let a, b be Real; :: thesis: for X being Subset of R^1 st a < b & X = [.a,b.[ holds
Fr X = {a,b}
let X be Subset of R^1; :: thesis: ( a < b & X = [.a,b.[ implies Fr X = {a,b} )
assume that
A1: a < b and
A2: X = [.a,b.[ ; :: thesis: Fr X = {a,b}
A3: ( Cl X = [.a,b.] & [.a,b.] /\ ((left_closed_halfline a) \/ (right_closed_halfline b)) = {a,b} ) by A1, A2, Th8, BORSUK_5:35;
set LO = R^1 (left_open_halfline a);
set RC = R^1 (right_closed_halfline b);
set LC = R^1 (left_closed_halfline a);
A4: R^1 (right_closed_halfline b) = right_closed_halfline b by TOPREALB:def 3;
A5: R^1 (left_open_halfline a) = left_open_halfline a by TOPREALB:def 3;
then A6: [.a,b.[ ` = (R^1 (left_open_halfline a)) \/ (R^1 (right_closed_halfline b)) by A4, XXREAL_1:382;
A7: R^1 (left_closed_halfline a) = left_closed_halfline a by TOPREALB:def 3;
Cl (X `) = Cl ([.a,b.[ `) by A2, JORDAN5A:24, TOPMETR:17
.= (Cl (left_open_halfline a)) \/ (Cl (right_closed_halfline b)) by A5, A4, A6, Th3
.= (Cl (R^1 (left_open_halfline a))) \/ (Cl (right_closed_halfline b)) by A5, JORDAN5A:24
.= (Cl (R^1 (left_open_halfline a))) \/ (Cl (R^1 (right_closed_halfline b))) by A4, JORDAN5A:24
.= (R^1 (left_closed_halfline a)) \/ (Cl (R^1 (right_closed_halfline b))) by A7, BORSUK_5:51, TOPREALB:def 3
.= (left_closed_halfline a) \/ (right_closed_halfline b) by A4, A7, PRE_TOPC:22 ;
hence Fr X = {a,b} by A3, TOPS_1:def 2; :: thesis: verum