An Explanation of Each-Way Wagers in Three Models Of Risky Choice

Peel, David Alan (2018) An Explanation of Each-Way Wagers in Three Models Of Risky Choice. Applied Economics, 50 (22). pp. 2431-2438. ISSN 0003-6846

[thumbnail of An Explanation of Each-Way Wagers in Three Models Of Risky Choice]
Preview
PDF (An Explanation of Each-Way Wagers in Three Models Of Risky Choice)
An_Explanation_of_Each_Way_Wagers_in_Three_Models_Of_Risky_Choice.pdf - Accepted Version
Available under License Creative Commons Attribution-NonCommercial.

Download (256kB)

Abstract

Punters may engage in betting on both a selection in an event to finish first or in one of the number of places, e.g. second, third or fourth. When the amounts staked with bookmakers at fixed odds on the win and place are equal, it is called an each-way bet. Each-way bets are apparently popular with punters but inconsistent with prominent models of wagering which assume gamblers are everywhere risk-seeking. In this note, we derive the conditions for win and place bets to be optimal in these three models of risky choice. The mathematical conditions for the each-way wager to be optimal, as opposed to a win and place wager with different stakes, are complicated and appear likely to occur rarely in practice. However, bettors obviously see the attraction in giving themselves two ways to bet on the one horse or two ways to win and betting each way. We suggest part of the ‘each-way’ betting attraction is that they are quick and easy to compute – a heuristic – to solve an otherwise complex betting strategy.

Item Type:
Journal Article
Journal or Publication Title:
Applied Economics
Additional Information:
This is an Accepted Manuscript of an article published by Taylor & Francis in Applied Economics on 06/11/2017, available online: http://www.tandfonline.com/10.1080/00036846.2017.1397855
Uncontrolled Keywords:
/dk/atira/pure/subjectarea/asjc/2000/2002
Subjects:
?? each-way betscumulative prospect theoryrank-dependent utilityeconomics and econometrics ??
ID Code:
88527
Deposited By:
Deposited On:
03 Nov 2017 11:54
Refereed?:
Yes
Published?:
Published
Last Modified:
12 Oct 2024 00:10