Non-Archimedean Scale Invariance and Cantor Sets

Abstract

The framework of a new scale invariant analysis on a Cantor set C⊂ % I=[0,1] , presented originally in S. Raut and D. P. Datta, Fractals, 17, 45-52, (2009), is clarified and extended further. For an arbitrarily small >0, elements x in I C satisfying 0<x< <x, x∈ C together with an inversion rule are called relative infinitesimals relative to the scale . A non-archimedean absolute value v(% x)= -1x, 0 is assigned to each such infinitesimal which is then shown to induce a non-archimedean structure in the full Cantor set C. A valued measure constructed using the new absolute value is shown to give rise to the finite Hausdorff measure of the set. The definition of differentiability on % C in the non-archimedean sense is introduced. The associated Cantor function is shown to relate to the valuation on C which is then reinterpreated as a locally constant function in the extended non-archimedean space. The definitions and the constructions are verified explicitly on a Cantor set which is defined recursively from I deleting q number of open intervals each of length 1r leaving out p numbers of closed intervals so that p+q=r.