Ricci curvature and normalized Ricci flow on generalized Wallach spaces

Abstract

We proved that the normalized Ricci flow does not preserve the positivity of Ricci curvature of Riemannian metrics on every generalized Wallach space with a1+a2+a3 1/2, in particular on the spaces SU(k+l+m)/SU(k)× SU(l) × SU(m) and Sp(k+l+m)/Sp(k)× Sp(l) × Sp(m) independently on k,l and m. The positivity of Ricci curvature is preserved for all original metrics with Ric>0 on generalized Wallach spaces a1+a2+a3> 1/2 if the conditions 4(aj+ak)2 (1-2ai)(1+2ai)-1 hold for all \i,j,k\=\1,2,3\. We also established that the spaces SO(k+l+m)/SO(k)× SO(l)× SO(m) satisfy the above conditions for \k,l,m\ 11, moreover, additional conditions were found to keep Ric>0 in cases when \k,l,m\ 11 is violated. Similar questions have also been studied for all other generalized Wallach spaces given in the classification of Yuri\ Nikonorov.