Sensitive Random Variables are Dense in Every Lp(R, BR, P)

Abstract

We show that, for every 1 ≤ p < +∞ and for every Borel probability measure P over R, every element of Lp(R, BR, P) is the Lp-limit of some sequence of bounded random variables that are Lebesgue-almost everywhere differentiable with derivatives having norm greater than any pre-specified real number at every point of differentiability. In general, this result provides, in some direction, a finer description of an Lp-approximation for Lp functions on R.