A Regularization for Time-Fractional Backward Heat Conduction Problem with Inhomogeneous Source Function
Abstract
Recently, Nair and Danumjaya (2023) introduced a new regularization method for the homogeneous time-fractional backward heat conduction problem (TFBHCP) in a one-dimensional space variable, for determining the initial value function. In this paper, the authors extend the analysis done in the above referred paper to a more general setting of an inhomogeneous time-fractional heat equation involving the higher dimensional state variables and a general elliptic operator. We carry out the analysis for the newly introduced regularization method for the TFBHCP providing optimal order error estimates under a source condition by choosing the regularization parameter appropriately, and also carry out numerical experiments illustrating the theoretical results.
Keywords
Cite
@article{arxiv.2405.18074,
title = {A Regularization for Time-Fractional Backward Heat Conduction Problem with Inhomogeneous Source Function},
author = {Vighnesh V. Alavani and P. Danumjaya and M. Thamban Nair},
journal= {arXiv preprint arXiv:2405.18074},
year = {2024}
}
Comments
24 pages, 4 figures