Tests of Bivariate Stochastic Order
The purpose of this thesis is to compare rank-based tests of bivariate stochastic order. Given two bivariate distributions $F$ and $G$, the general problem we are dealing with is to test $H_0: F=G$ against $H_1:F<G$, where $F$ and $G$ are independent continuous distributions on $\Re ^2$. (``$F<...
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ndltd-LACETR-oai-collectionscanada.gc.ca-OOU.-en#10393-202572013-01-11T13:33:11ZTests of Bivariate Stochastic OrderLiu, Yunfengbivariate stochastic orderKendall statisticSpearman statisticbivariate Mann Whitney Wilcoxon statisticThe purpose of this thesis is to compare rank-based tests of bivariate stochastic order. Given two bivariate distributions $F$ and $G$, the general problem we are dealing with is to test $H_0: F=G$ against $H_1:F<G$, where $F$ and $G$ are independent continuous distributions on $\Re ^2$. (``$F<G$" means that $F(x)\leq G(x)~\forall x\in \Re^2$, and $\exists x\in \Re^2$ such that $F(x)< G(x)$.). In particular, we will analyze three analogues of the one-dimensional Mann-Whitney-Wilcoxon test in two dimensions. Two of the test statistics are new; we call them the Kendall and Spearman statistics. We will then show the asymptotic distributions and carry out empirical comparisons of the Kendall, Spearman and the third two-dimensional Mann-Whitney-Wilcoxon statistics.2011-09-28T20:30:58Z2011-09-28T20:30:58Z20112011-09-28Thèse / Thesishttp://hdl.handle.net/10393/20257en |
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NDLTD |
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en |
| sources |
NDLTD |
| topic |
bivariate stochastic order Kendall statistic Spearman statistic bivariate Mann Whitney Wilcoxon statistic |
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bivariate stochastic order Kendall statistic Spearman statistic bivariate Mann Whitney Wilcoxon statistic Liu, Yunfeng Tests of Bivariate Stochastic Order |
| description |
The purpose of this thesis is to compare rank-based tests of bivariate stochastic order. Given two bivariate distributions $F$ and $G$, the general problem we are dealing with is to test $H_0: F=G$ against $H_1:F<G$, where $F$ and $G$ are independent continuous distributions on $\Re ^2$. (``$F<G$" means that $F(x)\leq G(x)~\forall x\in \Re^2$, and $\exists x\in \Re^2$ such that $F(x)< G(x)$.). In particular, we will analyze three analogues of the one-dimensional Mann-Whitney-Wilcoxon test in two dimensions. Two of the test statistics are new; we call them the Kendall and Spearman statistics. We will then show the asymptotic distributions and carry out empirical comparisons of the Kendall, Spearman and the third two-dimensional Mann-Whitney-Wilcoxon statistics. |
| author |
Liu, Yunfeng |
| author_facet |
Liu, Yunfeng |
| author_sort |
Liu, Yunfeng |
| title |
Tests of Bivariate Stochastic Order |
| title_short |
Tests of Bivariate Stochastic Order |
| title_full |
Tests of Bivariate Stochastic Order |
| title_fullStr |
Tests of Bivariate Stochastic Order |
| title_full_unstemmed |
Tests of Bivariate Stochastic Order |
| title_sort |
tests of bivariate stochastic order |
| publishDate |
2011 |
| url |
http://hdl.handle.net/10393/20257 |
| work_keys_str_mv |
AT liuyunfeng testsofbivariatestochasticorder |
| _version_ |
1716575490797469696 |