On spectral types of semialgebraic sets

Abstract

In this work we prove that a semialgebraic set M⊂ Rm is determined (up to a semialgebraic homeomorphism) by its ring S(M) of (continuous) semialgebraic functions while its ring S*(M) of (continuous) bounded semialgebraic functions only determines M besides a distinguished finite subset η(M)⊂ M. In addition it holds that the rings S(M) and S*(M) are isomorphic if and only if M is compact. On the other hand, their respective maximal spectra βs M and βs* M endowed with the Zariski topology are always homeomorphic and topologically classify a `large piece' of M. The proof of this fact requires a careful analysis of the points of the remainder ∂ M:=βs* M M associated with formal paths.