Uniqueness for inverse source problems for fractional diffusion-wave equations by data during not acting time
Analysis of PDEs
2023-01-18 v1
Abstract
We consider fractional diffusion-wave equations with source term which is represented in a form of a product of a temporal function and a spatial function. We prove the uniqueness for inveres source problem of determining spatially varying factor by decay of data as the time tends to , provided that the source does not work during the observations. Our main result asserts the uniqueness if data decay more rapidly than with any as . Date taken not from the initial time are realistic but the uniqueness was not known in general. The proof is based on the analyticity and the asymptotic behavior of a function generated by the solution.
Cite
@article{arxiv.2207.04999,
title = {Uniqueness for inverse source problems for fractional diffusion-wave equations by data during not acting time},
author = {Masahiro Yamamoto},
journal= {arXiv preprint arXiv:2207.04999},
year = {2023}
}