Improving Pinwheel Density Bounds for Small Minimums

Abstract

The density bound for schedulability for general pinwheel instances is 56, but density bounds better than 56 can be shown for cases in which the minimum element m of the instance is large. Several recent works have studied the question of the 'density gap' as a function of m, with best known lower and upper bounds of O ( 1m ) and O ( 1m ). We prove a density bound of 0.84 for m = 4, the first m for which a bound strictly better than 56 = 0.83 can be proven. In doing so, we develop new techniques, particularly a fast heuristic-based pinwheel solver and an unfolding operation.