We determine the exact exponential asymptotics of the maximum number of n-length binary strings any two of which differ in the following strong sense: there must be a coordinate in which one of them has a 1 in correspondence with a predetermined position within a "long run" of zeros in the other string. We discuss some generalizations and implications of this result.

Coding for a long silence / Fachini, E; Korner, Janos. - In: IEEE TRANSACTIONS ON INFORMATION THEORY. - ISSN 0018-9448. - STAMPA. - 49:8(2003), pp. 2020-2023. [10.1109/TIT.2003.814933]

Coding for a long silence

FACHINI E;KORNER, JANOS
2003

Abstract

We determine the exact exponential asymptotics of the maximum number of n-length binary strings any two of which differ in the following strong sense: there must be a coordinate in which one of them has a 1 in correspondence with a predetermined position within a "long run" of zeros in the other string. We discuss some generalizations and implications of this result.
2003
01 Pubblicazione su rivista::01a Articolo in rivista
Coding for a long silence / Fachini, E; Korner, Janos. - In: IEEE TRANSACTIONS ON INFORMATION THEORY. - ISSN 0018-9448. - STAMPA. - 49:8(2003), pp. 2020-2023. [10.1109/TIT.2003.814933]
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11573/16526
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