let f be constant standard special_circular_sequence; for g being FinSequence of (TOP-REAL 2)
for i1, i2 being Nat st g is_a_part<_of f,i1,i2 & i1 > i2 holds
L~ g is_S-P_arc_joining f /. i1,f /. i2
let g be FinSequence of (TOP-REAL 2); for i1, i2 being Nat st g is_a_part<_of f,i1,i2 & i1 > i2 holds
L~ g is_S-P_arc_joining f /. i1,f /. i2
let i1, i2 be Nat; ( g is_a_part<_of f,i1,i2 & i1 > i2 implies L~ g is_S-P_arc_joining f /. i1,f /. i2 )
assume that
A1:
g is_a_part<_of f,i1,i2
and
A2:
i1 > i2
; L~ g is_S-P_arc_joining f /. i1,f /. i2
reconsider P = L~ g as Subset of (TOP-REAL 2) ;
reconsider p2 = f /. i2, p1 = f /. i1 as Point of (TOP-REAL 2) ;
L~ (Rev g) is_S-P_arc_joining f /. i2,f /. i1
by A1, A2, Th30, Th44;
then
P is_S-P_arc_joining p2,p1
by SPPOL_2:22;
hence
L~ g is_S-P_arc_joining f /. i1,f /. i2
by SPPOL_2:49; verum