Linear Weingraten factorable surfaces in isotropic spaces
Abstract
In this paper, we deal with the linear Weingarten factorable surfaces in the isotropic 3-space I3 satisfying the relation aK+bH=c, where K is the relative curvature and H the isotropic mean curvature, a,b,cR. We obtain a complete classification for such surfaces in I3. As a further study, we classify all graph surfaces in I3 satisfying the relation K=H2, which is the equality case of the famous Euler inequality for surfaces in a Euclidean space.
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