Geometric barriers for the existence of hypersurfaces with prescribed curvatures in Mn× R
Abstract
We show the existence of a deformation process of hypersurfaces from a product space M1× R into another product space M2× R such that the relation of the principal curvatures of the deformed hypersurfaces can be controlled in terms of the sectional curvatures or Ricci curvatures of M1 and M2. In this way, we obtain barriers which are used for proving existence or non existence of hypersurfaces with prescribed curvatures in a general product space M× R.
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