Deforming convex bodies in Minkowski geometry

Abstract

We introduce and study deformation T b,φ of Minkowski norms in Rn, determined by a set b=(β1,…,βp) of linearly independent 1-forms and a smooth positive function φ of p variables. In particular, the T b,φ-image of a Euclidean norm α is a Minkowski norm, whose indicatrix is a rotation hypersurface with a p-dimensional axis passing through the origin. For p=1, our deformation generalizes construction of (α,β)-norm; the last ones form a rich class of "computable" Minkowski norms and play an important role in Finsler geometry. We use compositions of T b,φ-deformations with b's of length p to define an equivalence relation p on the set of all Minkowski norms in Rn. We apply M. Matsumoto result to characterize the cases when the Cartan torsions of a norm and its T b,φ-image either coincide or differ by a C-reducible term.