Existence and convergence of least-energy solutions involving the logarithmic Schrödinger operator

Key Points

• Least-energy solutions converge under specific conditions, providing critical insights into the logarithmic Schrödinger operator.
• Key evidence includes the characterization of solutions within the context of the energy functional framework.
• The assessment employs variational methods to establish fundamental properties of the energy landscape.
• This work highlights the significance of convergence for theoretical applications in nonlinear analysis.