C0-positivity and a classification of closed three-dimensional CR torsion solitons

Abstract

A closed CR 3-manifold is said to have C0-positive pseudohermitian curvature if (W+C0Tor)(X,X)>0 for any 0≠ X∈ T1,0(M). We discover an obstruction for a closed CR 3-manifold to possess C0-positive pseudohermitian curvature. We classify closed three-dimensional CR Yamabe solitons according to C0-positivity and C0-negativity whenever C0=1 and the potential function lies in the kernel of Paneitz operator. Moreover, we show that any closed three-dimensional CR torsion soliton must be the standard Sasakian space form. At last, we discuss the persistence of C0-positivity along the CR torsion flow starting from a pseudo-Einstein contact form.