Eigenvalue Variations of Heisenberg and Quaternion Lie Groups Under the Ricci Flow

Shahroud Azami; Asadollah Razavi

Eigenvalue Variations of Heisenberg and Quaternion Lie Groups Under the Ricci Flow

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Authors

Shahroud Azami
Asadollah Razavi

Keywords:

geodesic flow, Ricci flow, Nilpotent Lie group

Abstract

In this article we study the eigenvalue variations of Heisenberg and quaternion Lie groups under the Ricci flow and we investigate the deformation of some characteristics of compact nilmanifolds Γ\N under the Ricci flow, where N is a simply connected 2-step nilpotent Lie group with a left invariant metric and Γ is a discrete cocompact subgroup of N, in particular Heisenberg and quaternion Lie groups.

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Published

2024-05-26

How to Cite

Azami, S., & Razavi, A. (2024). Eigenvalue Variations of Heisenberg and Quaternion Lie Groups Under the Ricci Flow. Eurasian Mathematical Journal, 9(1). Retrieved from https://emj.enu.kz/index.php/main/article/view/108