This is a survey primarily about determining the border rank of tensors, especially those relevant for the study of the complexity of matrix multiplication. This is a subject that on the one hand is of great significance in theoretical computer science, and on the other hand touches on many beautiful topics in algebraic geometry such as classical and recent results on equations for secant varieties (e.g., via vector bundle and representation-theoretic methods) and the geometry and deformation theory of zero dimensional schemes
Let $X^{(n,m)}_{(1,d)}$ denote the Segre-Veronese embedding of $\mathbb{P}^n \times \mathbb{P}^m$ v...
There are close relations between tripartite tensors with bounded geometric ranks and linear determi...
Abstract. This paper studies the dimension of secant varieties to Segre va-rieties. The problem is c...
This is a survey primarily about determining the border rank of tensors, especially those relevant f...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
AbstractA classical unsolved problem of projective geometry is that of finding the dimensions of all...
The study of the ranks and border ranks of tensors is an active area of research. By the example of ...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
We consider here the problem, which is quite classical in Algebraic Geometry, of studying the secant...
A classical unsolved problem of projective geometry is that of finding the dimensions of all the (hi...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
This thesis is divided into two parts, each part exploring a different topic within the general area...
AbstractThe action of commutativity and approximation is analyzed for some problems in Computational...
Let $X^{(n,m)}_{(1,d)}$ denote the Segre-Veronese embedding of $\mathbb{P}^n \times \mathbb{P}^m$ v...
There are close relations between tripartite tensors with bounded geometric ranks and linear determi...
Abstract. This paper studies the dimension of secant varieties to Segre va-rieties. The problem is c...
This is a survey primarily about determining the border rank of tensors, especially those relevant f...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
AbstractA classical unsolved problem of projective geometry is that of finding the dimensions of all...
The study of the ranks and border ranks of tensors is an active area of research. By the example of ...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
We consider here the problem, which is quite classical in Algebraic Geometry, of studying the secant...
A classical unsolved problem of projective geometry is that of finding the dimensions of all the (hi...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
This thesis is divided into two parts, each part exploring a different topic within the general area...
AbstractThe action of commutativity and approximation is analyzed for some problems in Computational...
Let $X^{(n,m)}_{(1,d)}$ denote the Segre-Veronese embedding of $\mathbb{P}^n \times \mathbb{P}^m$ v...
There are close relations between tripartite tensors with bounded geometric ranks and linear determi...
Abstract. This paper studies the dimension of secant varieties to Segre va-rieties. The problem is c...