Dimension of Images of Large Level Sets
Abstract
Let k be a natural number. We consider k-times continuously-differentiable real-valued functions f:E, where E is some interval on the line having positive length. For 0<α<1 let Iα(f) denote the set of values y∈R whose preimage f-1(y) has Hausdorff dimension f-1(y) α. We consider how large can be the Hausdorff dimension of Iα(f), as f ranges over the set Ck(E,R) of all k-times continuously-differentiable functions from E into R. We show that the sharp upper bound on Iα(f) is 1-αk.
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