The high-dimensional Weierstrass functions

Abstract

For a real analytic periodic function φ:Rd, an integer b 2 and λ∈(1/b,1), we prove that the box dimension and the Hausdorff dimension of the graph of the Weierstrass function W(x)=Σn=0∞λnφ(bnx) are both equal to \λ-1b,\,1+(\,d-q\,)(1+bλ)\, where q = q(φ, b, λ) denotes the maximum dimension of all linear spaces V < Rd such that the projection πV W is Lipschitz.

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