Introduction to Radon Transforms: With Elements of Fractional Calculus and Harmonic Analysis

Hardback

Main Details

Title Introduction to Radon Transforms: With Elements of Fractional Calculus and Harmonic Analysis
Authors and Contributors      By (author) Boris Rubin
SeriesEncyclopedia of Mathematics and its Applications
Physical Properties
Format:Hardback
Pages:596
Dimensions(mm): Height 240,Width 163
ISBN/Barcode 9780521854597
ClassificationsDewey:515.723
Audience
Tertiary Education (US: College)
Illustrations Worked examples or Exercises; 16 Line drawings, unspecified

Publishing Details

Publisher Cambridge University Press
Imprint Cambridge University Press
Publication Date 12 November 2015
Publication Country United Kingdom

Description

The Radon transform represents a function on a manifold by its integrals over certain submanifolds. Integral transformations of this kind have a wide range of applications in modern analysis, integral and convex geometry, medical imaging, and many other areas. Reconstruction of functions from their Radon transforms requires tools from harmonic analysis and fractional differentiation. This comprehensive introduction contains a thorough exploration of Radon transforms and related operators when the basic manifolds are the real Euclidean space, the unit sphere, and the real hyperbolic space. Radon-like transforms are discussed not only on smooth functions but also in the general context of Lebesgue spaces. Applications, open problems, and recent results are also included. The book will be useful for researchers in integral geometry, harmonic analysis, and related branches of mathematics, including applications. The text contains many examples and detailed proofs, making it accessible to graduate students and advanced undergraduates.

Author Biography

Boris Rubin is Professor of Mathematics at Louisiana State University. He is the author of the book Fractional Integrals and Potentials and has written more than one hundred research papers in the areas of fractional calculus, integral geometry, and related harmonic analysis.