ON THE WOLFF-TYPE INTEGRAL SYSTEM WITH NEGATIVE EXPONENTS

Rong Zhang

doi:10.1216/rmj.2022.52.2211

Abstract

Here, we are concerned with the positive continuous entire solutions of the Wolff-type integral system

$\{\begin{array}{c}u(x)=C_1(x)W_{\beta,\gamma}(v^{-q})(x),\hspace{1em}u,v>0\text{in}\;\mathbb{R}^n,\hspace{1em}\\v(x)=C_2(x)W_{\beta,\gamma}(u^{-p})(x),\hspace{1em}p,q>0,\hspace{1em}\end{array}$

where $n\geq1$ , $\gamma>1$ , $\beta>0$ and $\beta\gamma\neq n$ . In addition, $C_i(x)\hspace{0.33em}(i=1,2)$ are some double bounded functions. When $\beta\gamma\in(0,n)$ , the Serrin-type condition is critical for existence of positive solutions for some double bounded functions $C_i(x)$ $(i=1,2)$ . Such an integral equation system is related to the study of the $\gamma$ -Laplace system and $k$ -Hessian system with negative exponents. Estimated by the integral of the Wolff type potential, we obtain the asymptotic rates and the integrability of positive solutions, and study whether the radial solutions exist.

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Rong Zhang. "ON THE WOLFF-TYPE INTEGRAL SYSTEM WITH NEGATIVE EXPONENTS." Rocky Mountain J. Math. 52 (6) 2211 - 2228, December 2022. https://doi.org/10.1216/rmj.2022.52.2211

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Received: 19 September 2021; Revised: 25 February 2022; Accepted: 12 April 2022; Published: December 2022

First available in Project Euclid: 28 December 2022

MathSciNet: MR4527019

zbMATH: 1505.45005

Digital Object Identifier: 10.1216/rmj.2022.52.2211

Subjects:

Primary: 45G15 , 45M20

Keywords: asymptotic limit , k-Hessian system , Serrin-type condition , Wolff-type potential , γ-Laplace system

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