A structure-preserving parametric approximation for anisotropic geometric flows via an α-surface energy matrix
Abstract
We propose a structure-preserving parametric approximation for geometric flows with general anisotropic effects. By introducing a hyperparameter α, we construct a unified surface energy matrix Gkα(θ) that encompasses all existing formulations of surface energy matrices, and apply it to anisotropic curvature flow. We prove that α=-1 is the unique choice achieving optimal energy stability under the necessary and sufficient condition 3γ(θ)≥γ(θ-π), while all other α≠-1 require strictly stronger conditions. The framework extends naturally to general anisotropic geometric flows through a unified velocity discretization that ensures energy stability. Numerical experiments validate the theoretical optimality of α=-1 and demonstrate the effectiveness and robustness.
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