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Main Author: Edwards, Roderick
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2507.03894
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author Edwards, Roderick
author_facet Edwards, Roderick
contents We consider the problem of estimating `preference' or `strength' parameters in three-way comparison experiments, each composed of a series of paired comparisons, but where only the single `preferred' or `strongest' candidate is known in each trial. Such experiments arise in psychology and market research, but here we use chess competitions as the prototypical context, in particular a series of `pools' between three players that occurred in 1821. The possibilities of tied pools, redundant and therefore unplayed games, and drawn games must all be considered. This leads us to reconsider previous models for estimating strength parameters when drawn games are a possible result. In particular, Davidson's method for ties has been questioned, and we propose an alternative. We argue that the most correct use of this method is to estimate strength parameters first, and then fix these to estimate a draw-propensity parameter, rather than estimating all parameters simultaneously, as Davidson does. This results in a model that is consistent with, and provides more context for, a simple method for handling draws proposed by Glickman. Finally, in pools with incomplete information, the number of drawn games can be estimated by adopting a draw-propensity parameter from related data with more complete information.
format Preprint
id arxiv_https___arxiv_org_abs_2507_03894
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Tied Pools and Drawn Games
Edwards, Roderick
Statistics Theory
Methodology
62J15
We consider the problem of estimating `preference' or `strength' parameters in three-way comparison experiments, each composed of a series of paired comparisons, but where only the single `preferred' or `strongest' candidate is known in each trial. Such experiments arise in psychology and market research, but here we use chess competitions as the prototypical context, in particular a series of `pools' between three players that occurred in 1821. The possibilities of tied pools, redundant and therefore unplayed games, and drawn games must all be considered. This leads us to reconsider previous models for estimating strength parameters when drawn games are a possible result. In particular, Davidson's method for ties has been questioned, and we propose an alternative. We argue that the most correct use of this method is to estimate strength parameters first, and then fix these to estimate a draw-propensity parameter, rather than estimating all parameters simultaneously, as Davidson does. This results in a model that is consistent with, and provides more context for, a simple method for handling draws proposed by Glickman. Finally, in pools with incomplete information, the number of drawn games can be estimated by adopting a draw-propensity parameter from related data with more complete information.
title Tied Pools and Drawn Games
topic Statistics Theory
Methodology
62J15
url https://arxiv.org/abs/2507.03894