Simplical depth estimators and tests in examples from shape analysis
Authors | |
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Year of publication | 2008 |
Type | Article in Periodical |
Magazine / Source | Tatra Mountains Mathematical Publications |
MU Faculty or unit | |
Citation | |
Web | http://tatra.mat.savba.sk/ |
Field | Applied statistics, operation research |
Keywords | simplicial depth; maximum depth estimator; distribution-free tests; one-sample tests; two-sample tests; shape analysis; allometry |
Attached files | |
Description | In this paper we present the maximum simplicial depth estimator and compare it to the ordinary least square estimator in examples from 2D and 3D shape analysis focusing on bivariate and multivariate allometrical problems from zoology and biological anthropology. We compare two types of estimators derived under different subsets of parametric space on the basis of the linear regression model, theta = (theta1, theta2)T in R2 and theta = (theta1, theta2, theta3)T in R3, where theta3 = 0. We also discuss monotonically decreasing linear regression models in special situations. In applications where outliers in x- or y-axis direction occur in the data and residuals from ordinary least-square linear regression model are not normally distributed, we recommend the use of the maximum simplicial depth estimators. |
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