Title of article
Ricci-Bourguignon flow on an open surface
Author/Authors
Azami ، Shahroud Department of Pure Mathematics - Faculty of Science - Imam Khomeini International University
From page
159
To page
165
Abstract
In this paper, we investigate the normalized Ricci-Bourguignon flow with incomplete initial metric on an open surface. We show that such a flow converges exponentially to a metric with constant Gaussian curvature if the initial metric is suitable. In particular, if the initial metric is complete then the metrics converge to the standard hyperbolic metric.
Keywords
Ricci , Bourguignon flow , incomplete surface , uniformization theorem
Journal title
Journal of Mahani Mathematical Research Center
Journal title
Journal of Mahani Mathematical Research Center
Record number
2756645
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