let cn be Real; :: thesis: for K1 being non empty Subset of (TOP-REAL 2)
for f being Function of ((TOP-REAL 2) | K1),R^1 st cn < 1 & ( for p being Point of (TOP-REAL 2) st p in the carrier of ((TOP-REAL 2) | K1) holds
f . p = |.p.| * (- (sqrt (1 - (((((p `1 ) / |.p.|) - cn) / (1 - cn)) ^2 )))) ) & ( for q being Point of (TOP-REAL 2) st q in the carrier of ((TOP-REAL 2) | K1) holds
( q `2 <= 0 & (q `1 ) / |.q.| >= cn & q <> 0. (TOP-REAL 2) ) ) holds
f is continuous
let K1 be non empty Subset of (TOP-REAL 2); :: thesis: for f being Function of ((TOP-REAL 2) | K1),R^1 st cn < 1 & ( for p being Point of (TOP-REAL 2) st p in the carrier of ((TOP-REAL 2) | K1) holds
f . p = |.p.| * (- (sqrt (1 - (((((p `1 ) / |.p.|) - cn) / (1 - cn)) ^2 )))) ) & ( for q being Point of (TOP-REAL 2) st q in the carrier of ((TOP-REAL 2) | K1) holds
( q `2 <= 0 & (q `1 ) / |.q.| >= cn & q <> 0. (TOP-REAL 2) ) ) holds
f is continuous
let f be Function of ((TOP-REAL 2) | K1),R^1 ; :: thesis: ( cn < 1 & ( for p being Point of (TOP-REAL 2) st p in the carrier of ((TOP-REAL 2) | K1) holds
f . p = |.p.| * (- (sqrt (1 - (((((p `1 ) / |.p.|) - cn) / (1 - cn)) ^2 )))) ) & ( for q being Point of (TOP-REAL 2) st q in the carrier of ((TOP-REAL 2) | K1) holds
( q `2 <= 0 & (q `1 ) / |.q.| >= cn & q <> 0. (TOP-REAL 2) ) ) implies f is continuous )
reconsider g1 = (2 NormF ) | K1 as continuous Function of ((TOP-REAL 2) | K1),R^1 by Lm5;
set a = cn;
set b = 1 - cn;
reconsider g2 = proj1 | K1 as continuous Function of ((TOP-REAL 2) | K1),R^1 by Lm2;
assume that
A1: cn < 1 and
A2: for p being Point of (TOP-REAL 2) st p in the carrier of ((TOP-REAL 2) | K1) holds
f . p = |.p.| * (- (sqrt (1 - (((((p `1 ) / |.p.|) - cn) / (1 - cn)) ^2 )))) and
A3: for q being Point of (TOP-REAL 2) st q in the carrier of ((TOP-REAL 2) | K1) holds
( q `2 <= 0 & (q `1 ) / |.q.| >= cn & q <> 0. (TOP-REAL 2) ) ; :: thesis: f is continuous
for q being Point of (TOP-REAL 2) st q in the carrier of ((TOP-REAL 2) | K1) holds
q <> 0. (TOP-REAL 2) by A3;
then A4: for q being Point of ((TOP-REAL 2) | K1) holds g1 . q <> 0 by Lm6;
1 - cn > 0 by A1, XREAL_1:151;
then consider g3 being Function of ((TOP-REAL 2) | K1),R^1 such that
A5: for q being Point of ((TOP-REAL 2) | K1)
for r1, r2 being real number st g2 . q = r1 & g1 . q = r2 holds
g3 . q = r2 * (- (sqrt (abs (1 - ((((r1 / r2) - cn) / (1 - cn)) ^2 ))))) and
A6: g3 is continuous by A4, Th14;
A7: dom g3 = the carrier of ((TOP-REAL 2) | K1) by FUNCT_2:def 1;
then A8: dom f = dom g3 by FUNCT_2:def 1;
for x being set st x in dom f holds
f . x = g3 . x
proof
let x be set ; :: thesis: ( x in dom f implies f . x = g3 . x )
A9: 1 - cn > 0 by A1, XREAL_1:151;
assume A10: x in dom f ; :: thesis: f . x = g3 . x
then x in K1 by A7, A8, PRE_TOPC:29;
then reconsider r = x as Point of (TOP-REAL 2) ;
A11: |.r.| <> 0 by A3, A10, TOPRNS_1:25;
|.r.| ^2 = ((r `1 ) ^2 ) + ((r `2 ) ^2 ) by JGRAPH_3:10;
then A12: ((r `1 ) - |.r.|) * ((r `1 ) + |.r.|) = - ((r `2 ) ^2 ) ;
(r `2 ) ^2 >= 0 by XREAL_1:65;
then r `1 <= |.r.| by A12, XREAL_1:95;
then (r `1 ) / |.r.| <= |.r.| / |.r.| by XREAL_1:74;
then (r `1 ) / |.r.| <= 1 by A11, XCMPLX_1:60;
then A13: ((r `1 ) / |.r.|) - cn <= 1 - cn by XREAL_1:11;
reconsider s = x as Point of ((TOP-REAL 2) | K1) by A10;
A14: now
assume (1 - cn) ^2 = 0 ; :: thesis: contradiction
then (1 - cn) + cn = 0 + cn by XCMPLX_1:6;
hence contradiction by A1; :: thesis: verum
end;
cn - ((r `1 ) / |.r.|) <= 0 by A3, A10, XREAL_1:49;
then - (cn - ((r `1 ) / |.r.|)) >= - (1 - cn) by A9, XREAL_1:26;
then ( (1 - cn) ^2 >= 0 & (((r `1 ) / |.r.|) - cn) ^2 <= (1 - cn) ^2 ) by A13, SQUARE_1:119, XREAL_1:65;
then ((((r `1 ) / |.r.|) - cn) ^2 ) / ((1 - cn) ^2 ) <= ((1 - cn) ^2 ) / ((1 - cn) ^2 ) by XREAL_1:74;
then ((((r `1 ) / |.r.|) - cn) ^2 ) / ((1 - cn) ^2 ) <= 1 by A14, XCMPLX_1:60;
then ((((r `1 ) / |.r.|) - cn) / (1 - cn)) ^2 <= 1 by XCMPLX_1:77;
then 1 - (((((r `1 ) / |.r.|) - cn) / (1 - cn)) ^2 ) >= 0 by XREAL_1:50;
then abs (1 - (((((r `1 ) / |.r.|) - cn) / (1 - cn)) ^2 )) = 1 - (((((r `1 ) / |.r.|) - cn) / (1 - cn)) ^2 ) by ABSVALUE:def 1;
then A15: f . r = |.r.| * (- (sqrt (abs (1 - (((((r `1 ) / |.r.|) - cn) / (1 - cn)) ^2 ))))) by A2, A10;
A16: ( proj1 . r = r `1 & (2 NormF ) . r = |.r.| ) by Def1, PSCOMP_1:def 28;
( g2 . s = proj1 . s & g1 . s = (2 NormF ) . s ) by Lm2, Lm5;
hence f . x = g3 . x by A5, A15, A16; :: thesis: verum
end;
hence f is continuous by A6, A8, FUNCT_1:9; :: thesis: verum