Existence and Uniqueness of the Minimizing Solution of Choquard's Nonlinear Equation
- 1 October 1977
- journal article
- research article
- Published by Wiley in Studies in Applied Mathematics
- Vol. 57 (2) , 93-105
- https://doi.org/10.1002/sapm197757293
Abstract
The equation dealt with in this paper is urn:x-wiley:00222526:media:sapm197757293:sapm197757293-math-0001 in three dimensions. It comes from minimizing the functional urn:x-wiley:00222526:media:sapm197757293:sapm197757293-math-0002 which, in turn, comes from an approximation to the Hartree‐Fock theory of a plasma. It describes an electron trapped in its own hole. The interesting mathematical aspect of the problem is that is not convex, and usual methods to show existence and uniqueness of the minimum do not apply. By using symmetrie decreasing re arrangement inequalities we are able to prove existence and uniqueness (modulo translations) of a minimizing ϕ. To prove uniqueness a strict form of the inequality, which we believe is new, is employed.This publication has 2 references indexed in Scilit:
- A general rearrangement inequality for multiple integralsJournal of Functional Analysis, 1974
- Minimum Value for c in the Sobolev Inequality $\| {\phi ^3 } \|\leqq c\| {\nabla \phi } \|^3 $SIAM Journal on Applied Mathematics, 1971