Box dimension of the graphs of the generalized Weierstrass-type functions
Abstract
For a Lipschitz Z-periodic function φ:R R2 satisfied that R2\φ(x):x∈R\ is not connected, an integer b 2 and λ∈ (c/b12,1), we prove the following for the generalized Weierstrass-type function W(x)=Σn=0∞λnφ(bnx): the box dimension of its graph is equal to 3+2bλ, where c is a constant depending on φ.
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