On points at infinity of real spectra of polynomial rings

Abstract

Let R be a real closed field and A=R[x1,...,xn]. Let sper A denote the real spectrum of A. There are two kinds of points in sper A : finite points (those for which all of |x1|,...,|xn| are bounded above by some constant in R) and points at infinity. In this paper we study the structure of the set of points at infinity of sper A and their associated valuations. Let T be a subset of 1,...,n. For j in 1,...,n, let yj=xj if j is not in T and yj=1/xj if j is in T. Let BT=R[y1,...,yn]. We express sper A as a disjoint union of sets of the form UT and construct a homeomorphism of each of the sets UT with a subspace of the space of finite points of sper BT. For each point d at infinity in UT, we describe the associated valuation vd* of its image d* in sper BT in terms of the valuation vd associated to d. Among other things we show that the valuation vd* is composed with vd (in other words, the valuation ring Rd is a localization of Rd* at a suitable prime ideal).