The asymptotic distribution of the scaled remainder for pseudo golden ratio expansions of a continuous random variable
Abstract
Let X=Σk=1∞ Xk β-k be the base-β expansion of a continuous random variable X on the unit interval where β is the positive solution to βn = 1 + β + ·s + βn-1 for an integer n 2 (i.e., β is a generalization of the golden mean for which n=2). We study the asymptotic distribution and convergence rate of the scaled remainder Σk=1∞ Xm+k β-k when m tends to infinity.
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