let n be Element of NAT ; for C being compact non horizontal non vertical Subset of (TOP-REAL 2) holds Upper_Seq C,n is_a_h.c._for Cage C,n
let C be compact non horizontal non vertical Subset of (TOP-REAL 2); Upper_Seq C,n is_a_h.c._for Cage C,n
A1: ((Upper_Seq C,n) /. 1) `1 =
(W-min (L~ (Cage C,n))) `1
by JORDAN1F:5
.=
W-bound (L~ (Cage C,n))
by EUCLID:56
;
A2: ((Upper_Seq C,n) /. (len (Upper_Seq C,n))) `1 =
(E-max (L~ (Cage C,n))) `1
by JORDAN1F:7
.=
E-bound (L~ (Cage C,n))
by EUCLID:56
;
Upper_Seq C,n is_in_the_area_of Cage C,n
by JORDAN1E:21;
hence
Upper_Seq C,n is_a_h.c._for Cage C,n
by A1, A2, SPRECT_2:def 2; verum