Simple Homotopy Types and Finite Spaces

JONATHAN ARIEL BARMAK; ELIAS GABRIEL MINIAN

ADVANCES IN MATHEMATICS

ACADEMIC PRESS INC ELSEVIER SCIENCE

Año: 2008 vol. 218 p. 87 - 104

0001-8708

We present a new approach to simple homotopy theory of polyhedra using finite topological spaces. We define the concept of collapse of a finite space and prove that this new notion corresponds exactly to the concept of a simplicial collapse. More precisely, we show that a collapse XY of finite spaces induces a simplicial collapse K(X)K(Y ) of their associated simplicial complexes. Moreover, a simplicial collapse K L induces a collapse X(K)X(L) of the associated finite spaces. This establishes a one-to-one correspondence between simple homotopy types of finite simplicial complexes and simple equivalence classes of finite spaces.We also prove a similar result for maps:We give a complete characterization of the class of maps between finite spaces which induce simple homotopy equivalences between the associated polyhedra. This class describes all maps coming from simple homotopy equivalences at the level of complexes. The advantage of this theory is that the elementary move of finite spaces is much simpler than the elementary move of simplicial complexes: It consists of removing (or adding) just a single point of the space.