Mathematics (Dec 2024)

First Eigenvalues of Some Operators Under the Backward Ricci Flow on Bianchi Classes

  • Shahroud Azami,
  • Rawan Bossly,
  • Abdul Haseeb,
  • Abimbola Abolarinwa

DOI
https://doi.org/10.3390/math12233846
Journal volume & issue
Vol. 12, no. 23
p. 3846

Abstract

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Let λ(t) be the first eigenvalue of the operator −∆+aRb on locally three-dimensional homogeneous manifolds along the backward Ricci flow, where a,b are real constants and R is the scalar curvature. In this paper, we study the properties of λ(t) on Bianchi classes. We begin by deriving an evolution equation for the quantity λ(t) on three-dimensional homogeneous manifolds in the context of the backward Ricci flow. Utilizing this equation, we subsequently establish a monotonic quantity that is contingent upon λ(t). Additionally, we present both upper and lower bounds for λ(t) within the framework of Bianchi classes.

Keywords