On the coverage of strassen-type sets by sequences of Wiener processes

LetW₁,W₂,... be a sequence of Wiener processes and let K_T1 be a function ofT1. We consider the limiting behavior asT of the random set of functions defined by. Under suitable assumptions imposed uponK_T, we show that covers asymptotically (in the sense of the Hausdorff set-metric induced by the sup-norm distance) Strassen-type sets equal, up to a multiplicative constant, to the limit set of functions obtained in the classical functional law of the iterated logarithm. Extensions of these results to arrays and increments of Wiener processes in the range studied by Book and Shore(²) are also provided.