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153 results on '"van der Hoek, John"'

1. An explicit numerical algorithm to the solution of Volterra integral equation of the second kind

Author

Dong, Leanne and van der Hoek, John

Subjects
Mathematics - Numerical Analysis, 45D05, 65
Abstract

This paper considers a numeric algorithm to solve the equation \begin{align*} y(t)=f(t)+\int^t_0 g(t-\tau)y(\tau)\,d\tau \end{align*} with a kernel $g$ and input $f$ for $y$. In some applications we have a smooth integrable kernel but the input $f$ could be a generalised function, which could involve the Dirac distribution. We call the case when $f=\delta$, the Dirac distribution centred at 0, the fundamental solution $E$, and show that $E=\delta+h$ where $h$ is integrable and solve \begin{align*} h(t)=g(t)+\int^t_0 g(t-\tau)h(\tau)\,d\tau \end{align*} The solution of the general case is then \begin{align*} y(t)=f(t)+(h*f)(t) \end{align*} which involves the convolution of $h$ and $f$. We can approximate $g$ to desired accuracy with piecewise constant kernel for which the solution $h$ is known explicitly. We supply an algorithm for the solution of the integral equation with specified accuracy., Comment: 5 figures. This paper will be submitted to Journal publication by December. It also serves as the theoretical basis for an upcoming publication of the author

Published
2019

4. An approximation of It\^o diffusions based on simple random walks

Author

van der Hoek, John and Szabados, Tamas

Subjects
Mathematics - Probability, Primary 60H10, secondary 60H35, 60F15
Abstract

The aim of this paper is to develop a sequence of discrete approximations to a one-dimensional It\^o diffusion that almost surely converges to a weak solution of the given stochastic differential equation. Under suitable conditions, the solution of the stochastic differential equation can be reduced to the solution of an ordinary differential equation plus an application of Girsanov's theorem to adjust the drift. The discrete approximation is based on a specific strong approximation of Brownian motion by simple, symmetric random walks (the so-called "twist and shrink" method). A discrete It\^o's formula is also used during the discrete approximation., Comment: 21 pages, 3 figures

Published
2014

5. Mixtures of multivariate Gaussians.

Author

van der Hoek, John and Elliott, Robert J.

Subjects
*EXPECTATION-maximization algorithms, *MIXTURES, *DENSITY, *PROBABILITY theory, *MOTIVATION (Psychology)
Abstract

This article discusses the approximation of probability densities by mixtures of Gaussian densities. The Kullback-Leibler divergence is used as a measure between densities, followed by applications of the EM algorithm. The conditions under which we study these questions are motivated by approximations introduced in non-linear Kalman-type filtering. [ABSTRACT FROM AUTHOR]

Published
2024
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15. Lectures On Quantitative Islamic Finance

Author

Syahril, Effendi and van der Hoek, John

Subjects
Islamic Finance, Quantitative Finance
Abstract

This work consists of four parts: - Part I: Kuhn-Tucker and Duality - Part II: Growth Optimal Portfolio - Part III: Growth Optimal Portfolio Under Shariah Restrictions - Part IV: Future Directions Comments and input of this notes directed to fendisyahril@gmail.com.

Published
2020
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21. A finite-dimensional filter for hybrid observations

Author

Elliott, Robert J. and van der Hoek, John

Subjects
Filtering (Electronics) -- Research, Markov processes -- Research, Kalman filtering -- Research, Random noise theory -- Research
Abstract

The paper considers a system whose dynamics are described in terms of the hybrid of a VAR(1)-type process and discrete state-space Markov chain. This paper provides a recursive expression for the conditional density/distributions of these two processes, given a set of observations which are a noisy linear combination of these two processes.

Published
1998

28. Space matters: the importance of amenity in planning metropolitan growth

Author

Mahmoudi, Parvin, MacDonald, Darla Hatton, Crossman, Neville D., Summers, David M., and Van Der Hoek, John

Subjects
fixed effects, open space, Community/Rural/Urban Development, water management and policy, water restrictions, spatial lag, Land Economics/Use, hedonic pricing
Abstract

Most Australian capital cities require many 100,000s of additional dwellings to accommodate demographic change and population pressures in the next two or three decades. Urban growth will come in the form of infill, consolidation and urban expansion. Plans to redevelop environmental amenities such as parks and open green spaces are regularly being put forward to local councils and State governments. Maintaining parks and reserves represents one of the largest costs to local councils. To aid in the evaluation of some of the different propositions, we report the results of a spatial hedonic pricing model with fixed effects for Adelaide, South Australia. The results indicate that the private benefits of a close proximity to golf courses, green space sporting facilities, or the coast, are in the order $0.54, $1.58, and $4.99 per metre closer (when evaluated at the median respectively). The historic Adelaide Parklands add $1.55 to a property’s value for each additional metre closer. We demonstrate how the estimated model could be used to calculate how local private benefits capitalized in property values change with changes in the configuration of a park.

Published
2013
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31. Pricing participating policies under the Meixner process and stochastic volatility.

Author

Shanahan, Brett, Alavi Fard, Farzad, and van der Hoek, John

Subjects
PRICING, LIFE insurance, ANALYTICAL solutions, PRICE regulation, MARKETING strategy
Abstract

We propose a model for the valuation of participating life insurance products under the Meixner process, which belongs to the family of semi-heavy tailed processes. This particular model assumption is extremely desirable as it captures the stylised features of the return distribution, with existing moment generating functions. The highlight of the paper is the analytical solution derived for minimising the relative entropy between the historical and risk-neutral measures, when driving a pricing kernel. Further, we capture the stochastic volatility effect using an accurate polynomial approximation technique. Finally, to highlight the practical applications, we conduct a simulation experiment. [ABSTRACT FROM PUBLISHER]

Published
2017
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39. Pairs trading

Author

Elliott, Robert J., primary, Van Der Hoek *, John, additional, and Malcolm, William P., additional

Published
2005
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43. American option prices in a Markov chain market model.

Author

van der Hoek, John and Elliott, Robert J.

Subjects
MARKOV processes, ASSETS (Accounting), VARIATIONAL inequalities (Mathematics), NUMERICAL analysis, MATHEMATICAL models
Abstract

This paper is a sequel to our previous paper 'A New Paradigm in Asset Pricing' in which we construct a model for asset pricing in a world where the randomness is modeled by a Markov chain. In this paper we develop a theory of optimal stopping and related variational inequalities for American options in this model. A version of Saigal's Lemma is established and numerical results obtained. Copyright © 2011 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published
2012
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44. Nonlinear Filter Estimation of Volatility.

Author

ELLIOTT, ROBERT J., VAN DER HOEK, JOHN, and VALENCIA, JORGE

Subjects
*COMPUTATIONAL mathematics, *ALGORITHMS, *MARKET volatility, *EXPECTATION-maximization algorithms, *MATHEMATICAL models
Abstract

A discrete time nonlinear filter is used to estimate the volatility in a financial model. New filters are derived for sums of unobserved quantities and the EM algorithm applied to determine the parameters of the model. [ABSTRACT FROM AUTHOR]

Published
2010
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45. CONDITIONAL EXPECTATION FORMULAE FOR COPULAS.

Author

Crane, Glenis J. and Van Der Hoek, John

Subjects
*COPULA functions, *CONDITIONAL expectations, *DISTRIBUTION (Probability theory), *MULTIVARIATE analysis, *REGRESSION analysis, *MATHEMATICAL statistics
Abstract

Not only are copula functions joint distribution functions in their own right, they also provide a link between multivariate distributions and their lower-dimensional marginal distributions. Copulas have a structure that allows us to characterize all possible multivariate distributions, and therefore they have the potential to be a very useful statistical tool. Although copulas can be traced back to 1959, there is still much scope for new results, as most of the early work was theoretical rather than practical. We focus on simple practical tools based on conditional expectation, because such tools are not widely available. When dealing with data sets in which the dependence throughout the sample is variable, we suggest that copula-based regression curves may be more accurate predictors of specific outcomes than linear models. We derive simple conditional expectation formulae in terms of copulas and apply them to a combination of simulated and real data. [ABSTRACT FROM AUTHOR]

Published
2008
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46. DYNAMIC PORTFOLIO ALLOCATION, THE DUAL THEORY OF CHOICE AND PROBABILITY DISTORTION FUNCTIONS.

Author

Hamada, Mahmoud, Sherris, Michael, and Van Der Hoek, John

Subjects
INVESTMENTS, UTILITY theory, ASSET allocation, RISK (Insurance), PROBABILITY theory
Abstract

Standard optimal portfolio choice models assume that investors maximise the expected utility of their future outcomes. However, behaviour which is inconsistent with the expected utility theory has often been observed. In a discrete time setting, we provide a formal treatment of risk measures based on distortion functions that are consistent with Yaari's dual (non-expected utility) theory of choice (1987), and set out a general layout for portfolio optimisation in this non-expected utility framework using the risk neutral computational approach. As an application, we consider two particular risk measures. The first one is based on the PH-transform and treats the upside and downside of the risk differently. The second one, introduced by Wang (2000) uses a probability distortion operator based on the cumulative normal distribution function. Both risk measures rank-order prospects and apply a distortion function to the entire vector of probabilities. [ABSTRACT FROM AUTHOR]

Published
2006
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49. Optimal Linear Estimation and Data Fusion.

Author

Elliott, Robert J. and van der Hoek, John

Subjects
*AUTOMATIC control systems, *MULTISENSOR data fusion, *SIGNAL processing, *LINEAR systems, *CONTROL theory (Engineering), *MACHINE theory, *SYSTEM analysis, *NOISE control, *NOISE generators (Electronics)
Abstract

Optimal mean square linear estimators are determined for general uncorrelated noise. We allow the noise variance matrix in the observation process to be singular. This requires properties of generalized inverses which are developed in Section II. The proofs appear to be new. When there are two observation sequences the optimal method of recursively fusing the two is determined. We derive a new formula for the covariance of the two estimates which then provides exact dynamics for a fused estimate. [ABSTRACT FROM AUTHOR]

Published
2006
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