let x, y be object ; for E being non empty set
for v, w being Element of E ^omega
for F being Subset of (E ^omega)
for TS being non empty transition-system over F
for P being RedSequence of ==>.-relation TS st P . 1 = [x,v] & P . (len P) = [y,w] holds
ex u being Element of E ^omega st v = u ^ w
let E be non empty set ; for v, w being Element of E ^omega
for F being Subset of (E ^omega)
for TS being non empty transition-system over F
for P being RedSequence of ==>.-relation TS st P . 1 = [x,v] & P . (len P) = [y,w] holds
ex u being Element of E ^omega st v = u ^ w
let v, w be Element of E ^omega ; for F being Subset of (E ^omega)
for TS being non empty transition-system over F
for P being RedSequence of ==>.-relation TS st P . 1 = [x,v] & P . (len P) = [y,w] holds
ex u being Element of E ^omega st v = u ^ w
let F be Subset of (E ^omega); for TS being non empty transition-system over F
for P being RedSequence of ==>.-relation TS st P . 1 = [x,v] & P . (len P) = [y,w] holds
ex u being Element of E ^omega st v = u ^ w
let TS be non empty transition-system over F; for P being RedSequence of ==>.-relation TS st P . 1 = [x,v] & P . (len P) = [y,w] holds
ex u being Element of E ^omega st v = u ^ w
let P be RedSequence of ==>.-relation TS; ( P . 1 = [x,v] & P . (len P) = [y,w] implies ex u being Element of E ^omega st v = u ^ w )
assume that
A1:
P . 1 = [x,v]
and
A2:
P . (len P) = [y,w]
; ex u being Element of E ^omega st v = u ^ w
0 + 1 <= len P
by NAT_1:8;
then
1 in dom P
by FINSEQ_3:25;
then consider u being Element of E ^omega such that
A3:
(P . 1) `2 = u ^ w
by A2, Th52;
take
u
; v = u ^ w
thus
v = u ^ w
by A1, A3; verum