Nonlinear Schr¨odinger Equation with an Exponential Oceanic Term: A Bohmian Approach and the Ermakov–Lewis Invariant

Key Points

• This research aims to develop a one-dimensional nonlinear Schrödinger equation that incorporates an exponential term reflecting ocean dynamics.
• Formulated a nonlinear Schrödinger equation with an exponential term related to ocean wave intensity.
• Examined the model for localized solutions exhibiting exponential growth.
• Derived an Ermakov-type equation from the width dynamics and identified the generalized Ermakov–Lewis invariant.
• Localized solutions were found, showing exponential growth similar to waterspouts.
• The dynamics of these solutions were framed through an Ermakov-type equation.
• A generalized Ermakov–Lewis invariant was established in relation to the model.