Triangular homotopy equivalences

Abstract

A map f:X Y to a simplicial complex Y is called a Y-triangular homotopy equivalence if it has a homotopy inverse g and homotopies h1:f g idY, h2:g f idX such that for all simplices σ∈ Y, f|σ:f-1(σ) σ is a homotopy equivalence with inverse g|σ:σ f-1(σ) and homotopies h1|σ and h2|σ. In this paper we prove that for all pairs X,Y of finite-dimensional locally finite simplicial complexes there is an ε(X,Y)>0 such that any ε-controlled homotopy equivalence f:X Y for ε<ε(X,Y) is homotopic to a Y-triangular homotopy equivalence. Conversely, we conjecture that it is possible to `subdivide' a Y-triangular homotopy equivalence by finding a homotopic (Sd\, Y)-triangular homotopy equivalence, consequently a Y-triangular homotopy equivalence would be homotopic to an ε-controlled homotopy equivalence for all ε>0.