Renyi's Parking Problem Revisited

Abstract

R\'enyi's parking problem (or 1D sequential interval packing problem) dates back to 1958, when R\'enyi studied the following random process: Consider an interval I of length x, and sequentially and randomly pack disjoint unit intervals in I until the remaining space prevents placing any new segment. The expected value of the measure of the covered part of I is M(x), so that the ratio M(x)/x is the expected filling density of the random process. Following recent work by Gargano et al. GWML(2005), we studied the discretized version of the above process by considering the packing of the 1D discrete lattice interval \1,2,...,n+2k-1\ with disjoint blocks of (k+1) integers but, as opposed to the mentioned GWML(2005) result, our exclusion process is symmetric, hence more natural. Furthermore, we were able to obtain useful recursion formulas for the expected number of r-gaps (0 r k) between neighboring blocks. We also provided very fast converging series and extensive computer simulations for these expected numbers, so that the limiting filling density of the long line segment (as n ∞) is R\'enyi's famous parking constant, 0.7475979203....