Abstract
We study free surface water waves in a 2-D symmetric triangular channel with sides that have a 45° slope. We develop models for small amplitude nonlinear waves, extending earlier studies that have considered the linearized problem. We show that a combination of heuristic small amplitude expansions and the equations of motion for free surface potential flow lead to a relatively simple system that we then use to study interactions of low frequency modes. The formalism relies on an explicit construction of the normal modes of the linear problem and a new way to represent the free surface. We argue that the construction can be applied to more general geometries. We also examine the structure and some dynamical features of spectral truncations for the lowest even modes.
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