On homeomorphisms and C1 maps

Abstract

Our purpose in this article is first, following [8], to prove that if α , β are any points of the open unit disc D(0;1) in the complex plane C and r, s are any positive real numbers such that D( α ;r) ⊂eq D(0;1) and D( β ;s) ⊂eq D(0;1), then there exist t ∈ (0,1) and a homeomorphism h : D(0;1) → D(0;1) such that D( α ;r) ⊂eq D(0;t), D( β ;s) ⊂eq D(0;t), h [ D( α ;r) ] = D( β ;s) and h = id on D(0;1) D(0;t), and second, following [9], to prove that if q ∈ N \ 0, 1 \ and B( 0;1) is the open unit ball in Rq, while for any t>0, we set f(t)( x ) = t x 1 + (t-1) x , whenever x ∈ B( 0;1), then f(t) → id in C1 ( B( 0;1) , Rq ) as t → 1+.