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Polynomials and polynomial inequalities

✍ Scribed by Peter Borwein, Tamas Erdelyi

Publisher
Springer
Year
1995
Tongue
English
Leaves
496
Series
Graduate Texts in Mathematics
Edition
1
Category
Library
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πŸ“œ SIMILAR VOLUMES

Polynomials and Polynomial Inequalities
πŸ“ Polynomials and Polynomial Inequalities
✍ Peter Borwein, TamΓ‘s ErdΓ©lyi (auth.) πŸ“‚ Library πŸ“… 1995 πŸ› Springer-Verlag New York 🌐 English

<p>Polynomials pervade mathematics, virtually every branch of mathematics from algebraic number theory and algebraic geometry to applied analysis and computer science, has a corpus of theory arising from polynomials. The material explored in this book primarily concerns polynomials as they arise in

Polynomials and Polynomial Inequalities
πŸ“ Polynomials and Polynomial Inequalities
✍ Peter Borwein, TamΓ‘s ErdΓ©lyi (auth.) πŸ“‚ Library πŸ“… 1995 πŸ› Springer-Verlag New York 🌐 English

<p>Polynomials pervade mathematics, virtually every branch of mathematics from algebraic number theory and algebraic geometry to applied analysis and computer science, has a corpus of theory arising from polynomials. The material explored in this book primarily concerns polynomials as they arise in

Polynomials and Polynomial Inequalities
πŸ“ Polynomials and Polynomial Inequalities
✍ Peter Borwein, TamΓ‘s ErdΓ©lyi (auth.) πŸ“‚ Library πŸ“… 1995 πŸ› Springer-Verlag New York 🌐 English

<p>Polynomials pervade mathematics, virtually every branch of mathematics from algebraic number theory and algebraic geometry to applied analysis and computer science, has a corpus of theory arising from polynomials. The material explored in this book primarily concerns polynomials as they arise in

Polynomials and Polynomial Inequalities
πŸ“ Polynomials and Polynomial Inequalities
✍ Peter Borwein, TamΓ‘s ErdΓ©lyi πŸ“‚ Library πŸ“… 1995 πŸ› Springer 🌐 English

After an introduction to the geometry of polynomials and a discussion of refinements of the Fundamental Theorem of Algebra, the book turns to a consideration of various special polynomials. Chebyshev and Descartes systems are then introduced, and MΓΌntz systems and rational systems are examined in de