Evolution of the first eigenvalue of the clamped plate on manifold along the Ricci flow: Complex Variables and Elliptic Equations: Vol 65, No 5

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ABSTRACT

In this article, we study the evolution, monotonicity for the first eigenvalue of the clamped plate on closed Riemannian manifold along the Ricci flow. We prove that the first nonzero eigenvalue is nondecreasing under the Ricci flow under certain geometric conditions and find some applications in 2-dimensional manifolds.

COMMUNICATED BY:

Y. Antipov

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Evolution of the first eigenvalue of the clamped plate on manifold along the Ricci flow

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Evolution of the first eigenvalue of the clamped plate on manifold along the Ricci flow

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