On biconservative surfaces in 3-dimensional space forms
Abstract
We consider biconservative surfaces (M2,g) in a space form N3(c), with mean curvature function f satisfying f>0 and ∇ f≠ 0 at any point, and determine a certain Riemannian metric gr on M such that (M2,gr) is a Ricci surface in N3(c). We also obtain an intrinsic characterization of these biconservative surfaces.
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