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arxiv: 0704.2711 · v2 · pith:XE2622AHnew · submitted 2007-04-20 · ⚛️ physics.soc-ph · cond-mat.stat-mech· physics.data-an

Zipf law in the popularity distribution of chess openings

classification ⚛️ physics.soc-ph cond-mat.stat-mechphysics.data-an
keywords chesszipfdistributionexponentgameopeninguniversalable
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We perform a quantitative analysis of extensive chess databases and show that the frequencies of opening moves are distributed according to a power-law with an exponent that increases linearly with the game depth, whereas the pooled distribution of all opening weights follows Zipf's law with universal exponent. We propose a simple stochastic process that is able to capture the observed playing statistics and show that the Zipf law arises from the self-similar nature of the game tree of chess. Thus, in the case of hierarchical fragmentation the scaling is truly universal and independent of a particular generating mechanism. Our findings are of relevance in general processes with composite decisions.

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