In this paper, the finite subspaces of orderings of the ring of regular functions on an algebraic set $V$ are compared with those of the ring of analytic function germs at a point of $V$. Necessary and sufficient conditions for subspaces to be isomorphic are given, both from a purely algebraic and from a more geometric point of view. As a result, a criterion for analytic separation of semialgebraic sets is proved. Extendability of such subspaces is also proved to be stable under suitable approximations.
Algebraic and analytic finite spaces of orderings
PERNAZZA, LUDOVICO
2004-01-01
Abstract
In this paper, the finite subspaces of orderings of the ring of regular functions on an algebraic set $V$ are compared with those of the ring of analytic function germs at a point of $V$. Necessary and sufficient conditions for subspaces to be isomorphic are given, both from a purely algebraic and from a more geometric point of view. As a result, a criterion for analytic separation of semialgebraic sets is proved. Extendability of such subspaces is also proved to be stable under suitable approximations.File in questo prodotto:
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