Existence results of infinitely many weak solutions of a singular subelliptic system on the Heisenberg group

S. Heidari; A. Razani

doi:10.2478/ausm-2022-0006

Abstract

This article shows the existence and multiplicity of weak solutions for the singular subelliptic system on the Heisenberg group ${\begin{array}{l} - Δ_{ℍ^{n}} u + a (ξ) \frac{u}{{({| z |}^{4} + t^{2})}^{\frac{1}{2}}} = λ F_{u} (ξ, u, v) & i n Ω, \\ - Δ_{ℍ^{n}} v + b (ξ) \frac{v}{{({| z |}^{4} + t^{2})}^{\frac{1}{2}}} = λ F_{v} (ξ, u, v) & i n Ω, \\ u = v = 0 & o n \partial Ω . \end{array}$ \left\{ {\matrix{ { - {\Delta _{{\mathbb{H}^n}}}u + a\left( \xi \right){u \over {{{\left( {{{\left| z \right|}^4} + {t^2}} \right)}^{{1 \over 2}}}}} = \lambda {F_u}\left( {\xi ,u,v} \right)} \hfill & {in\,\,\,\Omega ,} \hfill \cr { - {\Delta _{{\mathbb{H}^n}}}v + b\left( \xi \right){v \over {{{\left( {{{\left| z \right|}^4} + {t^2}} \right)}^{{1 \over 2}}}}} = \lambda {F_v}\left( {\xi ,u,v} \right)} \hfill & {in\,\,\,\Omega ,} \hfill \cr {u = v = 0} \hfill & {on\,\,\partial \Omega .} \hfill \cr } } \right. The approach is based on variational methods.

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Existence results of infinitely many weak solutions of a singular subelliptic system on the Heisenberg group

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