On the probabilistic metrizability of approach spaces

Abstract

We investigate approach spaces generated by probabilistic metric spaces with respect to a continuous t-norm * on the unit interval [0,1]. Let k* be the supremum of the idempotent elements of * in [0,1). It is shown that if k*=1 (resp. k*<1), then an approach space is probabilistic metrizable with respect to * if and only if it is probabilistic metrizable with respect to the minimum (resp. product) t-norm.