n will form the integral curves that are the solutions of the partial differential equations whether dimensional or non-dimensional, and if the integral solutions are closed curves, then they form the Archimedean solids that would not necessarily have symmetric surfaces enclosing the feasible region and that not necessarily follow the Lipschitz condition.

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Topological Progressive Cones

Srinivasa Rao T.*
Department of Mathematics, University College of Science & Technology, Adikavi Nannaya University, Rajahmundry, Andhra Pradesh, India.
Periodicity:July - December'2021
DOI : https://doi.org/10.26634/jmat.10.2.18330

Abstract

The intersection of surfaces in n-dimensional space Fn will form the integral curves that are the solutions of the partial differential equations whether dimensional or non-dimensional, and if the integral solutions are closed curves, then they form the Archimedean solids that would not necessarily have symmetric surfaces enclosing the feasible region and that not necessarily follow the Lipschitz condition.

Keywords

Partial Differential Equation, n-Dimensional Space, Conic Sections, Paraboloid, Ellipsoid.

How to Cite this Article?

Rao, S. T. (2021). Topological Progressive Cones. i-manager's Journal on Mathematics, 10(2), 25-29. https://doi.org/10.26634/jmat.10.2.18330
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