@article{article_753458, title={On a final value problem for parabolic equation on the sphere with linear and nonlinear source}, journal={Advances in the Theory of Nonlinear Analysis and its Application}, volume={4}, pages={143–151}, year={2020}, DOI={10.31197/atnaa.753458}, author={Phuong, Nguyen Duc and Binh, Tran and Luc, Nguyen}, keywords={Cauchy problem, parabolic on the sphere, Ill-posed problem, Convergence estimates}, abstract={<p>  <span style="font-size:.9em;">Parabolic equation on the unit sphere arise naturally in geophysics and oceanography when we model a  </span> <span style="font-size:.9em;">physical quantity on large scales. In this paper, we consider a problem of finding the initial state for  </span> <span style="font-size:.9em;">backward parabolic problem on the sphere. This backward parabolic problem is ill-posed in the sense of  </span> <span style="font-size:.9em;">Hadamard. The solutions may be not exists and if they exists then the solution does not continuous depends  </span> <span style="font-size:.9em;">on the given observation. The backward problem for homogeneous parabolic problem was recently considered  </span> <span style="font-size:.9em;">in the paper Q.T. L. Gia, N.H. Tuan, T. Tran. However, there are very few results on the backward problem  </span> <span style="font-size:.9em;">of nonlinear parabolic equation on the sphere. In this paper, we do not consider the its existence, we only  </span> <span style="font-size:.9em;">study the stability of the solution if it exists. By applying some regularized method and some techniques on  </span> <span style="font-size:.9em;">the spherical harmonics, we approximate the problem and then obtain the convalescence rate between the  </span> <span style="font-size:.9em;">regularized solution and the exact solution. </span> </p>}, number={3}, publisher={Erdal KARAPINAR}