reconsider O = 0 , I = 1 as Point of I[01] by BORSUK_1:83, XXREAL_1:1;
let p1, p2, p3, p4 be Point of (TOP-REAL 2); :: thesis: for a, b, c, d being real number
for f, g being Function of I[01] ,(TOP-REAL 2) st a < b & c < d & p1 `2 = d & p2 `2 = c & p3 `2 = c & p4 `2 = c & a <= p1 `1 & p1 `1 <= b & a < p4 `1 & p4 `1 < p3 `1 & p3 `1 < p2 `1 & p2 `1 <= b & f . 0 = p1 & f . 1 = p3 & g . 0 = p2 & g . 1 = p4 & f is continuous & f is one-to-one & g is continuous & g is one-to-one & rng f c= closed_inside_of_rectangle a,b,c,d & rng g c= closed_inside_of_rectangle a,b,c,d holds
rng f meets rng g
let a, b, c, d be real number ; :: thesis: for f, g being Function of I[01] ,(TOP-REAL 2) st a < b & c < d & p1 `2 = d & p2 `2 = c & p3 `2 = c & p4 `2 = c & a <= p1 `1 & p1 `1 <= b & a < p4 `1 & p4 `1 < p3 `1 & p3 `1 < p2 `1 & p2 `1 <= b & f . 0 = p1 & f . 1 = p3 & g . 0 = p2 & g . 1 = p4 & f is continuous & f is one-to-one & g is continuous & g is one-to-one & rng f c= closed_inside_of_rectangle a,b,c,d & rng g c= closed_inside_of_rectangle a,b,c,d holds
rng f meets rng g
let f, g be Function of I[01] ,(TOP-REAL 2); :: thesis: ( a < b & c < d & p1 `2 = d & p2 `2 = c & p3 `2 = c & p4 `2 = c & a <= p1 `1 & p1 `1 <= b & a < p4 `1 & p4 `1 < p3 `1 & p3 `1 < p2 `1 & p2 `1 <= b & f . 0 = p1 & f . 1 = p3 & g . 0 = p2 & g . 1 = p4 & f is continuous & f is one-to-one & g is continuous & g is one-to-one & rng f c= closed_inside_of_rectangle a,b,c,d & rng g c= closed_inside_of_rectangle a,b,c,d implies rng f meets rng g )
assume that
A1: a < b and
A2: c < d and
A3: p1 `2 = d and
A4: p2 `2 = c and
A5: p3 `2 = c and
A6: p4 `2 = c and
A7: a <= p1 `1 and
A8: p1 `1 <= b and
A9: a < p4 `1 and
A10: p4 `1 < p3 `1 and
A11: p3 `1 < p2 `1 and
A12: p2 `1 <= b and
A13: f . 0 = p1 and
A14: f . 1 = p3 and
A15: g . 0 = p2 and
A16: g . 1 = p4 and
A17: ( f is continuous & f is one-to-one ) and
A18: ( g is continuous & g is one-to-one ) and
A19: rng f c= closed_inside_of_rectangle a,b,c,d and
A20: rng g c= closed_inside_of_rectangle a,b,c,d ; :: thesis: rng f meets rng g
set A = 2 / (b - a);
set B = - ((b + a) / (b - a));
set C = 2 / (d - c);
set D = - ((d + c) / (d - c));
set h = AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)));
reconsider g2 = (AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) * g as Function of I[01] ,(TOP-REAL 2) ;
A21: p2 `1 > p4 `1 by A10, A11, XXREAL_0:2;
(g . O) `2 = c by A4, A15;
then A22: (g2 . I) `1 > - 1 by A1, A9, A12, A15, A16, A21, Th67;
d - c > 0 by A2, XREAL_1:52;
then A23: 2 / (d - c) > 0 by XREAL_1:141;
reconsider f2 = (AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) * f as Function of I[01] ,(TOP-REAL 2) ;
A24: b > p3 `1 by A11, A12, XXREAL_0:2;
(g . I) `2 = c by A6, A16;
then A25: 1 >= (g2 . O) `1 by A1, A9, A12, A15, A16, A21, Th67;
A26: (g2 . O) `2 = - 1 by A2, A4, A15, Th57;
A27: ( g2 is continuous & g2 is one-to-one ) by A1, A2, A18, Th53;
A28: (f2 . O) `2 = 1 by A2, A3, A13, Th55;
A29: ( f2 is continuous & f2 is one-to-one ) by A1, A2, A17, Th53;
consider x being Element of (rng f2) /\ (rng g2);
A30: dom f = the carrier of I[01] by FUNCT_2:def 1;
then A31: (AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) . p3 = f2 . I by A14, FUNCT_1:23;
A32: rng g2 c= closed_inside_of_rectangle (- 1),1,(- 1),1 by A1, A2, A20, Th52;
A33: (g2 . I) `2 = - 1 by A2, A6, A16, Th57;
b - a > 0 by A1, XREAL_1:52;
then A34: 2 / (b - a) > 0 by XREAL_1:141;
then AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c))) is being_homeomorphism by A23, Th51;
then A35: AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c))) is one-to-one by TOPS_2:def 5;
A36: (f . I) `2 = c by A5, A14;
A37: dom g = the carrier of I[01] by FUNCT_2:def 1;
then (AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) . p2 = g2 . O by A15, FUNCT_1:23;
then A38: (g2 . O) `1 > (f2 . I) `1 by A11, A34, A23, A31, Th50;
A39: p3 `1 > a by A9, A10, XXREAL_0:2;
then A40: (f2 . O) `1 <= 1 by A1, A7, A8, A13, A14, A24, A36, Th64;
A41: rng f2 c= closed_inside_of_rectangle (- 1),1,(- 1),1 by A1, A2, A19, Th52;
A42: (f2 . I) `2 = - 1 by A2, A5, A14, Th57;
(AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) . p4 = g2 . I by A16, A37, FUNCT_1:23;
then A43: (g2 . I) `1 < (f2 . I) `1 by A10, A34, A23, A31, Th50;
- 1 <= (f2 . O) `1 by A1, A7, A8, A13, A14, A39, A24, A36, Th64;
then rng f2 meets rng g2 by A29, A28, A42, A40, A41, A27, A26, A33, A25, A22, A32, A38, A43, Th43, JGRAPH_6:89;
then A44: (rng f2) /\ (rng g2) <> {} by XBOOLE_0:def 7;
then x in rng g2 by XBOOLE_0:def 4;
then consider z2 being set such that
A45: z2 in dom g2 and
A46: x = g2 . z2 by FUNCT_1:def 5;
A47: x = (AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) . (g . z2) by A37, A45, A46, FUNCT_1:23;
A48: g . z2 in rng g by A37, A45, FUNCT_1:def 5;
g . z2 in the carrier of (TOP-REAL 2) by A45, FUNCT_2:7;
then A49: g . z2 in dom (AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) by FUNCT_2:def 1;
x in rng f2 by A44, XBOOLE_0:def 4;
then consider z1 being set such that
A50: z1 in dom f2 and
A51: x = f2 . z1 by FUNCT_1:def 5;
A52: f . z1 in rng f by A30, A50, FUNCT_1:def 5;
f . z1 in the carrier of (TOP-REAL 2) by A50, FUNCT_2:7;
then A53: f . z1 in dom (AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) by FUNCT_2:def 1;
x = (AffineMap (2 / (b - a)),(- ((b + a) / (b - a))),(2 / (d - c)),(- ((d + c) / (d - c)))) . (f . z1) by A30, A50, A51, FUNCT_1:23;
then f . z1 = g . z2 by A47, A53, A49, A35, FUNCT_1:def 8;
hence rng f meets rng g by A52, A48, XBOOLE_0:3; :: thesis: verum