ABSTRACT. Most of the “extremal problems ” of Harmonic (or Fourier) Analysis which emerged before the year 2000 were actually born in the twentieth century, and their emergences were scattered throughout that century, including the two world war periods. A great many of these problems pertain to polynomials, trigonometric poly-nomials and (finite) exponential sums. Writing a reasonably complete monograph on this huge subject (even if we choose to restrict it to polynomials only) would be a monumental task, although the literature does indeed contain some valuable mono-graphs on various aspects of the subject. The present text just touches upon a number of extremal problems on polynomials and trigonometric polynomials, with the hope of expan...
An exponential polynomial is a finite linear sum of terms $P(z)e^{Q(z)}$, where $P(z)$ and $Q(z)$ ar...
International audienceEhrhart polynomials are amazing mathematical objects that I discovered in the ...
For odd square-free n ? 1 the cyclotomic polynomial \Phi n (x) satisfies the identity of Gauss 4\Phi...
This book explains some recent applications of the theory of polynomials and algebraic geometry to c...
Polynomials are well known for their ability to improve their properties and for their applicability...
Polynomials play a crucial role in many areas of mathematics including algebra, analysis, number the...
Fourier Series are a powerful tool in Applied Mathematics; indeed, their importance is twofold since...
-1 Special foreword Before the real Foreword, let me say some words about this book. It is ready in ...
This first volume, a three-part introduction to the subject, is intended for students with a beginni...
The fundamental theorem of algebra (FTA) tells us that every com-plex polynomial of degree n has pre...
Fourier series are an important tool of mathematical analysis with many applicati- ons. This thesis ...
This article focuses on those problems about extremal properties of polynomials that were considered...
This manuscript describes a number of algorithms that can be used to quickly evaluate a polynomial o...
The factors of polynomials of the form x^n-1, called cyclotomic polynomials, have various properties...
My research lies in harmonic analysis, overlapping the areas of pure and applied mathematics, and o...
An exponential polynomial is a finite linear sum of terms $P(z)e^{Q(z)}$, where $P(z)$ and $Q(z)$ ar...
International audienceEhrhart polynomials are amazing mathematical objects that I discovered in the ...
For odd square-free n ? 1 the cyclotomic polynomial \Phi n (x) satisfies the identity of Gauss 4\Phi...
This book explains some recent applications of the theory of polynomials and algebraic geometry to c...
Polynomials are well known for their ability to improve their properties and for their applicability...
Polynomials play a crucial role in many areas of mathematics including algebra, analysis, number the...
Fourier Series are a powerful tool in Applied Mathematics; indeed, their importance is twofold since...
-1 Special foreword Before the real Foreword, let me say some words about this book. It is ready in ...
This first volume, a three-part introduction to the subject, is intended for students with a beginni...
The fundamental theorem of algebra (FTA) tells us that every com-plex polynomial of degree n has pre...
Fourier series are an important tool of mathematical analysis with many applicati- ons. This thesis ...
This article focuses on those problems about extremal properties of polynomials that were considered...
This manuscript describes a number of algorithms that can be used to quickly evaluate a polynomial o...
The factors of polynomials of the form x^n-1, called cyclotomic polynomials, have various properties...
My research lies in harmonic analysis, overlapping the areas of pure and applied mathematics, and o...
An exponential polynomial is a finite linear sum of terms $P(z)e^{Q(z)}$, where $P(z)$ and $Q(z)$ ar...
International audienceEhrhart polynomials are amazing mathematical objects that I discovered in the ...
For odd square-free n ? 1 the cyclotomic polynomial \Phi n (x) satisfies the identity of Gauss 4\Phi...