Maximum principles involving the uniformly elliptic nonlocal operator

Abstract: In this paper, we consider equations involving a uniformly elliptic nonlocal operator where the function is uniformly bounded and radial decreasing. We establish some maximum principles for in bounded and unbounded domains. Since there is no decay condition in the unbounded domain, we make use of an approximate method to estimate the singular integral to get the maximum principle. As applications of these principles, by carrying out the method of moving planes, we give the monotonicity of solutions to t… Show more

“…Recently, Qu et al [13] introduced the monotonicity of semilinear equations involving the uniform elliptic operator $$$ {A}_s $$$ by the sliding method. Recently, Jiayan et al [14] presented the monotonicity of generalized Schrodinger equation involving the operator $$$ {A}_s $$$ in a weaker condition. In 2023, Chen and Ma [15] presented a new method of moving planes to study the qualitative properties of solutions for dual fractional nonlinear parabolic by establishing some maximum principles and averaging effects.…”

Qualitative properties of solutions for dual parabolic equation involving uniformly elliptic nonlocal operator

“…Recently, Qu et al [13] introduced the monotonicity of semilinear equations involving the uniform elliptic operator $$$ {A}_s $$$ by the sliding method. Recently, Jiayan et al [14] presented the monotonicity of generalized Schrodinger equation involving the operator $$$ {A}_s $$$ in a weaker condition. In 2023, Chen and Ma [15] presented a new method of moving planes to study the qualitative properties of solutions for dual fractional nonlinear parabolic by establishing some maximum principles and averaging effects.…”

Qualitative properties of solutions for dual parabolic equation involving uniformly elliptic nonlocal operator