Zero f-mean curvature surfaces of revolution in the Lorentzian product G2× R1

Abstract

We classify (spacelike or timelike) surfaces of revolution with zero f-mean curvature in G2× R1, the Lorentz-Minkowski 3-space R31 endowed with the Gaussian-Euclidean density e-f(x,y,z)= 12πe-x2+y22. It is proved that an f-maximal surface of revolution is either a horizontal plane or a spacelike f-Catenoid. For the timelike case, a timelike f-minimal surface is either a vertical plane containing z-axis, the cylinder x2+y2=1, or a timelike f-Catenoid. Spacelike and timelike f-Catenoids are new examples of f-minimal surfaces in G2× R1.