Prefer a chat interface with context about you and your work?
On general existence results for one-dimensional singular diffusion equations with spatially inhomogeneous driving force
A general anisotropic curvature flow equation with singular interfacial energy and spatially inhomogeneous driving force is considered for a curve given by the graph of a periodic function. We prove that the initial value problem admits a unique global-in-time viscosity solution for a general periodic continuous initial datum. The notion …