Structure of a Parabolic Partial Differential Equation on Graphs and Digital spaces. Solution of PDE on Digital Spaces: a Klein Bottle, a Projective Plane, a 4D Sphere and a Moebius Band
Alexander V. Evako

TL;DR
This paper explores the structure and solutions of parabolic PDEs on digital models of manifolds like Klein bottles and Moebius strips, providing conditions for solutions and numerical examples on complex digital spaces.
Contribution
It introduces conditions for the existence of solutions of parabolic PDEs on digital manifolds and demonstrates numerical solutions on various complex digital surfaces.
Findings
Conditions for solution existence are established.
Numerical solutions are provided for complex digital manifolds.
The study extends PDE analysis to digital models of continuous manifolds.
Abstract
This paper studies the structure of a parabolic partial differential equation on graphs and digital n-dimensional manifolds, which are digital models of continuous n-manifolds. Conditions for the existence of solutions of equations are determined and investigated. Numerical solutions of the equation on a Klein bottle, a projective plane, a 4D sphere and a Moebius strip are presented.
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Taxonomy
TopicsDigital Image Processing Techniques · Advanced Numerical Analysis Techniques · Computer Graphics and Visualization Techniques
