Add to ORKGIn this thesis, employing the theory of matrix Lie groups, we develop gradient based flows for the problem of Simultaneous or Joint Diagonalization (JD) of a set of symmetric matrices. This problem has applications in many fields especially in the field of Independent Component Analysis (ICA). We consider both orthogonal and non-orthogonal JD. We view the JD problem as minimization of a common quadric cost function on a matrix group. We derive gradient based flows together with suitable discretizations for minimization of this cost function on the Riemannian manifolds of O(n) and GL(n).\\ We use the developed JD methods to introduce a new class of ICA algorithms that sphere the data, however do not restrict the su...
International audienceThis article addresses the problem of the Non Unitary Joint Block Diagonalizat...
Cette thèse présente de nouveaux algorithmes de diagonalisation conjointe par similitude. Cesalgorit...
A new efficient algorithm is presented for joint diagonalization of several matrices. The algorithm ...
In this thesis, employing the theory of matrix Lie groups, we develop gradient based flows for the p...
We present a new scale-invariant cost function for non-orthogonal joint-diagonalization of a set of ...
Independent Component Analysis is a popular statistical method for separating a multivariate signal ...
5 pagesInternational audienceApproximate Joint Diagonalization (AJD) of a set of symmetric matrices ...
The Joint Diagonalization of a set of matrices by Congruence (JDC) appears in a number of signal pro...
Joint diagonalization of several correlation matrices is a powerful tool for blind signal separation...
Given a family of nearly commuting symmetric matrices, we consider the task of computing an orthogon...
In this thesis, we study the problem of the blind separation of over-determined linear convolutive r...
International audienceIn this paper, we focus on the Joint Diagonalization by Congruence (JDC) decom...
International audienceWe consider the classical problem of approximate joint diagonalization of matr...
Several blind source separation algorithms obtain a separating matrix by computing the congruence tr...
International audience<p>This paper deals with non-orthogonal joint block diagonalization. Two algor...
International audienceThis article addresses the problem of the Non Unitary Joint Block Diagonalizat...
Cette thèse présente de nouveaux algorithmes de diagonalisation conjointe par similitude. Cesalgorit...
A new efficient algorithm is presented for joint diagonalization of several matrices. The algorithm ...
In this thesis, employing the theory of matrix Lie groups, we develop gradient based flows for the p...
We present a new scale-invariant cost function for non-orthogonal joint-diagonalization of a set of ...
Independent Component Analysis is a popular statistical method for separating a multivariate signal ...
5 pagesInternational audienceApproximate Joint Diagonalization (AJD) of a set of symmetric matrices ...
The Joint Diagonalization of a set of matrices by Congruence (JDC) appears in a number of signal pro...
Joint diagonalization of several correlation matrices is a powerful tool for blind signal separation...
Given a family of nearly commuting symmetric matrices, we consider the task of computing an orthogon...
In this thesis, we study the problem of the blind separation of over-determined linear convolutive r...
International audienceIn this paper, we focus on the Joint Diagonalization by Congruence (JDC) decom...
International audienceWe consider the classical problem of approximate joint diagonalization of matr...
Several blind source separation algorithms obtain a separating matrix by computing the congruence tr...
International audience<p>This paper deals with non-orthogonal joint block diagonalization. Two algor...
International audienceThis article addresses the problem of the Non Unitary Joint Block Diagonalizat...
Cette thèse présente de nouveaux algorithmes de diagonalisation conjointe par similitude. Cesalgorit...
A new efficient algorithm is presented for joint diagonalization of several matrices. The algorithm ...