(*************************************************************
 *                                                           *
 *       Cryptographic protocol verifier                     *
 *                                                           *
 *       Bruno Blanchet and Xavier Allamigeon                *
 *                                                           *
 *       Copyright (C) INRIA, LIENS, MPII 2000-2012          *
 *                                                           *
 *************************************************************)

(*

    This program is free software; you can redistribute it and/or modify
    it under the terms of the GNU General Public License as published by
    the Free Software Foundation; either version 2 of the License, or
    (at your option) any later version.

    This program is distributed in the hope that it will be useful,
    but WITHOUT ANY WARRANTY; without even the implied warranty of
    MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
    GNU General Public License for more details (in file LICENSE).

    You should have received a copy of the GNU General Public License
    along with this program; if not, write to the Free Software
    Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA  02111-1307  USA

*)
(* Augmented EKE, Bellovin, Merritt,
   Section 3
   One does not know whether one decrypts { challengeA, challengeB }_K
   and similar messages correctly. In this case, there is no attack. *)

free c.

(* Symmetric cryptography
   One does not know whether decryption succeeds or not
   For use with weak secrets *)

fun enc/2.
fun dec/2.
equation dec(enc(x,y),y) = x.
equation enc(dec(x,y),y) = x.

(* Symmetric cryptography
   One knows whether decryption succeeds or not
   -- not used in this script 

fun senc/2.
reduc sdec(senc(x,y),y) = x. *)

(* Diffie-Hellman *)

data g/0.
fun exp/2.
equation exp(exp(g,x),y) = exp(exp(g,y),x).

(* Hash function *)

fun h/1.

(* One-way function *)

fun F/2.

(* Predicate *)

data true/0.
reduc T(h(x), F(x,y), y) = true.

(* Host *)

data host/2.


free hostA, hostB.
private free P.

let processA = 
	new RA;
	out(c, (hostA, enc(exp(g,RA), h(P))));
	in(c, (m1, m2));
	let gRB = dec(m1, h(P)) in
	let K = exp(gRB, RA) in
	let (challengeB) = dec(m2, K) in
	new challengeA;
	out(c, enc((challengeA, challengeB), K));
	in(c, m3);
	if (challengeA) = dec(m3, K) then
	out(c, enc(F(P,K), K)).


let processB =
	in(c, (=hostX, gRA)); 
	new RB;
	let K = exp(gRA, RB) in
	new challengeB;
	out(c, (enc(exp(g, RB), h(P)), enc(challengeB, K)));
	in(c, m4);
	let (challengeA, =challengeB) = dec(m4, K) in
	out(c, enc(challengeA, K));
	in(c, m5);
	let fr = dec(m5, K) in
	if T(h(P), fr, K) = true then
	0.

let processAtalkingX =
	in(c, (PA,PB));
	let hostX = host(PA,PB) in
	let P = PA in
	processA.

let processBtalkingX =
	in(c, (PA,PB));
	let hostX = host(PA,PB) in
	let P = PB in
	processB.

process
	(!let hostX = hostB in processA) |
	(!let hostX = hostA in processB) |
	(!processAtalkingX) |
	(!processBtalkingX) |
	(phase 1;
	new w;
	out(c, choice[w,P]))
	
