Author	Adams, David R. author
Title	Morrey Spaces [electronic resource] / by David R. Adams
Imprint	Cham : Springer International Publishing : Imprint: Birkhäuser, 2015
Edition	1st ed. 2015
Connect to	http://dx.doi.org/10.1007/978-3-319-26681-7
Descript	XVII, 124 p. 1 illus. online resource

In this set of lecture notes, the author includes some of the latest research on the theory of Morrey Spaces associated with Harmonic Analysis. There are three main claims concerning these spaces that are covered: determining the integrability classes of the trace of Riesz potentials of an arbitrary Morrey function; determining the dimensions of singular sets of weak solutions of PDE (e.g. The Meyers-Elcart System); and determining whether there are any “full” interpolation results for linear operators between Morrey spaces. This book will serve as a useful reference to graduate students and researchers interested in Potential Theory, Harmonic Analysis, PDE, and/or Morrey Space Theory.

Introduction -- Function Spaces -- Hausforff Capacity -- Choquet Integrals -- Duality for Morrey Spaces -- Maximal Operators and Morrey Spaces -- Potential Operators on Morrey Spaces -- Singular Integrals on Morrey Spaces -- Morrey-Sobolev Capacities -- Traces of Morrey Potentials -- Interpolation of Morrey Spaces -- Commutators of Morrey Potentials -- Mock Morrey Spaces -- Morrey-Besov Spaces and Besov Capacities -- Morrey Potentials and PDE I -- Morrey Potentials and PDE II -- Morrey Spaces on Complete Riemannian Manifolds

1. Mathematics
2. Harmonic analysis
3. Functional analysis
4. Operator theory
5. Partial differential equations
6. Mathematics
7. Abstract Harmonic Analysis
8. Partial Differential Equations
9. Functional Analysis
10. Operator Theory