let f be FinSequence of (TOP-REAL 2); :: thesis: for p being Point of (TOP-REAL 2) st f is almost-one-to-one & f is special & f is unfolded & f is s.n.c. & p in L~ f & p <> f . 1 holds
R_Cut (f,p) is being_S-Seq
let p be Point of (TOP-REAL 2); :: thesis: ( f is almost-one-to-one & f is special & f is unfolded & f is s.n.c. & p in L~ f & p <> f . 1 implies R_Cut (f,p) is being_S-Seq )
assume that
A1: ( f is almost-one-to-one & f is special & f is unfolded & f is s.n.c. ) and
A2: p in L~ f and
A3: p <> f . 1 ; :: thesis: R_Cut (f,p) is being_S-Seq
R_Cut (f,p) is_S-Seq_joining f /. 1,p by A1, A2, A3, Th39;
hence R_Cut (f,p) is being_S-Seq by JORDAN3:def 2; :: thesis: verum