let a, b be Real; :: thesis: for X being Subset of REAL
for V being Subset of (Closed-Interval-MSpace a,b) st V = X & X is open holds
V in Family_open_set (Closed-Interval-MSpace a,b)
let X be Subset of REAL ; :: thesis: for V being Subset of (Closed-Interval-MSpace a,b) st V = X & X is open holds
V in Family_open_set (Closed-Interval-MSpace a,b)
let V be Subset of (Closed-Interval-MSpace a,b); :: thesis: ( V = X & X is open implies V in Family_open_set (Closed-Interval-MSpace a,b) )
assume A1: V = X ; :: thesis: ( not X is open or V in Family_open_set (Closed-Interval-MSpace a,b) )
assume A2: X is open ; :: thesis: V in Family_open_set (Closed-Interval-MSpace a,b)
for x being Element of (Closed-Interval-MSpace a,b) st x in V holds
ex r being Real st
( r > 0 & Ball x,r c= V )
proof
let x be Element of (Closed-Interval-MSpace a,b); :: thesis: ( x in V implies ex r being Real st
( r > 0 & Ball x,r c= V ) )
assume A3: x in V ; :: thesis: ex r being Real st
( r > 0 & Ball x,r c= V )
then reconsider r = x as Real by A1;
consider N being Neighbourhood of r such that
A4: N c= X by A1, A2, A3, RCOMP_1:39;
consider g being real number such that
A5: 0 < g and
A6: N = ].(r - g),(r + g).[ by RCOMP_1:def 7;
reconsider g = g as Real by XREAL_0:def 1;
A7: Ball x,g c= N
proof
let aa be set ; :: according to TARSKI:def 3 :: thesis: ( not aa in Ball x,g or aa in N )
assume aa in Ball x,g ; :: thesis: aa in N
then aa in { q where q is Element of (Closed-Interval-MSpace a,b) : dist x,q < g } by METRIC_1:18;
then consider q being Element of (Closed-Interval-MSpace a,b) such that
A8: q = aa and
A9: dist x,q < g ;
A10: ( q in the carrier of (Closed-Interval-MSpace a,b) & the carrier of (Closed-Interval-MSpace a,b) c= the carrier of RealSpace ) by TOPMETR:def 1;
then reconsider a9 = aa as Real by A8, METRIC_1:def 14;
reconsider x1 = x, q1 = q as Element of REAL by A1, A3, A10, METRIC_1:def 14;
dist x,q = the distance of (Closed-Interval-MSpace a,b) . x,q by METRIC_1:def 1
.= real_dist . x,q by METRIC_1:def 14, TOPMETR:def 1 ;
then real_dist . q1,x1 < g by A9, METRIC_1:10;
then abs (a9 - r) < g by A8, METRIC_1:def 13;
hence aa in N by A6, RCOMP_1:8; :: thesis: verum
end;
N c= Ball x,g
proof
let aa be set ; :: according to TARSKI:def 3 :: thesis: ( not aa in N or aa in Ball x,g )
assume A11: aa in N ; :: thesis: aa in Ball x,g
then reconsider a9 = aa as Real ;
abs (a9 - r) < g by A6, A11, RCOMP_1:8;
then A12: real_dist . a9,r < g by METRIC_1:def 13;
aa in X by A4, A11;
then reconsider a99 = aa, r9 = r as Element of (Closed-Interval-MSpace a,b) by A1;
dist r9,a99 = the distance of (Closed-Interval-MSpace a,b) . r9,a99 by METRIC_1:def 1
.= real_dist . r9,a99 by METRIC_1:def 14, TOPMETR:def 1 ;
then dist r9,a99 < g by A12, METRIC_1:10;
hence aa in Ball x,g by METRIC_1:12; :: thesis: verum
end;
then N = Ball x,g by A7, XBOOLE_0:def 10;
hence ex r being Real st
( r > 0 & Ball x,r c= V ) by A1, A4, A5; :: thesis: verum
end;
hence V in Family_open_set (Closed-Interval-MSpace a,b) by PCOMPS_1:def 5; :: thesis: verum