On the existence results  for a class of  singular elliptic system involving indefinite weight functions and asymptotically linear growth forcing term

Ghasem A. Afrouzi; S. Shakeri; N. T. Chung

doi:10.5269/bspm.v37i3.31983

Autores/as

Ghasem A. Afrouzi University of Mazandaran Faculty of Mathematical Sciences Department of Mathematics
S. Shakeri Ayatollah Amoli Branch, Islamic Azad University Department of Mathematics
N. T. Chung Quang Binh University Department of Mathematics and Informatics

DOI:

https://doi.org/10.5269/bspm.v37i3.31983

Palabras clave:

Infinite semipositone problems, Indefinite weight, Asymptotically linear growth forcing terms, Sub-supersolution method

Resumen

In this work, we study the existence of positive solutions to the singular system
$$
\left\{\begin{array}{ll}
-\Delta_{p}u = \lambda a(x)f(v)-u^{-\alpha} & \textrm{ in }\Omega,\\
-\Delta_{p}v = \lambda b(x)g(u)-v^{-\alpha} & \textrm{ in }\Omega,\\
u = v= 0 & \textrm{ on }\partial \Omega,
\end{array}\right.
$$
where $\lambda $ is positive parameter, $\Delta_{p}u=\textrm{div}(|\nabla u|^{p-2} \nabla u)$, $p>1$, $ \Omega \subset R^{n} $ some for $ n >1 $, is a bounded domain with smooth boundary $\partial \Omega $ , $ 0<\alpha< 1 $, and $f,g: [0,\infty] \to\R$ are continuous, nondecreasing functions which are asymptotically $ p $-linear at $\infty$. We prove the existence of a positive solution for a certain range of $\lambda$ using the method of sub-supersolutions.