In the last chapter we deal with inequalities. We describe a class of semianalytic sets defined by countably many global real analytic functions that is stable under topological properties and under proper holomorphic maps between Stein spaces, that is, verifies a direct image theorem. A smaller class admits also a decomposition into irreducible components as it happens for semialgebraic sets. Duringthe redaction some proofs have been simplified with respect to the original ones.
In the last chapter we deal with inequalities. We describe a class of semianalytic sets defined by countably many global real analytic functions that is stable under topological properties and under proper holomorphic maps between Stein spaces, that is, verifies a direct image theorem. A smaller class admits also a decomposition into irreducible components as it happens for semialgebraic sets. Duringthe redaction some proofs have been simplified with respect to the original ones.
![Topics in Global Real Analytic Geometry](http://img.images-bn.com/static/redesign/srcs/images/grey-box.png?v11.10.4)
Topics in Global Real Analytic Geometry
273![Topics in Global Real Analytic Geometry](http://img.images-bn.com/static/redesign/srcs/images/grey-box.png?v11.10.4)
Topics in Global Real Analytic Geometry
273Paperback(1st ed. 2022)
Product Details
ISBN-13: | 9783030966683 |
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Publisher: | Springer International Publishing |
Publication date: | 06/16/2022 |
Series: | Springer Monographs in Mathematics |
Edition description: | 1st ed. 2022 |
Pages: | 273 |
Product dimensions: | 6.10(w) x 9.25(h) x (d) |