The σk-Yamabe problem revisited

Abstract

In this paper we revisit the σk-Yamabe problem on Mn, namely, finding a conformal metric with constant σk-scalar curvature. We prove that on a closed manifold (M,[g0]) with positive Yamabe constant Y1(M,[g0])>0, the σ2-Yamabe constant Y2(M,[g0]):=∈f g ∈[g0], Rg>0 ∫M σ2(g) d vol(g)vol(g)n-4n is achieved by a conformal metric g ∈[g0], which in particular solves the σ2-Yamabe problem, assuming Y2(M,[g0])>0. As a consequence, for any (M, g0) with Y1(M,[g0])> 0 and Y2(M,[g0])>0 one has ∈f g ∈[g0], Rg>0 ∫M σ2(g) d vol(g)vol(g)n-4n=∈f g ∈[g0], Rg>0, σ2(g)>0 ∫M σ2(g) d vol(g)vol(g)n-4n . We also show that these conclusions can fail if the condition Rg>0 is removed.