High-order parametric LDG methods for curve-shortening flows achieve unconditional energy dissipation, optimal (k+1) convergence, and numerical stability on degraded meshes for strong anisotropy without requiring symmetrized matrices.
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High-order parametric local discontinuous Galerkin methods for anisotropic curve-shortening flows
High-order parametric LDG methods for curve-shortening flows achieve unconditional energy dissipation, optimal (k+1) convergence, and numerical stability on degraded meshes for strong anisotropy without requiring symmetrized matrices.