Moroşanu, Costică and Pavăl, Silviu (2021) Rigorous Mathematical Investigation of a Nonlocal and Nonlinear Second-Order Anisotropic Reaction-Diffusion Model: Applications on Image Segmentation. Mathematics, 9 (1). p. 91. ISSN 2227-7390
mathematics-09-00091-v2.pdf - Published Version
Download (609kB)
Abstract
In this paper we are addressing two main topics, as follows. First, a rigorous qualitative study is elaborated for a second-order parabolic problem, equipped with nonlinear anisotropic diffusion and cubic nonlinear reaction, as well as non-homogeneous Cauchy-Neumann boundary conditions. Under certain assumptions on the input data: f(t,x), w(t,x) and v0(x), we prove the well-posedness (the existence, a priori estimates, regularity, uniqueness) of a solution in the Sobolev space W1,2p(Q), facilitating for the present model to be a more complete description of certain classes of physical phenomena. The second topic refers to the construction of two numerical schemes in order to approximate the solution of a particular mathematical model (local and nonlocal case). To illustrate the effectiveness of the new mathematical model, we present some numerical experiments by applying the model to image segmentation tasks.
Item Type: | Article |
---|---|
Uncontrolled Keywords: | nonlinear anisotropic reaction-diffusion; well-posedness of solutions; Leray-Schauder degree theory; finite difference method; explicit numerical approximation scheme; image segmentation |
Subjects: | STM Repository > Mathematical Science |
Depositing User: | Managing Editor |
Date Deposited: | 01 Jul 2023 09:16 |
Last Modified: | 15 Oct 2024 11:47 |
URI: | http://classical.goforpromo.com/id/eprint/857 |