Identification of the Rate Function

AbstractWe study a model of active particles that perform a simple random walk and on top of that have a preferred direction determined by an internal state which is modelled by a stationary Markov process. First we calculate the limiting diffusion coefficient. Then we show that the ‘active part’ of the diffusion coefficient is in some sense maximal for reversible state processes. Further, we obtain a large deviations principle for the active particle in terms of the large deviations rate function of the empirical process corresponding to the state process. Again we show that the rate function and free energy function are (pointwise) optimal for reversible state processes. Finally, we show that in the case with two states, the Fourier–Laplace transform of the distribution, the moment generating function and the free energy function can be computed explicitly. Along the way we provide several examples.

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Fast Reaction Limits via $$\Gamma $$-Convergence of the Flux Rate Functional

Journal of Dynamics and Differential Equations ◽

10.1007/s10884-021-10024-2 ◽

2021 ◽

Author(s):

Mark A. Peletier ◽

D. R. Michiel Renger

Keyword(s):

Evolution Equations ◽

Detailed Balance ◽

Approximate Solutions ◽

Reaction Rates ◽

Convergence Result ◽

Rate Function ◽

Jump Processes ◽

Kolmogorov Equations ◽

Markov Jump ◽

Fast Reaction

AbstractWe study the convergence of a sequence of evolution equations for measures supported on the nodes of a graph. The evolution equations themselves can be interpreted as the forward Kolmogorov equations of Markov jump processes, or equivalently as the equations for the concentrations in a network of linear reactions. The jump rates or reaction rates are divided in two classes; ‘slow’ rates are constant, and ‘fast’ rates are scaled as $$1/\epsilon $$ 1 / ϵ , and we prove the convergence in the fast-reaction limit $$\epsilon \rightarrow 0$$ ϵ → 0 . We establish a $$\Gamma $$ Γ -convergence result for the rate functional in terms of both the concentration at each node and the flux over each edge (the level-2.5 rate function). The limiting system is again described by a functional, and characterises both fast and slow fluxes in the system. This method of proof has three advantages. First, no condition of detailed balance is required. Secondly, the formulation in terms of concentration and flux leads to a short and simple proof of the $$\Gamma $$ Γ -convergence; the price to pay is a more involved compactness proof. Finally, the method of proof deals with approximate solutions, for which the functional is not zero but small, without any changes.

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A Bimodal Extension of the Exponential Distribution with Applications in Risk Theory

Symmetry ◽

10.3390/sym13040679 ◽

2021 ◽

Vol 13 (4) ◽

pp. 679

Author(s):

Jimmy Reyes ◽

Emilio Gómez-Déniz ◽

Héctor W. Gómez ◽

Enrique Calderín-Ojeda

Keyword(s):

Exponential Distribution ◽

Hazard Rate ◽

Rate Function ◽

Estimation Methods ◽

Inverse Gaussian ◽

New Family ◽

Tail Distribution ◽

Zero Values ◽

The Mean ◽

Positive Support

There are some generalizations of the classical exponential distribution in the statistical literature that have proven to be helpful in numerous scenarios. Some of these distributions are the families of distributions that were proposed by Marshall and Olkin and Gupta. The disadvantage of these models is the impossibility of fitting data of a bimodal nature of incorporating covariates in the model in a simple way. Some empirical datasets with positive support, such as losses in insurance portfolios, show an excess of zero values and bimodality. For these cases, classical distributions, such as exponential, gamma, Weibull, or inverse Gaussian, to name a few, are unable to explain data of this nature. This paper attempts to fill this gap in the literature by introducing a family of distributions that can be unimodal or bimodal and nests the exponential distribution. Some of its more relevant properties, including moments, kurtosis, Fisher’s asymmetric coefficient, and several estimation methods, are illustrated. Different results that are related to finance and insurance, such as hazard rate function, limited expected value, and the integrated tail distribution, among other measures, are derived. Because of the simplicity of the mean of this distribution, a regression model is also derived. Finally, examples that are based on actuarial data are used to compare this new family with the exponential distribution.

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New Method for Generating New Families of Distributions

Symmetry ◽

10.3390/sym13040726 ◽

2021 ◽

Vol 13 (4) ◽

pp. 726

Author(s):

Lamya A. Baharith ◽

Wedad H. Aljuhani

Keyword(s):

Exponential Distribution ◽

Real Data ◽

Rate Function ◽

New Method ◽

Likelihood Method ◽

Alpha Power ◽

Unknown Parameters ◽

Failure Rate Function ◽

New Approach ◽

Numerical Studies

This article presents a new method for generating distributions. This method combines two techniques—the transformed—transformer and alpha power transformation approaches—allowing for tremendous flexibility in the resulting distributions. The new approach is applied to introduce the alpha power Weibull—exponential distribution. The density of this distribution can take asymmetric and near-symmetric shapes. Various asymmetric shapes, such as decreasing, increasing, L-shaped, near-symmetrical, and right-skewed shapes, are observed for the related failure rate function, making it more tractable for many modeling applications. Some significant mathematical features of the suggested distribution are determined. Estimates of the unknown parameters of the proposed distribution are obtained using the maximum likelihood method. Furthermore, some numerical studies were carried out, in order to evaluate the estimation performance. Three practical datasets are considered to analyze the usefulness and flexibility of the introduced distribution. The proposed alpha power Weibull–exponential distribution can outperform other well-known distributions, showing its great adaptability in the context of real data analysis.

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Kumaraswamy Generalized Power Lomax Distributionand Its Applications

Stats ◽

10.3390/stats4010003 ◽

2021 ◽

Vol 4 (1) ◽

pp. 28-45

Author(s):

Vasili B.V. Nagarjuna ◽

R. Vishnu Vardhan ◽

Christophe Chesneau

Keyword(s):

Hazard Rate ◽

Real Data ◽

Rate Function ◽

Maximum Likelihood Estimates ◽

Parameter Estimates ◽

Parameter Distribution ◽

Data Sets ◽

Lomax Distribution ◽

Entropy Measures ◽

Modeling Behavior

In this paper, a new five-parameter distribution is proposed using the functionalities of the Kumaraswamy generalized family of distributions and the features of the power Lomax distribution. It is named as Kumaraswamy generalized power Lomax distribution. In a first approach, we derive its main probability and reliability functions, with a visualization of its modeling behavior by considering different parameter combinations. As prime quality, the corresponding hazard rate function is very flexible; it possesses decreasing, increasing and inverted (upside-down) bathtub shapes. Also, decreasing-increasing-decreasing shapes are nicely observed. Some important characteristics of the Kumaraswamy generalized power Lomax distribution are derived, including moments, entropy measures and order statistics. The second approach is statistical. The maximum likelihood estimates of the parameters are described and a brief simulation study shows their effectiveness. Two real data sets are taken to show how the proposed distribution can be applied concretely; parameter estimates are obtained and fitting comparisons are performed with other well-established Lomax based distributions. The Kumaraswamy generalized power Lomax distribution turns out to be best by capturing fine details in the structure of the data considered.

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On Approximate Large Deviations for 1D Diffusion

Georgian Mathematical Journal ◽

10.1515/gmj.2003.381 ◽

2003 ◽

Vol 10 (2) ◽

pp. 381-399

Author(s):

A. Yu. Veretennikov

Keyword(s):

Differential Equation ◽

Exact Solution ◽

Large Deviations ◽

Stochastic Differential Equation ◽

Approximation Scheme ◽

Sufficient Conditions ◽

Rate Function ◽

Euler Approximation ◽

One Dimensional

Abstract We establish sufficient conditions under which the rate function for the Euler approximation scheme for a solution of a one-dimensional stochastic differential equation on the torus is close to that for an exact solution of this equation.

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Theory and Applications of the Unit Gamma/Gompertz Distribution

Mathematics ◽

10.3390/math9161850 ◽

2021 ◽

Vol 9 (16) ◽

pp. 1850

Author(s):

Rashad A. R. Bantan ◽

Farrukh Jamal ◽

Christophe Chesneau ◽

Mohammed Elgarhy

Keyword(s):

Stochastic Ordering ◽

Real Data ◽

Rate Function ◽

The Other ◽

Likelihood Method ◽

Model Parameters ◽

Data Sets ◽

Gompertz Distribution ◽

Probability And Statistics ◽

Analytical Behavior

Unit distributions are commonly used in probability and statistics to describe useful quantities with values between 0 and 1, such as proportions, probabilities, and percentages. Some unit distributions are defined in a natural analytical manner, and the others are derived through the transformation of an existing distribution defined in a greater domain. In this article, we introduce the unit gamma/Gompertz distribution, founded on the inverse-exponential scheme and the gamma/Gompertz distribution. The gamma/Gompertz distribution is known to be a very flexible three-parameter lifetime distribution, and we aim to transpose this flexibility to the unit interval. First, we check this aspect with the analytical behavior of the primary functions. It is shown that the probability density function can be increasing, decreasing, “increasing-decreasing” and “decreasing-increasing”, with pliant asymmetric properties. On the other hand, the hazard rate function has monotonically increasing, decreasing, or constant shapes. We complete the theoretical part with some propositions on stochastic ordering, moments, quantiles, and the reliability coefficient. Practically, to estimate the model parameters from unit data, the maximum likelihood method is used. We present some simulation results to evaluate this method. Two applications using real data sets, one on trade shares and the other on flood levels, demonstrate the importance of the new model when compared to other unit models.

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Generalized Birnbaum–Saunders kernel for hazard rate function estimation

Communications in Statistics - Simulation and Computation ◽

10.1080/03610918.2021.1887228 ◽

2021 ◽

pp. 1-19

Author(s):

Sylia Chekkal ◽

Karima Lagha ◽

Nabil Zougab

Keyword(s):

Hazard Rate ◽

Rate Function ◽

Hazard Rate Function ◽

Function Estimation

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A New Inverted Topp-Leone Distribution: Applications to the COVID-19 Mortality Rate in Two Different Countries

Axioms ◽

10.3390/axioms10010025 ◽

2021 ◽

Vol 10 (1) ◽

pp. 25 ◽

Cited By ~ 2

Author(s):

Ehab Almetwally ◽

Randa Alharbi ◽

Dalia Alnagar ◽

Eslam Hafez

Keyword(s):

Statistical Model ◽

Least Squares ◽

Weighted Least Squares ◽

Likelihood Estimation ◽

Linear Representation ◽

Rate Function ◽

Estimation Methods ◽

Unknown Parameters ◽

Least Squares Estimators ◽

New Distribution

This paper aims to find a statistical model for the COVID-19 spread in the United Kingdom and Canada. We used an efficient and superior model for fitting the COVID 19 mortality rates in these countries by specifying an optimal statistical model. A new lifetime distribution with two-parameter is introduced by a combination of inverted Topp-Leone distribution and modified Kies family to produce the modified Kies inverted Topp-Leone (MKITL) distribution, which covers a lot of application that both the traditional inverted Topp-Leone and the modified Kies provide poor fitting for them. This new distribution has many valuable properties as simple linear representation, hazard rate function, and moment function. We made several methods of estimations as maximum likelihood estimation, least squares estimators, weighted least-squares estimators, maximum product spacing, Crame´r-von Mises estimators, and Anderson-Darling estimators methods are applied to estimate the unknown parameters of MKITL distribution. A numerical result of the Monte Carlo simulation is obtained to assess the use of estimation methods. also, we applied different data sets to the new distribution to assess its performance in modeling data.

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A Generalized Rayleigh Family of Distributions Based on the Modified Slash Model

Symmetry ◽

10.3390/sym13071226 ◽

2021 ◽

Vol 13 (7) ◽

pp. 1226

Author(s):

Inmaculada Barranco-Chamorro ◽

Yuri A. Iriarte ◽

Yolanda M. Gómez ◽

Juan M. Astorga ◽

Héctor W. Gómez

Keyword(s):

Heavy Tails ◽

Real Data ◽

Rate Function ◽

Data Sets ◽

Estimation Of Parameters ◽

Stochastic Representation ◽

Likelihood Methods ◽

Chi Square ◽

Maximum Likelihood Methods ◽

Family Of Distributions

Specifying a proper statistical model to represent asymmetric lifetime data with high kurtosis is an open problem. In this paper, the three-parameter, modified, slashed, generalized Rayleigh family of distributions is proposed. Its structural properties are studied: stochastic representation, probability density function, hazard rate function, moments and estimation of parameters via maximum likelihood methods. As merits of our proposal, we highlight as particular cases a plethora of lifetime models, such as Rayleigh, Maxwell, half-normal and chi-square, among others, which are able to accommodate heavy tails. A simulation study and applications to real data sets are included to illustrate the use of our results.

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