set f = xor2 ;
let x, y, z be set ; :: thesis: ( z <> [<*x,y*>,xor2] implies for s being State of (GFA0AdderCirc (x,y,z))
for a1, a2, a3 being Element of BOOLEAN st a1 = s . x & a2 = s . y & a3 = s . z holds
( (Following s) . [<*x,y*>,xor2] = a1 'xor' a2 & (Following s) . x = a1 & (Following s) . y = a2 & (Following s) . z = a3 ) )
assume A1: z <> [<*x,y*>,xor2] ; :: thesis: for s being State of (GFA0AdderCirc (x,y,z))
for a1, a2, a3 being Element of BOOLEAN st a1 = s . x & a2 = s . y & a3 = s . z holds
( (Following s) . [<*x,y*>,xor2] = a1 'xor' a2 & (Following s) . x = a1 & (Following s) . y = a2 & (Following s) . z = a3 )
set A = GFA0AdderCirc (x,y,z);
set xy = [<*x,y*>,xor2];
let s be State of (GFA0AdderCirc (x,y,z)); :: thesis: for a1, a2, a3 being Element of BOOLEAN st a1 = s . x & a2 = s . y & a3 = s . z holds
( (Following s) . [<*x,y*>,xor2] = a1 'xor' a2 & (Following s) . x = a1 & (Following s) . y = a2 & (Following s) . z = a3 )
let a1, a2, a3 be Element of BOOLEAN ; :: thesis: ( a1 = s . x & a2 = s . y & a3 = s . z implies ( (Following s) . [<*x,y*>,xor2] = a1 'xor' a2 & (Following s) . x = a1 & (Following s) . y = a2 & (Following s) . z = a3 ) )
assume that
A2: ( a1 = s . x & a2 = s . y ) and
A3: a3 = s . z ; :: thesis: ( (Following s) . [<*x,y*>,xor2] = a1 'xor' a2 & (Following s) . x = a1 & (Following s) . y = a2 & (Following s) . z = a3 )
(Following s) . [<*x,y*>,xor2] = xor2 . <*a1,a2*> by A1, A2, Lm3;
hence (Following s) . [<*x,y*>,xor2] = a1 'xor' a2 by FACIRC_1:def 4; :: thesis: ( (Following s) . x = a1 & (Following s) . y = a2 & (Following s) . z = a3 )
thus ( (Following s) . x = a1 & (Following s) . y = a2 & (Following s) . z = a3 ) by A1, A2, A3, Lm3; :: thesis: verum