A NON-GAUSSIAN FAMILY OF STATE-SPACE MODELS WITH EXACT MARGINAL LIKELIHOOD

The Gaussian assumption generally employed in many state‐space models is usually not satisfied for real time series. Thus, in this work, a broad family of non‐Gaussian models is defined by integrating and expanding previous work in the literature. The expansion is obtained at two levels: at the obse...

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Veröffentlicht in:	Journal of time series analysis 2013-11, Vol.34 (6), p.625-645
Hauptverfasser:	Gamerman, Dani, dos Santos, Thiago Rezende, Franco, Glaura C.
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Sprache:	eng
Schlagworte:	Bayesian Bayesian analysis Bayesian method Classical inference forecasting Functional analysis Marginality Mathematical models Mathematics Methodology non-linear system evolution Normal distribution Probability smoothing Studies Time series
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container_end_page	645
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container_title	Journal of time series analysis
container_volume	34
creator	Gamerman, Dani dos Santos, Thiago Rezende Franco, Glaura C.
description	The Gaussian assumption generally employed in many state‐space models is usually not satisfied for real time series. Thus, in this work, a broad family of non‐Gaussian models is defined by integrating and expanding previous work in the literature. The expansion is obtained at two levels: at the observational level, it allows for many distributions not previously considered, and at the latent state level, it involves an expanded specification for the system evolution. The class retains analytical availability of the marginal likelihood function, uncommon outside Gaussianity. This expansion considerably increases the applicability of the models and solves many previously existing problems such as long‐term prediction, missing values and irregular temporal spacing. Inference about the state components can be performed because of the introduction of a new and exact smoothing procedure, in addition to filtered distributions. Inference for the hyperparameters is presented from the classical and Bayesian perspectives. The results seem to indicate competitive results of the models when compared with other non‐Gaussian state‐space models available. The methodology is applied to Gaussian and non‐Gaussian dynamic linear models with time‐varying means and variances and provides a computationally simple solution to inference in these models. The methodology is illustrated in a number of examples.
doi_str_mv	10.1111/jtsa.12039
format	Article
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The results seem to indicate competitive results of the models when compared with other non‐Gaussian state‐space models available. The methodology is applied to Gaussian and non‐Gaussian dynamic linear models with time‐varying means and variances and provides a computationally simple solution to inference in these models. 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Time Ser. Anal</addtitle><description>The Gaussian assumption generally employed in many state‐space models is usually not satisfied for real time series. Thus, in this work, a broad family of non‐Gaussian models is defined by integrating and expanding previous work in the literature. The expansion is obtained at two levels: at the observational level, it allows for many distributions not previously considered, and at the latent state level, it involves an expanded specification for the system evolution. The class retains analytical availability of the marginal likelihood function, uncommon outside Gaussianity. This expansion considerably increases the applicability of the models and solves many previously existing problems such as long‐term prediction, missing values and irregular temporal spacing. Inference about the state components can be performed because of the introduction of a new and exact smoothing procedure, in addition to filtered distributions. Inference for the hyperparameters is presented from the classical and Bayesian perspectives. The results seem to indicate competitive results of the models when compared with other non‐Gaussian state‐space models available. The methodology is applied to Gaussian and non‐Gaussian dynamic linear models with time‐varying means and variances and provides a computationally simple solution to inference in these models. The methodology is illustrated in a number of examples.</description><subject>Bayesian</subject><subject>Bayesian analysis</subject><subject>Bayesian method</subject><subject>Classical inference</subject><subject>forecasting</subject><subject>Functional analysis</subject><subject>Marginality</subject><subject>Mathematical models</subject><subject>Mathematics</subject><subject>Methodology</subject><subject>non-linear system evolution</subject><subject>Normal distribution</subject><subject>Probability</subject><subject>smoothing</subject><subject>Studies</subject><subject>Time series</subject><issn>0143-9782</issn><issn>1467-9892</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2013</creationdate><recordtype>article</recordtype><recordid>eNp90EFPgzAUB_DGaOKcXvwETbwYE2ZLoaXHBtlgMjADM_XSMFYSJhuTbtF9e5moBw--y7v8_i8vfwAuMRrgdm6XW50NsIkIPwI9bFFmcIebx6CHsEUMzhzzFJxpvUQIU4vhHhgLGMWRMRKPSRKICA7FJAifYTyESSpSz0gehOvBSXznhQmcBakPvSfhpnAipqMgEiEMg3svDPw4vjsHJ0VWaXXxvfsgGXqp6xthPApcERq5xWxuFLY5R5gxRHJiOhlFBeaMK4vzgtBFVjCEFMqdvDAzh2OSswWlDnUWyJqTwiZ9cN1d3TT1207prVyVOldVla1VvdMSWza3bYoQaenVH7qsd826_a1VFqGEUAe16qZTeVNr3ahCbppylTV7iZE8lCoPpcqvUluMO_xeVmr_j5TjNBE_GaPLlHqrPn4zWfMqKSPMlrNoJPHMjV6mQ19G5BNQTX_P</recordid><startdate>201311</startdate><enddate>201311</enddate><creator>Gamerman, Dani</creator><creator>dos Santos, Thiago Rezende</creator><creator>Franco, Glaura C.</creator><general>Blackwell Publishing Ltd</general><scope>BSCLL</scope><scope>AAYXX</scope><scope>CITATION</scope><scope>8BJ</scope><scope>FQK</scope><scope>JBE</scope><scope>JQ2</scope></search><sort><creationdate>201311</creationdate><title>A NON-GAUSSIAN FAMILY OF STATE-SPACE MODELS WITH EXACT MARGINAL LIKELIHOOD</title><author>Gamerman, Dani ; dos Santos, Thiago Rezende ; Franco, Glaura C.</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c4759-f52b017703c328a60f1979e499f36daf700e0c8cf2a8913c7d66868d04b3f53</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2013</creationdate><topic>Bayesian</topic><topic>Bayesian analysis</topic><topic>Bayesian method</topic><topic>Classical inference</topic><topic>forecasting</topic><topic>Functional analysis</topic><topic>Marginality</topic><topic>Mathematical models</topic><topic>Mathematics</topic><topic>Methodology</topic><topic>non-linear system evolution</topic><topic>Normal distribution</topic><topic>Probability</topic><topic>smoothing</topic><topic>Studies</topic><topic>Time series</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Gamerman, Dani</creatorcontrib><creatorcontrib>dos Santos, Thiago Rezende</creatorcontrib><creatorcontrib>Franco, Glaura C.</creatorcontrib><collection>Istex</collection><collection>CrossRef</collection><collection>International Bibliography of the Social Sciences (IBSS)</collection><collection>International Bibliography of the Social Sciences</collection><collection>International Bibliography of the Social Sciences</collection><collection>ProQuest Computer Science Collection</collection><jtitle>Journal of time series analysis</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Gamerman, Dani</au><au>dos Santos, Thiago Rezende</au><au>Franco, Glaura C.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>A NON-GAUSSIAN FAMILY OF STATE-SPACE MODELS WITH EXACT MARGINAL LIKELIHOOD</atitle><jtitle>Journal of time series analysis</jtitle><addtitle>J. Time Ser. Anal</addtitle><date>2013-11</date><risdate>2013</risdate><volume>34</volume><issue>6</issue><spage>625</spage><epage>645</epage><pages>625-645</pages><issn>0143-9782</issn><eissn>1467-9892</eissn><abstract>The Gaussian assumption generally employed in many state‐space models is usually not satisfied for real time series. Thus, in this work, a broad family of non‐Gaussian models is defined by integrating and expanding previous work in the literature. The expansion is obtained at two levels: at the observational level, it allows for many distributions not previously considered, and at the latent state level, it involves an expanded specification for the system evolution. The class retains analytical availability of the marginal likelihood function, uncommon outside Gaussianity. This expansion considerably increases the applicability of the models and solves many previously existing problems such as long‐term prediction, missing values and irregular temporal spacing. Inference about the state components can be performed because of the introduction of a new and exact smoothing procedure, in addition to filtered distributions. Inference for the hyperparameters is presented from the classical and Bayesian perspectives. The results seem to indicate competitive results of the models when compared with other non‐Gaussian state‐space models available. The methodology is applied to Gaussian and non‐Gaussian dynamic linear models with time‐varying means and variances and provides a computationally simple solution to inference in these models. The methodology is illustrated in a number of examples.</abstract><cop>Oxford</cop><pub>Blackwell Publishing Ltd</pub><doi>10.1111/jtsa.12039</doi><tpages>21</tpages></addata></record>
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subjects	Bayesian Bayesian analysis Bayesian method Classical inference forecasting Functional analysis Marginality Mathematical models Mathematics Methodology non-linear system evolution Normal distribution Probability smoothing Studies Time series
title	A NON-GAUSSIAN FAMILY OF STATE-SPACE MODELS WITH EXACT MARGINAL LIKELIHOOD
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