Convergence of least energy sign-changing solutions for logarithmic Schr\"odinger equations on locally finite graphs

Abstract

In this paper, we study the following logarithmic Schr\"odinger equation \[ - u+λ a(x)u=u u2\ \ \ \ in V \] on a connected locally finite graph G=(V,E), where denotes the graph Laplacian, λ > 0 is a constant, and a(x) ≥ 0 represents the potential. Using variational techniques in combination with the Nehari manifold method based on directional derivative, we can prove that, there exists a constant λ0>0 such that for all λ≥λ0, the above problem admits a least energy sign-changing solution uλ. Moreover, as λ+∞, we prove that the solution uλ converges to a least energy sign-changing solution of the following Dirichlet problem \[cases - u=u u2~~~& in ,\\ u(x)=0~~~& on ∂, cases\] where =\x∈ V: a(x)=0\ is the potential well.