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- Analytic_polyhedron abstract "In mathematics, especially several complex variables, an analytic polyhedron is a subset of the complex space of the formwhere is a bounded connected open subset of and are holomorphic on D. If above are polynomials, then the set is called a polynomial polyhedron. Every analytic polyhedron is a domain of holomorphy (thus, pseudo-convex.)The boundary of an analytic polyhedron is the union of the set of hypersurfaces An analytic polyhedron is a Weil polyhedron, or Weil domain if the intersection of hypersurfaces has dimension no greater than .See also: the Behnke–Stein theorem.".
- Analytic_polyhedron wikiPageID "21663267".
- Analytic_polyhedron wikiPageRevisionID "575113418".
- Analytic_polyhedron hasPhotoCollection Analytic_polyhedron.
- Analytic_polyhedron subject Category:Several_complex_variables.
- Analytic_polyhedron type PhysicalEntity100001930.
- Analytic_polyhedron type SeveralComplexVariables.
- Analytic_polyhedron type Thing100002452.
- Analytic_polyhedron type Variable109468959.
- Analytic_polyhedron comment "In mathematics, especially several complex variables, an analytic polyhedron is a subset of the complex space of the formwhere is a bounded connected open subset of and are holomorphic on D. If above are polynomials, then the set is called a polynomial polyhedron.".
- Analytic_polyhedron label "Analytic polyhedron".
- Analytic_polyhedron sameAs m.05mt9mh.
- Analytic_polyhedron sameAs Q4751135.
- Analytic_polyhedron sameAs Q4751135.
- Analytic_polyhedron sameAs Analytic_polyhedron.
- Analytic_polyhedron wasDerivedFrom Analytic_polyhedron?oldid=575113418.
- Analytic_polyhedron isPrimaryTopicOf Analytic_polyhedron.