Paper detail

A formula for backward and control problems of the heat equation

(a). Using time analyticity result, we address a basic question for a nonhomogeneous backward heat equation (exact control problem) in the setting of smooth domains and compact manifolds, namely: when is essentially time independent control possible? i.e. The control function is 0 on one time interval and stationary on the other. For general $L^2$ initial values, the answer is: if and only if the full space domain is used for the control function. Also an explicit formula for the control function is found in the form of an infinite series involving the heat kernel, which converges rapidly. (b). A formal exact formula for a time dependent control function supported in a proper subdomain is also obtained via eigenfunctions of the Laplacian. The formula is rigorous on any finite dimensional space spanned by the eigenfunctions and there is no smoothness assumption on the whole domain, making partial progress on a problem on p74 \cite{Zu:1}. (c). A byproduct is an inversion formula for the heat kernel.