AbstractXt is a Brownian sheet defined for t belonging to the positive orthant of RN, for which the covariance function is given by E(XsXt = Πi = 1N min(si,ti). Functions φ with suitable growth conditions are classified as lower or upper class near the origin according as Xt does or does not exceed √∂(t) φ(∂(t)) infinitely often as ∂(t) → 0 (∂(t) = Π ti). S. Orey and W. E. Pruitt (Ann. Probab. 1 (1973), 138–163) obtained the necessary and sufficient condition in terms of the convergence of a generalized Kolmogorov-type integral. The distribution of the related first crossing time is considered and in the process an interpretation for the integrand in the Kolmogorov test is obtained