Box dimension of stable sub-slices of fractal graphs over Anosov diffeomorphisms

Abstract

We consider fractal graphs invariant by a skew product F:Tk× R→ Tk× R of the form F(x,y)=(Ax, λ y+p(x)) where 0<λ<1, pk is a Ck+1 function, and A is an Anosov diffeomorphism of Tk admitting k distinct eigenvalues with respective eigenvectors forming a basis of Rk. We note that the stable sub-slices can give information of the fractal structure of the graph that is not captured by the box dimension of the graph. Using the results of Kaplan,Mallet-Paret, and York [6], we exhibit conditions on the skew product that ensure the box dimension of the graph is smaller than the sum of the box dimensions of its stable/unstable sub-slices. We prove that these conditions hold for generic functions p∈ Ck+1.