This paper addresses the problem of clocking large high-speed digital systems, as well as deterministic skew modeling, a related problem. In order to provide a reliable skew model, and to avoid the frequency limitation, we propose a novel approach that distributes the clock with an H-tree, whose branches are composed of minimum-sized inverters rather than metal. With such a structure, we obtain the highest clocking rate achievable with a given technology. Indeed, clock rates around 1 GHz are possible with a 1.2 /spl mu/m CMOS technology. From the skew modeling standpoint, we derive an analytic expression of the skew between two leaves of the H-tree, which we consider to be the difference in root-to-leaf delay pairs. The skew upper bound obtained has an order of complexity which, with respect to the H-tree size D, is the same as the one that may be derived from the Fisher and Kung model for both side-to-side and neighbor-to-neighbor communications, i.e., a /spl Omega/(D/sup 2/), whereas, the Steiglitz and Kugelmass probabilistic model predicts /spl Theta/(D/spl times//spl radic/LogD). In an H-tree implemented with metallic lines, the leaf-to-leaf skew is obviously bounded by the delay between the root and the leaves. However, with the logic based H-tree proposed here, we arrive at a nonobvious result, which states that the leaf-to-leaf skew grows faster than the root-to-leaf delay in presence of a uniform transistor time constant gradient. This paper also proposes generalizations of the skew model to (1) the case of chips in a wafer subject to a smooth, but nonuniform gradient and (2) the case of H-tree configurations mixing logic and interconnections; in this respect, this paper covers the H-tree configurations based on the combination of logic and interconnections.