Rigorous proof that slow-moving pattern interfaces exist in arbitrary directions for a broad class of two-dimensional Swift-Hohenberg equations close to a Turing instability, obtained via spatial dynamics and non-standard center manifold reduction.
From Patterns to Function in Living Systems: Dryland Ecosystems as a Case Study
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Slow-moving pattern interfaces in general directions for a two-dimensional Swift-Hohenberg-type equation
Rigorous proof that slow-moving pattern interfaces exist in arbitrary directions for a broad class of two-dimensional Swift-Hohenberg equations close to a Turing instability, obtained via spatial dynamics and non-standard center manifold reduction.