Generalized Motion¶by Nonlocal Curvature in the Plane

“…This is a very special version of results in [GG4] or [GG5], where level set equations to more general equation of the form V = g(n, −div Γt (n)) is studied. The main idea of the proof is to reduce the problem to graph-like solutions of (2.1) which is studied in [GG2] and [GG3].…”

“…[CGG1], [Ca], and [GG5]). However, if do not assume the convergence of derivatives of γ τ , it is quite recent that the convergence ansatz has been proved for n = 2 in [GG4] and [GG5]. Note that meaning of a solution to (2.4) is not clear at all for all nondifferentiable γ since the term divξ(∇u) is not well-defined even for smooth u.…”

“…Note that meaning of a solution to (2.4) is not clear at all for all nondifferentiable γ since the term divξ(∇u) is not well-defined even for smooth u. The papers [GG4] and [GG5] provide a proper notion of the solution.…”

“…No control of derivatives of γ is necessary. This gives a way to approximate crystalline motion [T], [AG] in the plane by an anisotropic Allen-Cahn type equation in conjunction with a general level set method for nondifferentiable γ in [GG4], [GG5]. This will be explained in §2.5 as an application of our main result.…”

On a uniform approximation of motion by anisotropic curvature by the Allen–Cahn equations

“…This is a very special version of results in [GG4] or [GG5], where level set equations to more general equation of the form V = g(n, −div Γt (n)) is studied. The main idea of the proof is to reduce the problem to graph-like solutions of (2.1) which is studied in [GG2] and [GG3].…”

“…[CGG1], [Ca], and [GG5]). However, if do not assume the convergence of derivatives of γ τ , it is quite recent that the convergence ansatz has been proved for n = 2 in [GG4] and [GG5]. Note that meaning of a solution to (2.4) is not clear at all for all nondifferentiable γ since the term divξ(∇u) is not well-defined even for smooth u.…”

“…Note that meaning of a solution to (2.4) is not clear at all for all nondifferentiable γ since the term divξ(∇u) is not well-defined even for smooth u. The papers [GG4] and [GG5] provide a proper notion of the solution.…”

“…No control of derivatives of γ is necessary. This gives a way to approximate crystalline motion [T], [AG] in the plane by an anisotropic Allen-Cahn type equation in conjunction with a general level set method for nondifferentiable γ in [GG4], [GG5]. This will be explained in §2.5 as an application of our main result.…”

On a uniform approximation of motion by anisotropic curvature by the Allen–Cahn equations

“…In particular, we are interested in examples of facets F ⊂ ∂E which admit a subunitary vector field allowing to define an anisotropic mean curvature not easily expressible in terms of a scalar function. The study of anisotropic mean curvature of facets is related to crystalline mean curvature flow [68], [70], [71], [2], [48], [49]: for instance, the constancy of the crystalline mean curvature makes a facet translate parallely to itself in normal direction, at least for a short time, thus preventing the facet-breaking and bending phenomena [21].…”

Anisotropic mean curvature on facets and relations with capillarity

Existence and Uniqueness for a Crystalline Mean Curvature Flow