There are close relations between tripartite tensors with bounded geometric ranks and linear determinantal varieties with bounded codimensions. We study linear determinantal varieties with bounded codimensions, and prove upper bounds of the dimensions of the ambient spaces. Using those results, we classify tensors with geometric rank 3, find upper bounds of multilinear ranks of primitive tensors with geometric rank 4, and prove the existence of such upper bounds in general. We extend results of tripartite tensors to n-part tensors, showing the equivalence between geometric rank 1 and partition rank 1
Let X ⊂ P r be an integral and non-degenerate variety. We study when a finite set ...
AbstractWe study the generic and typical ranks of 3-tensors of dimension l×m×n using results from ma...
Let $U$, $V$ and $W$ be finite dimensional vector spaces over the same field. The rank of a tensor $...
This is a survey primarily about determining the border rank of tensors, especially those relevant f...
AbstractThe border rank of a nondegenerate m×n×(mn−q) tensor over the complex field is mn−q provided...
Tensors, or multi-linear forms, are important objects in a variety of areas from analytics, to combi...
AbstractUpper bounds on the typical rank R(n, m, l) of tensors ( = maximal border rank = rank of alm...
AbstractThe typical rank (= maximal border rank) of tensors of a given size and the set of optimal b...
The tensor rank of a tensor is the smallest number r such that the tensor can be decomposed as a sum...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
In this article, I will first give a criterion for a generic m × n × n tensor to have rank n using s...
Let U, V and W be finite dimensional vector spaces over the same field. The rank of a tensor t in U?...
AbstractWe consider subvarieties of determinantal varieties determined by an additional rank equatio...
We prove that the slice rank of a 3-tensor (a combinatorial notion introduced by Tao in the context ...
AbstractA classical unsolved problem of projective geometry is that of finding the dimensions of all...
Let X ⊂ P r be an integral and non-degenerate variety. We study when a finite set ...
AbstractWe study the generic and typical ranks of 3-tensors of dimension l×m×n using results from ma...
Let $U$, $V$ and $W$ be finite dimensional vector spaces over the same field. The rank of a tensor $...
This is a survey primarily about determining the border rank of tensors, especially those relevant f...
AbstractThe border rank of a nondegenerate m×n×(mn−q) tensor over the complex field is mn−q provided...
Tensors, or multi-linear forms, are important objects in a variety of areas from analytics, to combi...
AbstractUpper bounds on the typical rank R(n, m, l) of tensors ( = maximal border rank = rank of alm...
AbstractThe typical rank (= maximal border rank) of tensors of a given size and the set of optimal b...
The tensor rank of a tensor is the smallest number r such that the tensor can be decomposed as a sum...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
In this article, I will first give a criterion for a generic m × n × n tensor to have rank n using s...
Let U, V and W be finite dimensional vector spaces over the same field. The rank of a tensor t in U?...
AbstractWe consider subvarieties of determinantal varieties determined by an additional rank equatio...
We prove that the slice rank of a 3-tensor (a combinatorial notion introduced by Tao in the context ...
AbstractA classical unsolved problem of projective geometry is that of finding the dimensions of all...
Let X ⊂ P r be an integral and non-degenerate variety. We study when a finite set ...
AbstractWe study the generic and typical ranks of 3-tensors of dimension l×m×n using results from ma...
Let $U$, $V$ and $W$ be finite dimensional vector spaces over the same field. The rank of a tensor $...