Semistar-Krull and Valuative Dimension of Integral Domains

Abstract

Given a stable semistar operation of finite type on an integral domain D, we show that it is possible to define in a canonical way a stable semistar operation of finite type [X] on the polynomial ring D[X], such that, if n:=-(D), then n+1≤ [X]-(D[X])≤ 2n+1. We also establish that if D is a -Noetherian domain or is a Pr\"ufer -multiplication domain, then [X]-(D[X])=-(D)+1. Moreover we define the semistar valuative dimension of the domain D, denoted by -v(D), to be the maximal rank of the -valuation overrings of D. We show that -v(D)=n if and only if [X1,...,Xn]-v(D[X1,...,Xn])=2n, and that if -v(D)<∞ then [X]-v(D[X])=-v(D)+1. In general -(D)≤-v(D) and equality holds if D is a -Noetherian domain or is a Pr\"ufer -multiplication domain. We define the -Jaffard domains as domains D such that -(D)<∞ and -(D)=-v(D). As an application, -quasi-Pr\"ufer domains are characterized as domains D such that each (,')-linked overring T of D, is a '-Jaffard domain, where ' is a stable semistar operation of finite type on T. As a consequence of this result we obtain that a Krull domain D, must be a wD-Jaffard domain.