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- Procrustes_analysis abstract "In statistics, Procrustes analysis is a form of statistical shape analysis used to analyse the distribution of a set of shapes. The name Procrustes (Greek: Προκρούστης) refers to a bandit from Greek mythology who made his victims fit his bed either by stretching their limbs or cutting them off.To compare the shapes of two or more objects, the objects must be first optimally \"superimposed\". Procrustes superimposition (PS) is performed by optimally translating, rotating and uniformly scaling the objects. In other words, both the placement in space and the size of the objects are freely adjusted. The aim is to obtain a similar placement and size, by minimizing a measure of shape difference called the Procrustes distance between the objects. This is sometimes called full, as opposed to partial PS, in which scaling is not performed (i.e. the size of the objects is preserved). Notice that, after full PS, the objects will exactly coincide if their shape is identical. For instance, with full PS two spheres with different radius will always coincide, because they have exactly the same shape. Conversely, with partial PS they will never coincide. This implies that, by the strict definition of the term shape in geometry, shape analysis should be performed using full PS. A statistical analysis based on partial PS is not a pure shape analysis as it is not only sensitive to shape differences, but also to size differences. Both full and partial PS will never manage to perfectly match two objects with different shape, such as a cube and a sphere, or a right hand and a left hand.In some cases, both full and partial PS may also include reflection. Reflection allows, for instance, a successful (possibly perfect) superimposition of a right hand to a left hand. Thus, partial PS with reflection enabled preserves size but allows translation, rotation and reflection, while full PS with reflection enabled allows translation, rotation, scaling and reflection.In mathematics: an orthogonal Procrustes problem is a method which can be used to find out the optimal rotation and/or reflection (i.e., the optimal orthogonal linear transformation) for the PS of an object with respect to another. a constrained orthogonal Procrustes problem, subject to det(R) = 1 (where R is a rotation matrix), is a method which can be used to determine the optimal rotation for the PS of an object with respect to another (reflection is not allowed). In some contexts, this method is called the Kabsch algorithm.Optimal translation and scaling are determined with much simpler operations (see below).When a shape is compared to another, or a set of shapes is compared to an arbitrarily selected reference shape, Procrustes analysis is sometimes further qualified as classical or ordinary, as opposed to Generalized Procrustes analysis (GPA), which compares three or more shapes to an optimally determined \"mean shape\".".
- Procrustes_analysis wikiPageExternalLink itoweb.petitjean.shape.html.
- Procrustes_analysis wikiPageID "3680074".
- Procrustes_analysis wikiPageLength "11329".
- Procrustes_analysis wikiPageOutDegree "46".
- Procrustes_analysis wikiPageRevisionID "691552068".
- Procrustes_analysis wikiPageWikiLink Active_shape_model.
- Procrustes_analysis wikiPageWikiLink Alignments_of_random_points.
- Procrustes_analysis wikiPageWikiLink Biological_data.
- Procrustes_analysis wikiPageWikiLink Biometrics.
- Procrustes_analysis wikiPageWikiLink Category:Biometrics.
- Procrustes_analysis wikiPageWikiLink Category:Euclidean_symmetries.
- Procrustes_analysis wikiPageWikiLink Category:Multivariate_statistics.
- Procrustes_analysis wikiPageWikiLink Centroid.
- Procrustes_analysis wikiPageWikiLink David_George_Kendall.
- Procrustes_analysis wikiPageWikiLink Determinant.
- Procrustes_analysis wikiPageWikiLink Equivalence_class.
- Procrustes_analysis wikiPageWikiLink Generalized_Procrustes_analysis.
- Procrustes_analysis wikiPageWikiLink Geometry.
- Procrustes_analysis wikiPageWikiLink Image_registration.
- Procrustes_analysis wikiPageWikiLink Kabsch_algorithm.
- Procrustes_analysis wikiPageWikiLink Kent_distribution.
- Procrustes_analysis wikiPageWikiLink Landmark_point.
- Procrustes_analysis wikiPageWikiLink Least_squares.
- Procrustes_analysis wikiPageWikiLink Manifold.
- Procrustes_analysis wikiPageWikiLink Mean.
- Procrustes_analysis wikiPageWikiLink Menhir.
- Procrustes_analysis wikiPageWikiLink Morphometrics.
- Procrustes_analysis wikiPageWikiLink Orientation_(geometry).
- Procrustes_analysis wikiPageWikiLink Orthogonal_Procrustes_problem.
- Procrustes_analysis wikiPageWikiLink Procrustes.
- Procrustes_analysis wikiPageWikiLink Reflection_(mathematics).
- Procrustes_analysis wikiPageWikiLink Root_mean_square.
- Procrustes_analysis wikiPageWikiLink Rotation_(mathematics).
- Procrustes_analysis wikiPageWikiLink Rotation_matrix.
- Procrustes_analysis wikiPageWikiLink Scaling_(geometry).
- Procrustes_analysis wikiPageWikiLink Shape.
- Procrustes_analysis wikiPageWikiLink Singular_value_decomposition.
- Procrustes_analysis wikiPageWikiLink Statistical_shape_analysis.
- Procrustes_analysis wikiPageWikiLink Statistics.
- Procrustes_analysis wikiPageWikiLink Translation_(geometry).
- Procrustes_analysis wikiPageWikiLinkText "Procrustes analysis".
- Procrustes_analysis wikiPageUsesTemplate Template:Commons_category.
- Procrustes_analysis wikiPageUsesTemplate Template:Lang-el.
- Procrustes_analysis wikiPageUsesTemplate Template:Main.
- Procrustes_analysis wikiPageUsesTemplate Template:Reflist.
- Procrustes_analysis subject Category:Biometrics.
- Procrustes_analysis subject Category:Euclidean_symmetries.
- Procrustes_analysis subject Category:Multivariate_statistics.
- Procrustes_analysis hypernym Form.
- Procrustes_analysis type Document.
- Procrustes_analysis type Type.
- Procrustes_analysis type Biometric.
- Procrustes_analysis type Discipline.
- Procrustes_analysis type Document.
- Procrustes_analysis type Function.
- Procrustes_analysis type Method.
- Procrustes_analysis type Type.
- Procrustes_analysis comment "In statistics, Procrustes analysis is a form of statistical shape analysis used to analyse the distribution of a set of shapes. The name Procrustes (Greek: Προκρούστης) refers to a bandit from Greek mythology who made his victims fit his bed either by stretching their limbs or cutting them off.To compare the shapes of two or more objects, the objects must be first optimally \"superimposed\".".
- Procrustes_analysis label "Procrustes analysis".
- Procrustes_analysis sameAs Q2845240.
- Procrustes_analysis sameAs Análisis_de_Procrustes.
- Procrustes_analysis sameAs Analyse_procustéenne.
- Procrustes_analysis sameAs m.09v2fr.
- Procrustes_analysis sameAs Q2845240.
- Procrustes_analysis wasDerivedFrom Procrustes_analysis?oldid=691552068.
- Procrustes_analysis isPrimaryTopicOf Procrustes_analysis.