Wind forced waves in finite depth: linear and nonlinear models

This work regards the theory of growth of wind forced water waves in finite depth. In the first part of this work, we extend the linear Miles’ theory of water wave propagation to the finite depth under breeze to moderate wind conditions. In the second part, we derive two nonlinear model equations for the evolution of surface water waves in finite depth, namely the Kortewegde Vries-Berger equation and the Nonlinear Schrödinger equation. Their solutions are obtained and their physical interpretations are exhibited..