Significance of Solitonic Fibers in Riemannian Submersions and Some Number Theoretic Applications

Hakami, Ali H.; Siddiqi, Mohd Danish

doi:10.3390/sym15101841

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2023

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“…In 2023, Hakami et al investigated Pontrygin classes and Pontrygin numbers in the differential geometry of submanifolds [39], submersions [40], and solitons [41] from the perspective of number theory.…”

Section: Remarkmentioning

confidence: 99%

Solitons Equipped with a Semi-Symmetric Metric Connection with Some Applications on Number Theory

Hakami,

Siddiqi,

Siddiqui

et al. 2023

Mathematics

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A solution to an evolution equation that evolves along symmetries of the equation is called a self-similar solution or soliton. In this manuscript, we present a study of η-Ricci solitons (η-RS) for an interesting manifold called the (ε)-Kenmotsu manifold ((ε)-KM), endowed with a semi-symmetric metric connection (briefly, a SSM-connection). We discuss Ricci and η-Ricci solitons with a SSM-connection satisfying certain curvature restrictions. In addition, we consider the characteristics of the gradient η-Ricci solitons (a special case of η-Ricci soliton), with a Poisson equation on the same ambient manifold for a SSM-connection. In addition, we derive an inequality for the lower bound of gradient η-Ricci solitons for (ε)-Kenmotsu manifold, with a semi-symmetric metric connection. Finally, we explore a number theoretic approach in the form of Pontrygin numbers to the (ε)-Kenmotsu manifold equipped with a semi-symmetric metric connection.

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Section: Remarkmentioning

confidence: 99%