Quantitative unique continuation for the heat equation with Coulomb potentials
Quantitative unique continuation for the heat equation with Coulomb potentials is a scholarly work, published in 2018 in ''Mathematical Control and Related Fields''. The main subjects of the publication include convergence, heat equation, convex set, mathematical analysis, distributed parameter system, physics, continuation, inverse problem, multiscale modeling, biological function, coulomb, regular polygon, mathematics, type, bounded function, and domain. The authors establish a Hölder-type quantitative estimate of unique continuation for solutions to the heat equation with Coulomb potentials in either a bounded convex domain or a $C^2$-smooth bounded domain.