Control of Crank-Nicolson noise in the numerical solution of the heat conduction equation

## Abstract A new numerical method is developed for the boundary optimal control problems of the heat conduction equation in the present paper. When the boundary optimal control problem is solved by minimizing the objective function employing a conjugate‐gradient method, the most crucial step is th

In this paper we consider the numerical solution of the one-dimensional, unsteady heat conduction equation in which Dirichlet boundary conditions are specified at two space locations and the temperature distribution at a particular time, say \(T_{0}\), is given. The temperature distribution for all

We show under which conditions the solution of the heat equation with a two-parameter white Gaussian noise can be approximated by solutions of this equation with physically real Gaussian noise. ' 1. Mathematical preliminaries 1.1. The two-parameter Wiener field (Brownian sheet) The two-parameter WI

## Abstract The aim of this article is to study the parabolic inverse problem of determination of the leading coefficient in the heat equation with an extra condition at the terminal. After introducing a new variable, we reformulate the problem as a nonclassical parabolic equation along with the in