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Euclidean distance degree and the multiview conjecture

2019-04-25 15:00

报告人: Laurentiu G. Maxim 【University of Wisconsin–Madison】

报告人单位:

时间: 2019-04-25 15:00-15:00

地点: 卫津路校区6号楼108教

开始时间: 2019-04-25 15:00-15:00

报告人简介:

年:

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报告人简介

Professor of University of Wisconsin–Madison

报告内容介绍

 
      The Euclidean distance degree of an algebraic variety is a well-studied topic in applied algebra and geometry, with direct applications in geometric modeling, computer vision, and statistics. I will first describe a new topological interpretation of the Euclidean distance degree of an affine variety in terms of weighted Euler characteristics. As a concrete application, I will present a solution to the open problem in computer vision of determining the Euclidean distance degree of the affine multiview variety. Secondly, I will present a solution to a conjecture of Aluffi-Harris concerning the Euclidean distance degree of projective varieties. Projective varieties appear naturally in low rank matrix approximation, formation shape control, and all across algebraic statistics. (Joint work with J. Rodriguez and B. Wang.)


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