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University of Birmingham > Talks@bham > Topology and Dynamics seminar > Dimensions of exceptional self-affine sets in R^3
Dimensions of exceptional self-affine sets in R^3Add to your list(s) Download to your calendar using vCal
If you have a question about this talk, please contact Simon Baker. Planar self-affine sets generated by diagonal and anti-diagonal matrices are an important family of exceptional self-affine sets, where the box (and Hausdorff) dimension can be strictly smaller than the affinity dimension. The box dimensions are given by a natural ‘pressure type’ formula based on modified singular value functions. We consider the analogous setting in R^3, where the self-affine sets are generated by generalised permutation matrices, and will see that the situation is rather more complicated. This is joint work with Natalia Jurga (Surrey). This talk is part of the Topology and Dynamics seminar series. This talk is included in these lists:Note that ex-directory lists are not shown. |
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