Calculus of Variations and Geometric Measure Theory

G. Catino - C. Mantegazza

The evolution of the Weyl Tensor under the Ricci Flow

created by root on 26 Oct 2009
modified by catino on 01 Oct 2013


Published Paper

Inserted: 26 oct 2009
Last Updated: 1 oct 2013

Journal: Ann. Inst. Fourier
Volume: 61
Number: 4
Pages: 1407-1435
Year: 2011


We compute the evolution equation of the Weyl tensor under the Ricci flow of a Riemannian manifold and we discuss some consequences for the classification of locally conformally flat Ricci solitons.