Common Zeros of Polynominals in Several Variables and Higher Dimensional Quadrature
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A01=Yuan Xu
advanced calculus
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Algebraic ideal theory
Author_Yuan Xu
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Category1=Non-Fiction
Category=PBKJ
Common Zeros
Commuting Condition
COP=United Kingdom
Cubature Formula
Degree 2n
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Distinct Zeros
eq_isMigrated=2
eq_nobargain
Favard's Theorem
Favard’s Theorem
Finite Moments
Follow
functional analysis
Hankel Matrix
Higher dimensional quadrature
Holds
Lagrange Interpolation
Language_English
Lower Bound
mathematical modeling
Matrix Equations
multivariate analysis
multivariate polynomial zero distribution
Nonlinear Matrix Equations
Null Space
numerical integration methods
Odd
Orthogonal Polynomial
Orthogonal polynomials
Orthonormal Polynomials
PA=Temporarily unavailable
Price_€100 and above
PS=Active
Quadrature Formula
R D
Radon
Skew Symmetric Matrix
softlaunch
Symmetric Polynomials
theoretical mathematics
Vector Matrix Notation
Weight Functions
ℝ D
Product details
- ISBN 9781138417731
- Weight: 453g
- Dimensions: 165 x 241mm
- Publication Date: 28 Jun 2018
- Publisher: Taylor & Francis Ltd
- Publication City/Country: GB
- Product Form: Hardback
- Language: English
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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.
