Geometry, Analysis and Convexity (RSME Springer Series, 17) - Hardcover

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The authors graduated and obtained their PhD in their respective universities in Spain, where they are now full professors. They have written hundreds of research publications, including papers in prestigious journals, book chapters, proceedings and books (eg "Approaching the Kannan-Lovasz Simonovits and variance conjectures"  in 2015, coauthored with Prof. Jesús Bastero). Most of their publications were coauthored with different international experts in the different fields they have worked in. Their main research interest is Convex Geometric Analysis, where these proceedings are framed. As the Conference 'geOmetry, anaLysis & convExity', they have organized other international conferences in different universities. They have also given a huge number of talks in conferences, workshops and seminars and have been part of several funded research projects. They have participated as referees for many peer-reviewed journals and written dozens of reports for Mathematical Reviews.

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These proceedings result from the International Conference 'Geometry, Analysis & Convexity' (OLE 2022) held from 20th to 24th June 2022 at the Instituto de Matemáticas de la Universidad de Sevilla (IMUS), Spain and they include some of the contributions presented at this conference. This book is addressed to any researcher interested in convex geometric analysis and asymptotic analysis as well as integral geometry and discrete geometry and their applications in convexity, and related topics. Convex geometric analysis was born from the increasing interaction between classical (convex) geometry and asymptotic (convex) analysis. During the last three decades, the study of the integral geometry of convex bodies has been fuelled by the introduction of methods, results and new points of view coming from other branches of mathematics such as probability, harmonic analysis, geometry of finite dimensional normed spaces, integral geometry and discrete geometry. These recent advances have revealed fruitful connections between geometric inequalities, transport theory and information theory.

Asymptotic convex analysis is mainly concerned with geometric properties of convex bodies in finite dimensional normed spaces, focused when the dimension tends to infinity. The understanding of high dimensional phenomena becomes an important point since high dimensional problems are frequently encountered in mathematics and applied sciences. Concentration of measure phenomenon can be viewed as an isoperimetric problem, which lies at the heart of classical geometry and calculus of variation. Besides convex geometry, geometric analysis has been developed using techniques and deep theorems from integral geometry, where the notion of measure is generalized to the concept of the so-called valuation, and it has developed from a simple technique to a fundamental area, the theory of valuations. The underlying structure of the valuation space (invariant under translations) is intrinsically connected with affine or analytic isoperimetric inequalities, among others. It is addressed to researchers in this field.