Polynomials and Polynomial Inequalities

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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 analysis; it focuses on polynomials and rational functions of a single variable. The book is self-contained and assumes at most a senior-undergraduate familiarity with real and complex analysis.
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 Müntz systems and rational systems are examined in detail. Subsequent chapters discuss denseness questions and the inequalities satisfied by polynomials and rational functions. Appendices on algorithms and computational concerns, on the interpolation theorem, and on orthogonality and irrationality conclude the book.

Author(s): Peter Borwein, Tamás Erdélyi (auth.)
Series: Graduate Texts in Mathematics 161
Edition: 1
Publisher: Springer-Verlag New York
Year: 1995

Language: English
Pages: 480
City: New York
Tags: Analysis; Algebra

Front Matter....Pages i-x
Introduction and Basic Properties....Pages 1-28
Some Special Polynomials....Pages 29-90
Chebyshev and Descartes Systems....Pages 91-153
Denseness Questions....Pages 154-226
Basic Inequalities....Pages 227-274
Inequalities in Müntz Spaces....Pages 275-319
Inequalities for Rational Function Spaces....Pages 320-355
Back Matter....Pages 356-482