A Continuous Time Model for Election Timing

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dc.contributor.author Lesmono, Julius Dharma
dc.contributor.author Tonkes, E.J.
dc.contributor.author Burrage, Kevin
dc.date.accessioned 2017-07-07T06:04:46Z
dc.date.available 2017-07-07T06:04:46Z
dc.date.issued 2005
dc.identifier.issn 0311-0729
dc.identifier.uri http://hdl.handle.net/123456789/2472
dc.description AUSTRALIAN MATHEMATICAL SOCIETY GAZETTE; Vol.35 No.5, 2005
dc.description.abstract We consider a continuous time model for election timing in a Majoritarian Parliamentary System where the government maintains a constitutional right to call an early election. Our model is based on the two-party-preferred data that measure the popularity of the government and the opposition over time. We describe the poll process by a Stochastic Differential Equation (SDE) and use a martingale approach to derive a Partial Differential Equation (PDE) for the government’s expected remaining life in office. A comparison is made between a three-year and a four-year maximum term and we also provide the exercise boundary for calling an election. Impacts on changes in parameters in the SDE, the probability of winning the election and maximum terms on the call exercise boundaries are discussed and analysed. An application of our model to the Australian Federal Election for House of Representatives is also given. en_US
dc.publisher Australian Mathematical Society en_US
dc.relation.ispartofseries AUSTRALIAN MATHEMATICAL SOCIETY GAZETTE;Vol.35 No.5, 2005
dc.title A Continuous Time Model for Election Timing en_US
dc.type Journal Articles en_US


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