On the box dimensions of graphs of typical continuous functions
Copyright policy )On the box dimensions of graphs of typical continuous functions
AbstractLet X⊆R be a bounded set; we emphasize that we are not assuming that X is compact or Borel. We prove that for a typical (in the sense of Baire) uniformly continuous function f on X, the lower box dimension of the graph of f is as small as possible and the upper box dimension of the graph of f is as big as possible. We also prove a local version of this result. Namely, we prove that for a typical uniformly continuous function f on X, the lower local box dimension of the graph of f at all points x∈X is as small as possible and the upper local box dimension of the graph of f at all points x∈X is as big as possible.
- University of Grenoble France
- Joseph Fourier University France
- UNIVERSITE GRENOBLE I [Joseph Fourier] France
- University of Bath United Kingdom
- UNIVERSITE PIERRE MENDES-FRANCE GRENOBLE II France
Box dimension, box dimension, Continuous function, Applied Mathematics, Baire category, Analysis, continuous function
Box dimension, box dimension, Continuous function, Applied Mathematics, Baire category, Analysis, continuous function
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