Multivariate isotonic regression and its algorithms
We use regression functions, which are the means of random variables, to interpret statistical inference. Often an order is imposed on the values of the regression function. Thus, we refer to the regression as an order restricted regression or an isotonic regression. In this paper we explain how to...
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Wichita State University
2010
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ndltd-WICHITA-oai-soar.wichita.edu-10057-24272013-04-19T21:00:01ZMultivariate isotonic regression and its algorithmsHoffmann, LindaWe use regression functions, which are the means of random variables, to interpret statistical inference. Often an order is imposed on the values of the regression function. Thus, we refer to the regression as an order restricted regression or an isotonic regression. In this paper we explain how to calculate multivariate isotonic regression. However, we investigate the case for a particular restriction on our elements. We impose relations between elements of the same row but not between rows. The technique is to decompose our multivariate model into univariate models so that prior knowledge about the simpler case can be used. Finally, we propose an algorithm to calculate multivariate isotonic regression. This algorithm could then be converted into a computer program.Thesis (M.S.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics and StatisticsWichita State UniversityHu, Xiaomi2010-05-03T18:54:30Z2010-05-03T18:54:30Z2009-05Thesisvi, 29 p.207382 bytesapplication/pdft09021http://hdl.handle.net/10057/2427en_US |
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NDLTD |
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en_US |
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Others
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NDLTD |
| description |
We use regression functions, which are the means of random variables, to interpret statistical inference. Often an order is imposed on the values of the regression function. Thus,
we refer to the regression as an order restricted regression or an isotonic regression. In this
paper we explain how to calculate multivariate isotonic regression. However, we investigate
the case for a particular restriction on our elements. We impose relations between elements of
the same row but not between rows. The technique is to decompose our multivariate model
into univariate models so that prior knowledge about the simpler case can be used. Finally,
we propose an algorithm to calculate multivariate isotonic regression. This algorithm could
then be converted into a computer program. === Thesis (M.S.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics and Statistics |
| author2 |
Hu, Xiaomi |
| author_facet |
Hu, Xiaomi Hoffmann, Linda |
| author |
Hoffmann, Linda |
| spellingShingle |
Hoffmann, Linda Multivariate isotonic regression and its algorithms |
| author_sort |
Hoffmann, Linda |
| title |
Multivariate isotonic regression and its algorithms |
| title_short |
Multivariate isotonic regression and its algorithms |
| title_full |
Multivariate isotonic regression and its algorithms |
| title_fullStr |
Multivariate isotonic regression and its algorithms |
| title_full_unstemmed |
Multivariate isotonic regression and its algorithms |
| title_sort |
multivariate isotonic regression and its algorithms |
| publisher |
Wichita State University |
| publishDate |
2010 |
| url |
http://hdl.handle.net/10057/2427 |
| work_keys_str_mv |
AT hoffmannlinda multivariateisotonicregressionanditsalgorithms |
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1716583063033479168 |