Brownian slow points: The critical case (Q1064655)

The flavour and results of the paper are best explained by an example: Let \(B_ t\) denote the one-dimensional Brownian motion. Then almost surely for every \(t\geq 0\), \(\Delta >0\), \(B(t+h)-B(t)<\sqrt{h}\) for some \(0\leq h\leq \Delta\).