let S be non empty non void ManySortedSign ; :: thesis: for U0 being MSAlgebra of S holds MSAlgebra(# the Sorts of U0, the Charact of U0 #) is MSSubAlgebra of U0
let U0 be MSAlgebra of S; :: thesis: MSAlgebra(# the Sorts of U0, the Charact of U0 #) is MSSubAlgebra of U0
reconsider A = MSAlgebra(# the Sorts of U0, the Charact of U0 #) as strict MSAlgebra of S ;
now
thus the Sorts of A is MSSubset of U0 by PBOOLE:def 18; :: thesis: for B being MSSubset of U0 st B = the Sorts of A holds
( B is opers_closed & the Charact of A = Opers (U0,B) )
let B be MSSubset of U0; :: thesis: ( B = the Sorts of A implies ( B is opers_closed & the Charact of A = Opers (U0,B) ) )
set f1 = the Charact of A;
set f2 = Opers (U0,B);
assume A1: B = the Sorts of A ; :: thesis: ( B is opers_closed & the Charact of A = Opers (U0,B) )
hence B is opers_closed by Th4; :: thesis: the Charact of A = Opers (U0,B)
for x being set st x in the carrier' of S holds
the Charact of A . x = (Opers (U0,B)) . x
proof
let x be set ; :: thesis: ( x in the carrier' of S implies the Charact of A . x = (Opers (U0,B)) . x )
assume x in the carrier' of S ; :: thesis: the Charact of A . x = (Opers (U0,B)) . x
then reconsider o1 = x as Element of the carrier' of S ;
( the Charact of A . o1 = Den (o1,U0) & (Opers (U0,B)) . o1 = o1 /. B ) by Def9, MSUALG_1:def 6;
hence the Charact of A . x = (Opers (U0,B)) . x by A1, Th4; :: thesis: verum
end;
hence the Charact of A = Opers (U0,B) by PBOOLE:3; :: thesis: verum
end;
hence MSAlgebra(# the Sorts of U0, the Charact of U0 #) is MSSubAlgebra of U0 by Def10; :: thesis: verum