Title of article :
Hyperbolic Ricci-Bourguignon-Harmonic Flow
Author/Authors :
Azami ، Shahrood Department of Pure Mathematics - Faculty of Science - Imam Khomeini International University
Abstract :
In this paper, we consider hyperbolic Ricci-Bourguignon flow on a compact Riemannian manifold M coupled with the harmonic map flow between M and a fixed manifold N. At the first, we prove the unique short-time existence to solution of this system. Then, we find the second variational of some geometric structure of M along this system such as, curvature tensors. In addition, for emphasize the importance of hyperbolic Ricci-Bourguignon flow, we give some examples of this flow on Riemannian manifolds.
Keywords :
Ricci flow , Hyperbolic equation , Harmonic map , Strictly hyperbolicity
Journal title :
Mathematics Interdisciplinary Research
Journal title :
Mathematics Interdisciplinary Research
