let P be Subset of (TOP-REAL 2); for p1, p2 being Point of (TOP-REAL 2) st P is_an_arc_of p1,p2 holds
L_Segment P,p1,p2,p1 = {p1}
let p1, p2 be Point of (TOP-REAL 2); ( P is_an_arc_of p1,p2 implies L_Segment P,p1,p2,p1 = {p1} )
assume A1:
P is_an_arc_of p1,p2
; L_Segment P,p1,p2,p1 = {p1}
then A2:
p1 in P
by TOPREAL1:4;
thus
L_Segment P,p1,p2,p1 c= {p1}
XBOOLE_0:def 10 {p1} c= L_Segment P,p1,p2,p1proof
let x be
set ;
TARSKI:def 3 ( not x in L_Segment P,p1,p2,p1 or x in {p1} )
assume
x in L_Segment P,
p1,
p2,
p1
;
x in {p1}
then consider q being
Point of
(TOP-REAL 2) such that A3:
q = x
and A4:
LE q,
p1,
P,
p1,
p2
;
q in P
by A4, JORDAN5C:def 3;
then
LE p1,
q,
P,
p1,
p2
by A1, JORDAN5C:10;
then
q = p1
by A1, A4, JORDAN5C:12;
hence
x in {p1}
by A3, TARSKI:def 1;
verum
end;
let x be set ; TARSKI:def 3 ( not x in {p1} or x in L_Segment P,p1,p2,p1 )
assume
x in {p1}
; x in L_Segment P,p1,p2,p1
then A5:
x = p1
by TARSKI:def 1;
LE p1,p1,P,p1,p2
by A2, JORDAN5C:9;
hence
x in L_Segment P,p1,p2,p1
by A5; verum