Micha Hofri scite author profile

Let S0,…,Sn be a symmetric random walk that starts at the origin (S0 = 0) and takes steps uniformly distributed on [— 1,+1]. We study the large-n behavior of the expected maximum excursion and prove the estimate,where c = 0.297952.... This estimate applies to the problem of packing n rectangles into a unit-width strip; in particular, it makes much more precise the known upper bound on the expected minimum height, O(n½), when the rectangle sides are 2n independent uniform random draws from [0,1].

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On a functional equation arising in the analysis of a protocol for a multi-access broadcast channel

Fayolle

Flajolet

Hofri

1986

Advances in Applied Probability

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We analyse a stack protocol of the Capetanakis–Tsybakov–Mikhailov type for resolving collisions in a random multiple-access channel. We obtain a functional equation for the generating function of the expected collision resolution interval (CRI) durations, which is non-local with a non-commutative iteration semigroup. Using Mellin transform techniques and geometric properties of the iteration semigroup we show that for arrival rates smaller than a fixed threshold, the mean CRI duration for n initial colliders is asymptotically proportional to n. Ergodicity conditions are also demonstrated.

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Analysis of a stack algorithm for random multiple-access communication

Fayolle

Flajolet

Hofri

et al. 1985

IEEE Trans. Inform. Theory

100

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Micha Hofri

The coupon-collector problem revisited — a survey of engineering problems and computational methods

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On a functional equation arising in the analysis of a protocol for a multi-access broadcast channel

Analysis of a stack algorithm for random multiple-access communication

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