Key ` range shrK)"
initState_Friend:
"initState (Friend i) =
{Key (priEK(Friend i)), Key (priSK(Friend i)), Key (shrK(Friend i))} \<union>
(Key ` range pubEK) \<union> (Key ` range pubSK)"
initState_Spy:
"initState Spy =
(Key ` invKey ` pubEK ` bad) \<union> (Key ` invKey ` pubSK ` bad) \<union>
(Key ` shrK ` bad) \<union>
(Key ` range pubEK) \<union> (Key ` range pubSK)"
text{*These lemmas allow reasoning about @{term "used evs"} rather than
@{term "knows Spy evs"}, which is useful when there are private Notes.
Because they depend upon the definition of @{term initState}, they cannot
be moved up.*}
lemma used_parts_subset_parts [rule_format]:
"\<forall>X \<in> used evs. parts {X} \<subseteq> used evs"
apply (induct evs)
prefer 2
apply (simp add: used_Cons)
apply (rule ballI)
apply (case_tac a, auto)
apply (auto dest!: parts_cut)
txt{*Base case*}
apply (simp add: used_Nil)
done
lemma MPair_used_D: "{|X,Y|} \<in> used H ==> X \<in> used H & Y \<in> used H"
by (drule used_parts_subset_parts, simp, blast)
lemma MPair_used [elim!]:
"[| {|X,Y|} \<in> used H;
[| X \<in> used H; Y \<in> used H |] ==> P |]
==> P"
by (blast dest: MPair_used_D)
text{*Rewrites should not refer to @{term "initState(Friend i)"} because
that expression is not in normal form.*}
lemma keysFor_parts_initState [simp]: "keysFor (parts (initState C)) = {}"
apply (unfold keysFor_def)
apply (induct_tac "C")
apply (auto intro: range_eqI)
done
lemma Crypt_notin_initState: "Crypt K X \<notin> parts (initState B)"
by (induct B, auto)
lemma Crypt_notin_used_empty [simp]: "Crypt K X \<notin> used []"
by (simp add: Crypt_notin_initState used_Nil)
(*** Basic properties of shrK ***)
(*Agents see their own shared keys!*)
lemma shrK_in_initState [iff]: "Key (shrK A) \<in> initState A"
by (induct_tac "A", auto)
lemma shrK_in_knows [iff]: "Key (shrK A) \<in> knows A evs"
by (simp add: initState_subset_knows [THEN subsetD])
lemma shrK_in_used [iff]: "Key (shrK A) \<in> used evs"
by (rule initState_into_used, blast)
(** Fresh keys never clash with long-term shared keys **)
(*Used in parts_induct_tac and analz_Fake_tac to distinguish session keys
from long-term shared keys*)
lemma Key_not_used [simp]: "Key K \<notin> used evs ==> K \<notin> range shrK"
by blast
lemma shrK_neq: "Key K \<notin> used evs ==> shrK B \<noteq> K"
by blast
declare shrK_neq [THEN not_sym, simp]
subsection{*Function @{term spies} *}
text{*Agents see their own private keys!*}
lemma priK_in_initState [iff]: "Key (privateKey b A) \<in> initState A"
by (induct_tac "A", auto)
text{*Agents see all public keys!*}
lemma publicKey_in_initState [iff]: "Key (publicKey b A) \<in> initState B"
by (case_tac "B", auto)
text{*All public keys are visible*}
lemma spies_pubK [iff]: "Key (publicKey b A) \<in> spies evs"
apply (induct_tac "evs")
apply (simp_all add: imageI knows_Cons split add: event.split)
done
declare spies_pubK [THEN analz.Inj, iff]
text{*Spy sees private keys of bad agents!*}
lemma Spy_spies_bad_privateKey [intro!]:
"A \<in> bad ==> Key (privateKey b A) \<in> spies evs"
apply (induct_tac "evs")
apply (simp_all add: imageI knows_Cons split add: event.split)
done
text{*Spy sees long-term shared keys of bad agents!*}
lemma Spy_spies_bad_shrK [intro!]:
"A \<in> bad ==> Key (shrK A) \<in> spies evs"
apply (induct_tac "evs")
apply (simp_all add: imageI knows_Cons split add: event.split)
done
lemma publicKey_into_used [iff] :"Key (publicKey b A) \<in> used evs"
apply (rule initState_into_used)
apply (rule publicKey_in_initState [THEN parts.Inj])
done
lemma privateKey_into_used [iff]: "Key (privateKey b A) \<in> used evs"
apply(rule initState_into_used)
apply(rule priK_in_initState [THEN parts.Inj])
done
(*For case analysis on whether or not an agent is compromised*)
lemma Crypt_Spy_analz_bad:
"[| Crypt (shrK A) X \<in> analz (knows Spy evs); A \<in> bad |]
==> X \<in> analz (knows Spy evs)"
by force
subsection{*Fresh Nonces*}
lemma Nonce_notin_initState [iff]: "Nonce N \<notin> parts (initState B)"
by (induct_tac "B", auto)
lemma Nonce_notin_used_empty [simp]: "Nonce N \<notin> used []"
by (simp add: used_Nil)
subsection{*Supply fresh nonces for possibility theorems*}
text{*In any trace, there is an upper bound N on the greatest nonce in use*}
lemma Nonce_supply_lemma: "EX N. ALL n. N<=n --> Nonce n \<notin> used evs"
apply (induct_tac "evs")
apply (rule_tac x = 0 in exI)
apply (simp_all (no_asm_simp) add: used_Cons split add: event.split)
apply safe
apply (rule msg_Nonce_supply [THEN exE], blast elim!: add_leE)+
done
lemma Nonce_supply1: "EX N. Nonce N \<notin> used evs"
by (rule Nonce_supply_lemma [THEN exE], blast)
lemma Nonce_supply: "Nonce (@ N. Nonce N \<notin> used evs) \<notin> used evs"
apply (rule Nonce_supply_lemma [THEN exE])
apply (rule someI, fast)
done
subsection{*Specialized Rewriting for Theorems About @{term analz} and Image*}
lemma insert_Key_singleton: "insert (Key K) H = Key ` {K} Un H"
by blast
lemma insert_Key_image: "insert (Key K) (Key`KK \<union> C) = Key ` (insert K KK) \<union> C"
by blast
ML
{*
val Key_not_used = thm "Key_not_used";
val insert_Key_singleton = thm "insert_Key_singleton";
val insert_Key_image = thm "insert_Key_image";
*}
lemma Crypt_imp_keysFor :"[|Crypt K X \<in> H; K \<in> symKeys|] ==> K \<in> keysFor H"
by (drule Crypt_imp_invKey_keysFor, simp)
text{*Lemma for the trivial direction of the if-and-only-if of the
Session Key Compromise Theorem*}
lemma analz_image_freshK_lemma:
"(Key K \<in> analz (Key`nE \<union> H)) --> (K \<in> nE | Key K \<in> analz H) ==>
(Key K \<in> analz (Key`nE \<union> H)) = (K \<in> nE | Key K \<in> analz H)"
by (blast intro: analz_mono [THEN [2] rev_subsetD])
lemmas analz_image_freshK_simps =
simp_thms mem_simps --{*these two allow its use with @{text "only:"}*}
disj_comms
image_insert [THEN sym] image_Un [THEN sym] empty_subsetI insert_subset
analz_insert_eq Un_upper2 [THEN analz_mono, THEN subsetD]
insert_Key_singleton
Key_not_used insert_Key_image Un_assoc [THEN sym]
ML
{*
val analz_image_freshK_lemma = thm "analz_image_freshK_lemma";
val analz_image_freshK_simps = thms "analz_image_freshK_simps";
val analz_image_freshK_ss =
simpset() delsimps [image_insert, image_Un]
delsimps [imp_disjL] (*reduces blow-up*)
addsimps thms "analz_image_freshK_simps"
*}
method_setup analz_freshK = {*
Method.no_args
(Method.METHOD
(fn facts => EVERY [REPEAT_FIRST (resolve_tac [allI, ballI, impI]),
REPEAT_FIRST (rtac analz_image_freshK_lemma),
ALLGOALS (asm_simp_tac analz_image_freshK_ss)])) *}
"for proving the Session Key Compromise theorem"
subsection{*Specialized Methods for Possibility Theorems*}
ML
{*
val Nonce_supply = thm "Nonce_supply";
(*Tactic for possibility theorems (Isar interface)*)
fun gen_possibility_tac ss state = state |>
REPEAT (*omit used_Says so that Nonces start from different traces!*)
(ALLGOALS (simp_tac (ss delsimps [used_Says]))
THEN
REPEAT_FIRST (eq_assume_tac ORELSE'
resolve_tac [refl, conjI, Nonce_supply]))
(*Tactic for possibility theorems (ML script version)*)
fun possibility_tac state = gen_possibility_tac (simpset()) state
(*For harder protocols (such as Recur) where we have to set up some
nonces and keys initially*)
fun basic_possibility_tac st = st |>
REPEAT
(ALLGOALS (asm_simp_tac (simpset() setSolver safe_solver))
THEN
REPEAT_FIRST (resolve_tac [refl, conjI]))
*}
method_setup possibility = {*
Method.ctxt_args (fn ctxt =>
Method.METHOD (fn facts =>
gen_possibility_tac (Simplifier.get_local_simpset ctxt))) *}
"for proving possibility theorems"
end