AbstractThe concept of tensor rank was introduced in the 20s. In the 70s, when methods of Component Analysis on arrays with more than two indices became popular, tensor rank became a much studied topic. The generic rank may be seen as an upper bound to the number of factors that are needed to construct a random tensor. We explain in this paper how to obtain numerically in the complex field the generic rank of tensors of arbitrary dimensions, based on Terracini’s lemma, and compare it with the algebraic results already known in the real or complex fields. In particular, we examine the cases of symmetric tensors, tensors with symmetric matrix slices, complex tensors enjoying Hermitian symmetries, or merely tensors with free entries
AbstractThe typical 3-tensorial rank has been much studied over algebraically closed fields, but ver...
AbstractA peculiar property of three-way arrays is that the rank they typically have does not necess...
AbstractUpper bounds on the typical rank R(n, m, l) of tensors ( = maximal border rank = rank of alm...
International audienceThe concept of tensor rank was introduced in the twenties. In the seventies, w...
The concept of tensor rank was introduced in the 1920s. In the 1970s, when methods of Component Anal...
International audienceThe concept of tensor rank, introduced in the twenties, has been popularized a...
AbstractWe study the generic and typical ranks of 3-tensors of dimension l×m×n using results from ma...
This master's thesis addresses numerical methods of computing the typical ranks of tensors over the ...
This book provides comprehensive summaries of theoretical (algebraic) and computational aspects of t...
We introduce various notions of rank for a high order symmetric tensor taking values over the comple...
AbstractThe typical rank (= maximal border rank) of tensors of a given size and the set of optimal b...
Tensors, or multi-linear forms, are important objects in a variety of areas from analytics, to combi...
Multidimensional data, or tensors, arise natura lly in data analysis applications. Hitchcock&##39;s ...
We propose a new sufficient condition for verifying whether general rank-r complex tensors of arbitr...
In this work we study different notions of ranks and approximation of tensors. We consider the tenso...
AbstractThe typical 3-tensorial rank has been much studied over algebraically closed fields, but ver...
AbstractA peculiar property of three-way arrays is that the rank they typically have does not necess...
AbstractUpper bounds on the typical rank R(n, m, l) of tensors ( = maximal border rank = rank of alm...
International audienceThe concept of tensor rank was introduced in the twenties. In the seventies, w...
The concept of tensor rank was introduced in the 1920s. In the 1970s, when methods of Component Anal...
International audienceThe concept of tensor rank, introduced in the twenties, has been popularized a...
AbstractWe study the generic and typical ranks of 3-tensors of dimension l×m×n using results from ma...
This master's thesis addresses numerical methods of computing the typical ranks of tensors over the ...
This book provides comprehensive summaries of theoretical (algebraic) and computational aspects of t...
We introduce various notions of rank for a high order symmetric tensor taking values over the comple...
AbstractThe typical rank (= maximal border rank) of tensors of a given size and the set of optimal b...
Tensors, or multi-linear forms, are important objects in a variety of areas from analytics, to combi...
Multidimensional data, or tensors, arise natura lly in data analysis applications. Hitchcock&##39;s ...
We propose a new sufficient condition for verifying whether general rank-r complex tensors of arbitr...
In this work we study different notions of ranks and approximation of tensors. We consider the tenso...
AbstractThe typical 3-tensorial rank has been much studied over algebraically closed fields, but ver...
AbstractA peculiar property of three-way arrays is that the rank they typically have does not necess...
AbstractUpper bounds on the typical rank R(n, m, l) of tensors ( = maximal border rank = rank of alm...