Convergence of Finslerian metrics under Ricci flow
Abstract
In this work, convergence of evolving Finslerian metrics first in a general flow next under Finslerian Ricci flow is studied. More intuitively it is proved that a family of Finslerian metrics g(t) which are solutions to the Finslerian Ricci flow converge in C∞ to a smooth limit Finslerian metric as t approaches the finite time T . As a consequence of this result one can show that in a compact Finsler manifold the curvature tensor along Ricci flow blows up in short time.
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