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Quasi Hopf superalgebras and their dual structuresIsaac, P. Unknown Date (has links)
No description available.
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Classical and quantum nonlinear dynamicsScott, A. Unknown Date (has links)
No description available.
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The computer simulation of electron paramagnetic resonance spectra employing homotopyGriffin, M. P. Unknown Date (has links)
No description available.
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Applications of forecasting and optimisation in the Australian national electricity marketBaloi, C. A. Unknown Date (has links)
No description available.
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New solutions of the Yang-Baxter equation associated with quantised orthosymplectic lie superalgebrasMehta, Maithili Unknown Date (has links)
No description available.
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Quasi Hopf superalgebras and their dual structuresIsaac, P. Unknown Date (has links)
No description available.
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Quasi Hopf superalgebras and their dual structuresIsaac, P. Unknown Date (has links)
No description available.
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Applications of forecasting and optimisation in the Australian national electricity marketBaloi, C. A. Unknown Date (has links)
No description available.
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New solutions of the Yang-Baxter equation associated with quantised orthosymplectic lie superalgebrasMehta, Maithili Unknown Date (has links)
No description available.
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Stochastic models of election timingLesmono, Dharma Unknown Date (has links)
Under the democratic systems of government instilled in many sovereign states, the party in government maintains a constitutional right to call an early election. While the constitution states that there is a maximum period between elections, early elections are frequently called. This right to call an early election gives the government a control to maximize its remaining life in power. The optimal control for the government is found by locating an exercise boundary that indicates whether or not a premature election should be called. This problem draws upon the body of literature on optimal stopping problems and stochastic control. Morgan Polls two-party-preferred data are used to model the behaviour of the poll process and a mean reverting Stochastic Differential Equation (SDE) is fitted to these data. Parameters of this SDE are estimated using the Maximum Likelihood Estimation (MLE) Method. Analytic analysis of the SDE for the poll process is given and it will be proven that there is a unique solution to the SDE subject to some conditions. In the first layer, a discrete time model is developed by considering a binary control for the government, viz. calling an early election or not. A comparison between a three-year and a four-year maximum term is also given. A condition when the early exercise option is removed, which leads to a fixed term government such as in the USA is also considered. In the next layer, the possibility for the government to use some control tools that are termed as boosts to induce shocks to the opinion polls by making timely policy announcements or economic actions is also considered. These actions will improve the governments popularity and will have some impacts upon the early-election exercise boundary. An extension is also given by allowing the government to choose the size of its boosts to maximize its expected remaining life in power. In the next layer, a continuous time model for this election timing is developed by using a martingale approach and Itos Lemma which leads to a problem of solving a partial differential equation (PDE) along with some boundary conditions. Another condition considered is when the government can only call an election and the opposition can apply boosts to raise its popularity or just to pull governments popularity down. The ultimate case analysed is when both the government and the opposition can use boosts and the government still has option to call an early election. In these two cases a game theory approach is employed and results are given in terms of the expected remaining life in power and the probability of calling and using boosts at every time step and at certain level of popularity.
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