Positive Polynomials: From Hilbert’s 17th Problem to Real Algebra (Springer Monographs in Mathematics)

<p>Positivity is one of the most basic mathematical concepts. In many areas of mathematics (like analysis, real algebraic geometry, functional analysis, etc.) it shows up as positivity of a polynomial on a certain subset of R^n which itself is often given by polynomial inequalities. The main objecti

Positivity is one of the most basic mathematical concepts, involved in many areas of mathematics (analysis, real algebraic geometry, functional analysis, etc.). The main objective of the book is to give useful characterizations of polynomials. Beyond basic knowledge in algebra, only valuation theory

<span><p>This book presents a thorough discussion of the theory of abstract inverse linear problems on Hilbert space. Given an unknown vector <i>f</i> in a Hilbert space <i>H</i>, a linear operator <i>A</i> acting on <i>H</i>, and a vector <i>g</i> in <i>H</i> satisfying <i>Af=g</i>, one is interest

In the late sixties Matiyasevich, building on the work of Davis, Putnam and Robinson, showed that there was no algorithm to determine whether a polynomial equation in several variables and with integer coefficients has integer solutions. Hilbert gave finding such an algorithm as problem number ten o

<p><span>A concise outline of the basic facts of potential theory and quasiconformal mappings makes this book an ideal introduction for non-experts who want to get an idea of applications of potential theory and geometric function theory in various fields of construction analysis.</span></p>