Anisotropic Minkowski Content for Countably Hk-rectifiable Sets
Abstract
This paper investigates the existence of the anisotropic lower-dimensional Minkowski content. We establish that the C-anisotropic k-dimensional Minkowski content of a k-rectifiable compact set always exists and coincides with a specific functional that depends naturally on C. We further show that the same conclusion holds for countably Hk-rectifiable compact sets, provided that the so-called AFP-condition is satisfied. In addition, we discuss how the existence of the C-anisotropic k-dimensional Minkowski content for a countably Hk-rectifiable compact set depends on the choice of C.
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