Alex Akwasi Opoku scite author profile

We present a general method to derive continuity estimates for conditional probabilities of general (possibly continuous) spin models subjected to local transformations. Such systems arise in the study of a stochastic time-evolution of Gibbs measures or as noisy observations.We exhibit the minimal necessary structure for such double-layer systems. Assuming no a priori metric on the local state spaces, we define the posterior metric on the local image space. We show that it allows in a natural way to divide the local part of the continuity estimates from the spatial part (which is treated by Dobrushin uniqueness here). We show in the concrete example of the time evolution of rotators on the (q − 1)-dimensional sphere how this method can be used to obtain estimates in terms of the familiar Euclidean metric.

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Continuous spin mean-field models: Limiting kernels and Gibbs properties of local transforms

Kuelske

Opoku

2008

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We extend the notion of Gibbsianness for mean-field systems to the set-up of general (possibly continuous) local state spaces. We investigate the Gibbs properties of systems arising from an initial mean-field Gibbs measure by application of given local transition kernels. This generalizes previous case-studies made for spins taking finitely many values to the first step in direction to a general theory, containing the following parts: (1) A formula for the limiting conditional probability distributions of the transformed system. It holds both in the Gibbs and non-Gibbs regime and invokes a minimization problem for a "constrained rate-function". (2) A criterion for Gibbsianness of the transformed system for initial Lipschitz-Hamiltonians involving concentration properties of the transition kernels. (3) A continuity estimate for the single-site conditional distributions of the transformed system. While (2) and (3) have provable lattice-counterparts, the characterization of (1) is stronger in mean-field. As applications we show short-time Gibbsianness of rotator meanfield models on the (q − 1)-dimensional sphere under diffusive time-evolution and the preservation of Gibbsianness under local coarse-graining of the initial local spin space.

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Gibbs–non-Gibbs properties for n-vector lattice and mean-field models

Enter¹,

Külske²,

Opoku³

et al. 2010

Braz. J. Probab. Stat.

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We review some recent developments in the study of Gibbs and non-Gibbs properties of transformed n−vector lattice and mean-field models under various transformations. Also, some new results for the loss and recovery of the Gibbs property of planar rotor models during stochastic time evolution are presented. A.C.D. van.Enter@rug.nl, http://statmeca.fmns.rug.nl/ † c.kulske@rug.nl, http://www.math.rug.nl/∼kuelske/ ‡ A.a.opoku@math.rug.nl http://statmeca.fmns.rug.nl/Alex.html § W.M.Ruszel@rug.nl

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Discrete approximations to vector spin models

Enter¹,

Külske²,

Opoku³

2011

J. Phys. A: Math. Theor.

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We strengthen a result from [17] on the existence of effective interactions for discretised continuous-spin models. We also point out that such an interaction cannot exist at very low temperatures. Moreover, we compare two ways of discretising continuous-spin models, and show that, except for very low temperatures, they behave similarly in two dimensions. We also discuss some possibilities in higher dimensions.

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Parameter Evaluation for a Statistical Mechanical Model for Binary Choice with Social Interaction

Opoku

Osabutey

Kwofie

2019

Journal of Probability and Statistics

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In this paper we use a statistical mechanical model as a paradigm for educational choices when the reference population is partitioned according to the socioeconomic attributes of gender and residence. We study how educational attainment is influenced by socioeconomic attributes of gender and residence for five selected developing countries. The model has a social and a private incentive part with coefficients measuring the influence individuals have on each other and the external influence on individuals, respectively. The methods of partial least squares and the ordinary least squares are, respectively, used to estimate the parameters of the interacting and the noninteracting models. This work differs from the previous work that motivated this work in the following sense: (a) the reference population is divided into subgroups with unequal subgroup sizes, (b) the proportion of individuals in each of the subgroups may depend on the population size N, and (c) the method of partial least squares is used for estimating the parameters of the model with social interaction as opposed to the least squares method used in the earlier work.

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