A Note on the Weighted Yamabe Flow
2023, Volume 28, Number 3, pp. 309-320
Author(s): Popelensky T. Y.
Author(s): Popelensky T. Y.
For two dimensional surfaces (smooth) Ricci and Yamabe flows are equivalent. In
2003, Chow and Luo developed the theory of combinatorial Ricci flow for circle packing metrics
on closed triangulated surfaces. In 2004, Luo developed a theory of discrete Yamabe flow for
closed triangulated surfaces. He investigated the formation of singularities and convergence to
a metric of constant curvature.
In this note we develop the theory of a naïve discrete Ricci flow and its modification — the
so-called weighted Ricci flow. We prove that this flow has a rich family of first integrals and
is equivalent to a certain modification of Luo’s discrete Yamabe flow. We investigate the types
of singularities of solutions for these flows and discuss convergence to a metric of weighted
constant curvature.
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