let x, y be object ; for E being non empty set
for u, v, w being Element of E ^omega
for F being Subset of (E ^omega)
for TS being transition-system over F st x,u ==>. y,v,TS holds
x,u ^ w ==>. y,v ^ w,TS
let E be non empty set ; for u, v, w being Element of E ^omega
for F being Subset of (E ^omega)
for TS being transition-system over F st x,u ==>. y,v,TS holds
x,u ^ w ==>. y,v ^ w,TS
let u, v, w be Element of E ^omega ; for F being Subset of (E ^omega)
for TS being transition-system over F st x,u ==>. y,v,TS holds
x,u ^ w ==>. y,v ^ w,TS
let F be Subset of (E ^omega); for TS being transition-system over F st x,u ==>. y,v,TS holds
x,u ^ w ==>. y,v ^ w,TS
let TS be transition-system over F; ( x,u ==>. y,v,TS implies x,u ^ w ==>. y,v ^ w,TS )
assume
x,u ==>. y,v,TS
; x,u ^ w ==>. y,v ^ w,TS
then consider u1 being Element of E ^omega such that
A1:
x,u1 -->. y,TS
and
A2:
u = u1 ^ v
;
u ^ w = u1 ^ (v ^ w)
by A2, AFINSQ_1:27;
hence
x,u ^ w ==>. y,v ^ w,TS
by A1; verum