Neighbour balanced block designs for correlated errors
Identifieur interne : 001127 ( Istex/Corpus ); précédent : 001126; suivant : 001128Neighbour balanced block designs for correlated errors
Auteurs : Joachim KunertSource :
- Biometrika [ 0006-3444 ] ; 1987-12.
Abstract
The paper considers a simple block model and assumes that the errors within the blocks are correlated, following a stationary first-order autoregressive process. Gill & Shukla (1985) consider this model, but they restrict the set of the competing designs to a small subset of the possible designs, the binary and equireplicate designs. In the present paper we show that the designs determined by Gill & Shukla are optimal over all possible designs for positive correlations and that neighbour balanced designs in general are highly efficient.
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DOI: 10.1093/biomet/74.4.717
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Gill & Shukla (1985) consider this model, but they restrict the set of the competing designs to a small subset of the possible designs, the binary and equireplicate designs. In the present paper we show that the designs determined by Gill & Shukla are optimal over all possible designs for positive correlations and that neighbour balanced designs in general are highly efficient.</div></front></TEI><istex><corpusName>oup</corpusName><author><json:item><name>JOACHIM KUNERT</name><affiliations><json:string>Fachbereich IV-Mathematik/Statistik, Universität Trier, D-5500 Trier, Federal Republic of Germany</json:string></affiliations></json:item></author><subject><json:item><value>Articles</value></json:item><json:item><value>Block design</value></json:item><json:item><value>Correlated errors</value></json:item><json:item><value>Efficient design</value></json:item><json:item><value>Neighbour balance</value></json:item><json:item><value>Universal optimality</value></json:item><json:item><value>Weighted least-squares</value></json:item></subject><articleId><json:string>74.4.717</json:string></articleId><language><json:string>unknown</json:string></language><originalGenre><json:string>research-article</json:string></originalGenre><abstract>The paper considers a simple block model and assumes that the errors within the blocks are correlated, following a stationary first-order autoregressive process. Gill & Shukla (1985) consider this model, but they restrict the set of the competing designs to a small subset of the possible designs, the binary and equireplicate designs. In the present paper we show that the designs determined by Gill & Shukla are optimal over all possible designs for positive correlations and that neighbour balanced designs in general are highly efficient.</abstract><qualityIndicators><score>6.028</score><pdfVersion>1.2</pdfVersion><pdfPageSize>535 x 774 pts</pdfPageSize><refBibsNative>false</refBibsNative><keywordCount>7</keywordCount><abstractCharCount>542</abstractCharCount><pdfWordCount>3008</pdfWordCount><pdfCharCount>14876</pdfCharCount><pdfPageCount>8</pdfPageCount><abstractWordCount>85</abstractWordCount></qualityIndicators><title>Neighbour balanced block designs for correlated errors</title><refBibs><json:item><author><json:item><name>Azzalini </name></json:item><json:item><name>A Giovagnoli</name></json:item><json:item><name>A </name></json:item></author><host><volume>74</volume><pages><last>34</last><first>725</first></pages><author></author><title>Biometrika</title><publicationDate>1987</publicationDate></host><title>Some optimal designs for repeated measurements with autoregressive errors</title><publicationDate>1987</publicationDate></json:item><json:item><author><json:item><name>Ch Eng</name></json:item><json:item><name>C,S </name></json:item></author><host><volume>11</volume><pages><last>6</last><first>240</first></pages><author></author><title>Ann. Statist</title><publicationDate>1983</publicationDate></host><title>Construction of optimal balanced incomplete block designs for correlated observations</title><publicationDate>1983</publicationDate></json:item><json:item><author><json:item><name>Gill </name></json:item><json:item><name>P,S Shukla</name></json:item><json:item><name>G,K </name></json:item></author><host><volume>72</volume><pages><last>44</last><first>539</first></pages><author></author><title>Biometrika</title><publicationDate>1985</publicationDate></host><title>Efficiency of nearest neighbour balanced block designs for correlated observations</title><publicationDate>1985</publicationDate></json:item><json:item><author><json:item><name>J Kiefer</name></json:item></author><host><pages><last>53</last><first>333</first></pages><author></author><title>A Survey of Statistical Design and Linear Models</title><publicationDate>1975</publicationDate></host><title>Construction and optimality of generalized Youden designs Optimum balanced block and Latin square designs for correlated observations</title><publicationDate>1975</publicationDate></json:item><json:item><author><json:item><name>Kunert </name></json:item><json:item><name>J </name></json:item></author><host><volume>72</volume><pages><last>89</last><first>375</first></pages><author></author><title>Biometrika</title><publicationDate>1985</publicationDate></host><title>Optimal repeated measurements designs for correlated observations and analysis by weighted least squares</title><publicationDate>1985</publicationDate></json:item><json:item><author><json:item><name>Kunert </name></json:item><json:item><name>J </name></json:item></author><host><pages><last>98</last><first>287</first></pages><author></author><title>Statist. Decisions</title><publicationDate>1985</publicationDate></host><title>Optimal experimental design when the errors are assumed to be correlated</title><publicationDate>1985</publicationDate></json:item><json:item><author><json:item><name>Matthews </name></json:item><json:item><name>J,N S </name></json:item></author><host><volume>74</volume><pages><last>20</last><first>331</first></pages><author></author><title>Biometrika</title><publicationDate>1987</publicationDate></host><title>Optimal crossover designs for the comparison of two treatments in the presence of carryover effects and correlated errors</title><publicationDate>1987</publicationDate></json:item><json:item><author><json:item><name>Mukhopadhyay </name></json:item><json:item><name>A,C </name></json:item></author><host><volume>21</volume><pages><last>50</last><first>45</first></pages><author></author><title>Calcutta Statist. Assoc. Bull</title><publicationDate>1978-04</publicationDate></host><title>Constructions of BIBD'S from OA's and combinatorial arrangements analogous to OA's</title><publicationDate>1978-04</publicationDate></json:item></refBibs><genre><json:string>research-article</json:string></genre><host><volume>74</volume><publisherId><json:string>biomet</json:string></publisherId><pages><last>724</last><first>717</first></pages><issn><json:string>0006-3444</json:string></issn><issue>4</issue><genre><json:string>journal</json:string></genre><language><json:string>unknown</json:string></language><eissn><json:string>1464-3510</json:string></eissn><title>Biometrika</title></host><categories><wos><json:string>science</json:string><json:string>statistics & probability</json:string><json:string>mathematical & computational biology</json:string><json:string>biology</json:string></wos><scienceMetrix><json:string>natural sciences</json:string><json:string>mathematics & statistics</json:string><json:string>statistics & probability</json:string></scienceMetrix></categories><publicationDate>1987</publicationDate><copyrightDate>1987</copyrightDate><doi><json:string>10.1093/biomet/74.4.717</json:string></doi><id>B655B1039E3A4D6BFACE924810D82C2BD20E6F97</id><score>0.7734078</score><fulltext><json:item><extension>pdf</extension><original>true</original><mimetype>application/pdf</mimetype><uri>https://api.istex.fr/document/B655B1039E3A4D6BFACE924810D82C2BD20E6F97/fulltext/pdf</uri></json:item><json:item><extension>zip</extension><original>false</original><mimetype>application/zip</mimetype><uri>https://api.istex.fr/document/B655B1039E3A4D6BFACE924810D82C2BD20E6F97/fulltext/zip</uri></json:item><istex:fulltextTEI uri="https://api.istex.fr/document/B655B1039E3A4D6BFACE924810D82C2BD20E6F97/fulltext/tei"><teiHeader><fileDesc><titleStmt><title level="a">Neighbour balanced block designs for correlated errors</title><respStmt><resp>Références bibliographiques récupérées via GROBID</resp><name resp="ISTEX-API">ISTEX-API (INIST-CNRS)</name></respStmt></titleStmt><publicationStmt><authority>ISTEX</authority><publisher>Oxford University Press</publisher><availability><p>© 1987 Biometrika Trust</p></availability><date>1987</date></publicationStmt><sourceDesc><biblStruct type="inbook"><analytic><title level="a">Neighbour balanced block designs for correlated errors</title><author xml:id="author-1"><persName><forename type="first">JOACHIM</forename><surname>KUNERT</surname></persName><affiliation>Fachbereich IV-Mathematik/Statistik, Universität Trier, D-5500 Trier, Federal Republic of Germany</affiliation></author></analytic><monogr><title level="j">Biometrika</title><idno type="pISSN">0006-3444</idno><idno type="eISSN">1464-3510</idno><imprint><publisher>Oxford University Press</publisher><date type="published" when="1987-12"></date><biblScope unit="volume">74</biblScope><biblScope unit="issue">4</biblScope><biblScope unit="page" from="717">717</biblScope><biblScope unit="page" to="724">724</biblScope></imprint></monogr><idno type="istex">B655B1039E3A4D6BFACE924810D82C2BD20E6F97</idno><idno type="DOI">10.1093/biomet/74.4.717</idno><idno type="ArticleID">74.4.717</idno></biblStruct></sourceDesc></fileDesc><profileDesc><creation><date>1987</date></creation><abstract><p>The paper considers a simple block model and assumes that the errors within the blocks are correlated, following a stationary first-order autoregressive process. Gill & Shukla (1985) consider this model, but they restrict the set of the competing designs to a small subset of the possible designs, the binary and equireplicate designs. In the present paper we show that the designs determined by Gill & Shukla are optimal over all possible designs for positive correlations and that neighbour balanced designs in general are highly efficient.</p></abstract><textClass><keywords scheme="keyword"><list><item><term>Articles</term></item></list></keywords></textClass><textClass><keywords scheme="keyword"><list><head>keywords</head><item><term>Block design</term></item><item><term>Correlated errors</term></item><item><term>Efficient design</term></item><item><term>Neighbour balance</term></item><item><term>Universal optimality</term></item><item><term>Weighted least-squares</term></item></list></keywords></textClass></profileDesc><revisionDesc><change when="1987-12">Published</change><change xml:id="refBibs-istex" who="#ISTEX-API" when="2016-12-22">References added</change></revisionDesc></teiHeader></istex:fulltextTEI><json:item><extension>txt</extension><original>false</original><mimetype>text/plain</mimetype><uri>https://api.istex.fr/document/B655B1039E3A4D6BFACE924810D82C2BD20E6F97/fulltext/txt</uri></json:item></fulltext><metadata><istex:metadataXml wicri:clean="corpus oup" wicri:toSee="no header"><istex:docType PUBLIC="-//NLM//DTD Journal Publishing DTD v2.3 20070202//EN" URI="journalpublishing.dtd" name="istex:docType"></istex:docType><istex:document><article article-type="research-article"><front><journal-meta><journal-id journal-id-type="hwp">biomet</journal-id><journal-id journal-id-type="publisher-id">biomet</journal-id><journal-id journal-id-type="pmc">biomet</journal-id><journal-title>Biometrika</journal-title><issn pub-type="epub">1464-3510</issn><issn pub-type="ppub">0006-3444</issn><publisher><publisher-name>Oxford University Press</publisher-name></publisher></journal-meta><article-meta><article-id pub-id-type="doi">10.1093/biomet/74.4.717</article-id><article-id pub-id-type="publisher-id">74.4.717</article-id><article-categories><subj-group><subject>Articles</subject></subj-group></article-categories><title-group><article-title>Neighbour balanced block designs for correlated errors</article-title></title-group><contrib-group><contrib contrib-type="author"><name><surname>KUNERT</surname><given-names>JOACHIM</given-names></name></contrib><aff><institution>Fachbereich IV-Mathematik/Statistik, Universität Trier</institution> <addr-line>D-5500 Trier, Federal Republic of Germany</addr-line></aff></contrib-group><pub-date pub-type="ppub"><month>12</month><year>1987</year></pub-date><volume>74</volume><issue>4</issue><fpage>717</fpage><lpage>724</lpage><history><date date-type="received"><month>4</month><year>1986</year></date><date date-type="rev-recd"><month>2</month><year>1987</year></date></history><copyright-statement>© 1987 Biometrika Trust</copyright-statement><copyright-year>1987</copyright-year><abstract><p>The paper considers a simple block model and assumes that the errors within the blocks are correlated, following a stationary first-order autoregressive process. Gill & Shukla (1985) consider this model, but they restrict the set of the competing designs to a small subset of the possible designs, the binary and equireplicate designs. In the present paper we show that the designs determined by Gill & Shukla are optimal over all possible designs for positive correlations and that neighbour balanced designs in general are highly efficient.</p></abstract><kwd-group><kwd>Block design</kwd><kwd>Correlated errors</kwd><kwd>Efficient design</kwd><kwd>Neighbour balance</kwd><kwd>Universal optimality</kwd><kwd>Weighted least-squares</kwd></kwd-group></article-meta></front></article></istex:document></istex:metadataXml><mods version="3.6"><titleInfo><title>Neighbour balanced block designs for correlated errors</title></titleInfo><titleInfo type="alternative" contentType="CDATA"><title>Neighbour balanced block designs for correlated errors</title></titleInfo><name type="personal"><namePart type="given">JOACHIM</namePart><namePart type="family">KUNERT</namePart><affiliation>Fachbereich IV-Mathematik/Statistik, Universität Trier, D-5500 Trier, Federal Republic of Germany</affiliation></name><typeOfResource>text</typeOfResource><genre type="research-article" displayLabel="research-article"></genre><subject><topic>Articles</topic></subject><originInfo><publisher>Oxford University Press</publisher><dateIssued encoding="w3cdtf">1987-12</dateIssued><copyrightDate encoding="w3cdtf">1987</copyrightDate></originInfo><physicalDescription><internetMediaType>text/html</internetMediaType></physicalDescription><abstract>The paper considers a simple block model and assumes that the errors within the blocks are correlated, following a stationary first-order autoregressive process. 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In the present paper we show that the designs determined by Gill & Shukla are optimal over all possible designs for positive correlations and that neighbour balanced designs in general are highly efficient.</abstract><subject><genre>keywords</genre><topic>Block design</topic><topic>Correlated errors</topic><topic>Efficient design</topic><topic>Neighbour balance</topic><topic>Universal optimality</topic><topic>Weighted least-squares</topic></subject><relatedItem type="host"><titleInfo><title>Biometrika</title></titleInfo><genre type="journal">journal</genre><identifier type="ISSN">0006-3444</identifier><identifier type="eISSN">1464-3510</identifier><identifier type="PublisherID">biomet</identifier><identifier type="PublisherID-hwp">biomet</identifier><part><date>1987</date><detail type="volume"><caption>vol.</caption><number>74</number></detail><detail type="issue"><caption>no.</caption><number>4</number></detail><extent unit="pages"><start>717</start><end>724</end></extent></part></relatedItem><identifier type="istex">B655B1039E3A4D6BFACE924810D82C2BD20E6F97</identifier><identifier type="DOI">10.1093/biomet/74.4.717</identifier><identifier type="ArticleID">74.4.717</identifier><accessCondition type="use and reproduction" contentType="copyright">© 1987 Biometrika Trust</accessCondition><recordInfo><recordContentSource>OUP</recordContentSource></recordInfo></mods></metadata><annexes><json:item><extension>pdf</extension><original>true</original><mimetype>application/pdf</mimetype><uri>https://api.istex.fr/document/B655B1039E3A4D6BFACE924810D82C2BD20E6F97/annexes/pdf</uri></json:item></annexes><serie></serie></istex></record>Pour manipuler ce document sous Unix (Dilib)
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