November 16, 2024
Mohammad Esmail Dehghan Monfared

Mohammad Esmail Dehghan Monfared

Academic Rank: Assistant professor
Address:
Degree: Ph.D in -
Phone: -
Faculty: Faculty of Intelligent Systems and Data Science

Research

Title
A BAYESIAN APPROACH TO MULTIPLE CHANGE-POINTS
Type Thesis
Keywords
بيز تجربي، خانواده هاي نمايي، خطي تعميم يافته مدل هاي خودرگرسيون، نقاط تغيير چندگانه، تقسيم بندي.
Researchers Mohammad Esmail Dehghan Monfared (Primary advisor) , Fazlollah Lak (Primary advisor) , Mahmoud Afshari (Advisor)

Abstract

After a brief review of previous frequentist and Bayesian approaches to multiple change-points, we describe a Bayesian model for multiple parameter changes in a Multiparameter exponential family. This model has attractive statistical and computational properties and yields explicit recursive formulas for the Bayes estimates of the piecewise constant parameters. Efficient estimators of the hyperparameters of the Bayesian model for the parameter jumps can be used in conjunction, yielding empirical Bayes estimates. The empirical Bayes approach is also applied to solve long-standing frequentist problems such as significance testing of the null hypothesis of no change-points versus multiple change-point alternatives, and inference on the number and locations of change-points that partition the unknown parameter sequence into segments of equal values. Simulation studies of performance and an illustrative application to the British coal mine data are also given. Extensions from the exponential family to general parametric families and from independent observations to generalized linear time series models are then provided.