Improved versions of some Furstenberg type slicing Theorems for self-affine carpets
Abstract
Let F be a Bedford-McMullen carpet defined by independent integer exponents. We prove that for every line ⊂eq R2 not parallel to the major axes, H ( F) ≤ 0,\, H F* F · (* F-1) and P ( F) ≤ 0,\, P F* F · (* F-1) where * is Furstenberg's star dimension (maximal dimension of microsets). This improves the state of art results on Furstenberg type slicing Theorems for affine invariant carpets.
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