Intermediate algebras of semialgebraic functions

Abstract

We characterize intermediate R-algebras A between the ring of semialgebraic functions S(X) and the ring S*(X) of bounded semialgebraic functions on a semialgebraic set X as rings of fractions of S(X). This allows us to compute the Krull dimension of A, the transcendence degree over R of the residue fields of A and to obtain a ojasiewicz inequality and a Nullstellensatz for archimedean R-algebras A. In addition we study intermediate R-algebras generated by proper ideals and we prove an extension theorem for functions in such R-algebras.

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