Homothetical surfaces in three dimensional psuedo-Galilean space
Abstract
A homothetical surface arises as a graph of a function z = 1(v1) 2(v2). In this paper, we study the homothetical surfaces in three dimensional psuedo-Galilean space(G31) satisfying the conditions IIxi=λixi, where II is the Laplacian with respect to second fundamental form. In particular, we show the non-existence of any such type of surface in G31.
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