• Order to parcel locker

    Order to parcel locker
  • easy pay

    easy pay
  • Reduced price
Introduction to Radon Transforms: With Elements of Fractional Calculus and Harmonic Analysis

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

9780521854597
951.30 zł
856.17 zł Save 95.13 zł Tax included
Lowest price within 30 days before promotion: 856.17 zł
Quantity
Available in 4-6 weeks

  Delivery policy

Choose Paczkomat Inpost, Orlen Paczka, DPD or Poczta Polska. Click for more details

  Security policy

Pay with a quick bank transfer, payment card or cash on delivery. Click for more details

  Return policy

If you are a consumer, you can return the goods within 14 days. Click for more details

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.
Product Details
66480
9780521854597
9780521854597

Data sheet

Publication date
2015
Issue number
1
Cover
hard cover
Pages count
596
Dimensions (mm)
163.00 x 240.00
Weight (g)
1070
  • 1. Preliminaries; 2. Fractional integration:: functions of one variable; 3. Riesz potentials; 4. The Radon transform on Rn; 5. Operators of integral geometry on the unit sphere; 6. Operators of integral geometry in the hyperbolic space; 7. Spherical mean Radon transforms.
Comments (0)