A1: now
let x be set ; :: thesis: ( x in dom SCMPDS-OK implies (s +* (t .--> u)) . x in SCMPDS-OK . x )
assume A2: x in dom SCMPDS-OK ; :: thesis: (s +* (t .--> u)) . x in SCMPDS-OK . x
now
per cases ( x = t or x <> t ) ;
suppose A3: x = t ; :: thesis: (s +* (t .--> u)) . x in SCMPDS-OK . x
{t} = dom (t .--> u) by FUNCOP_1:13;
then t in dom (t .--> u) by TARSKI:def 1;
then (s +* (t .--> u)) . t = (t .--> u) . t by FUNCT_4:13
.= u by FUNCOP_1:72 ;
then (s +* (t .--> u)) . t in INT by INT_1:def 2;
hence (s +* (t .--> u)) . x in SCMPDS-OK . x by A3, Th19; :: thesis: verum
end;
end;
end;
hence (s +* (t .--> u)) . x in SCMPDS-OK . x ; :: thesis: verum
end;
A5: dom SCMPDS-OK = SCM-Memory by FUNCT_2:def 1;
then dom s = SCM-Memory by CARD_3:9;
then dom (s +* (t .--> u)) = SCM-Memory \/ (dom (t .--> u)) by FUNCT_4:def 1
.= SCM-Memory \/ {t} by FUNCOP_1:13
.= dom SCMPDS-OK by A5, ZFMISC_1:40 ;
hence s +* (t .--> u) is SCMPDS-State by A1, CARD_3:9; :: thesis: verum