Classification of solutions for an integral equation

Wenxiong Chen,

wchen@yu.edu

Department of Mathematics, Yeshiva University, 500 W. 185th St., New York, NY 10033

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Congming Li,

cli@colorado.edu

Department of Applied Mathematics, Campus Box 526, University of Colorado at Boulder, Boulder, CO 80309

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Biao Ou,

bou@math.utoledo.edu

Department of Mathematics, University of Toledo, Toledo, OH 43606

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Wenxiong Chen,

wchen@yu.edu

Department of Mathematics, Yeshiva University, 500 W. 185th St., New York, NY 10033

Search for more papers by this author

Congming Li,

cli@colorado.edu

Department of Applied Mathematics, Campus Box 526, University of Colorado at Boulder, Boulder, CO 80309

Search for more papers by this author

Biao Ou,

bou@math.utoledo.edu

Department of Mathematics, University of Toledo, Toledo, OH 43606

Search for more papers by this author

First published: 19 December 2005

https://doi.org/10.1002/cpa.20116

Citations: 371

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Abstract

Let n be a positive integer and let 0 < α < n. Consider the integral equation

We prove that every positive regular solution u(x) is radially symmetric and monotone about some point and therefore assumes the form

with some constant c = c(n, α) and for some t > 0 and x₀ ϵ ℝⁿ. This solves an open problem posed by Lieb 12. The technique we use is the method of moving planes in an integral form, which is quite different from those for differential equations. From the point of view of general methodology, this is another interesting part of the paper.

Moreover, we show that the family of well-known semilinear partial differential equations