Regularization of a Cauchy problem for the heat equation
- University of Science, VNU-HCM Can Tho University of Technology
- University of Education, Ho Chi Minh
Correspondence to:
An Van Vo,
University of Science, VNU-HCM Can Tho University of Technology.
Email:
pvphuc@vnuhcm.edu.vn.
Published:
2018-11-29
Abstract
In this paper, we study a Cauchy problem for the heat equation with linear source in the form ut(x,t)= uxx(x,t)+f(x,t), u(L,t)= φ(t), u(L,t)= Ψ (t), (x,t) ∈ (0,L) ×(0, 2π). This problem is ill-posed in the sense of Hadamard. To regularize the problem, the truncation method is proposed to solve the problem in the presence of noisy Cauchy data φε and Ψε satisfying ‖ φε - φ ‖+‖ Ψε - Ψ ‖ ≤ ε and that fε satisfying ‖ fε(x,. ) - f(x,.) ‖ ≤ ε . We give some error estimates between the regularized solution and the exact solution under some different a-priori conditions of exact solution.
Keywords:
elliptic equation
ill-posed problem
cauchy problem
regularization method
truncation method