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Yuan Xu
Common Zeros of Polynominals in Several Variables and Higher Dimensional Quadrature
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2569334Common Zeros of Polynominals in Several Variables and Higher Dimensional Quadraturehttps://www.gandhi.com.mx/common-zeros-of-polynominals-in-several-variables-and-higher-dimensional-quadrature-9781000153781/phttps://gandhi.vtexassets.com/arquivos/ids/3625858/da70a2a2-0419-48ec-87e3-77a9010685e5.jpg?v=63838564534897000030973097MXNCRC PressInStock/Ebooks/<p>Presents a systematic study of the common zeros of polynomials in several variables which are related to higher dimensional quadrature. The author uses a new approach which is based on the recent development of orthogonal polynomials in several variables and differs significantly from the previous ones based on algebraic ideal theory. Featuring a great deal of new work, new theorems and, in many cases, new proofs, this self-contained work will be of great interest to researchers in numerical analysis, the theory of orthogonal polynomials and related subjects.</p>...2505387Common Zeros of Polynominals in Several Variables and Higher Dimensional Quadrature30973097https://www.gandhi.com.mx/common-zeros-of-polynominals-in-several-variables-and-higher-dimensional-quadrature-9781000153781/phttps://gandhi.vtexassets.com/arquivos/ids/3625858/da70a2a2-0419-48ec-87e3-77a9010685e5.jpg?v=638385645348970000InStockMXN99999DIEbook20209781000153781_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9781000153781_<p>Presents a systematic study of the common zeros of polynomials in several variables which are related to higher dimensional quadrature. The author uses a new approach which is based on the recent development of orthogonal polynomials in several variables and differs significantly from the previous ones based on algebraic ideal theory. Featuring a great deal of new work, new theorems and, in many cases, new proofs, this self-contained work will be of great interest to researchers in numerical analysis, the theory of orthogonal polynomials and related subjects.</p>(*_*)9781000153781_<p>Presents a systematic study of the common zeros of polynomials in several variables which are related to higher dimensional quadrature. The author uses a new approach which is based on the recent development of orthogonal polynomials in several variables and differs significantly from the previous ones based on algebraic ideal theory. Featuring a great deal of new work, new theorems and, in many cases, new proofs, this self-contained work will be of great interest to researchers in numerical analysis, the theory of orthogonal polynomials and related subjects.</p>...9781000153781_CRC Presslibro_electonico_b82212ba-dc00-3fa3-8f21-cfc28da84239_9781000153781;9781000153781_9781000153781Yuan XuInglésMéxicohttps://getbook.kobo.com/koboid-prod-public/taylorandfrancis-epub-2c6d9c23-0421-46e8-af23-f78c5c23315e.epub2020-12-17T00:00:00+00:00CRC Press