New Yamabe-type flow in a compact Riemannian manifold

Abstract

In this paper, we set up a new Yamabe type flow on a compact Riemannian manifold (M,g) of dimension n≥ 3. Let (x) be any smooth function on M. Let p=n+2n-2 and cn=4(n-1)n-2. We study the Yamabe-type flow u=u(t) satisfying ut=u1-p(cn u-(x)u)+r(t)u, \ \ in \ M× (0,T),\ T>0 with r(t)=∫M(cn|∇ u|2+(x)u2)dv/ ∫Mup+1, which preserves the Lp+1(M)-norm and we can show that for any initial metric u0>0, the flow exists globally. We also show that in some cases, the global solution converges to a smooth solution to the equation cn u-(x)u+r(∞)up=0, \ \ on \ M and our result may be considered as a generalization of the result of T.Aubin, Proposition in p.131 in A82.