We present an upper bound on the exponent of the asymptotic behaviour of the tensor rank of a family of tensors defined by the complete graph on k vertices. For k≥ 4 , we show that the exponent per edge is at most 0.77, outperforming the best known upper bound on the exponent per edge for matrix multiplication (k = 3), which is approximately 0.79. We raise the question whether for some k the exponent per edge can be below 2/3, i.e. can outperform matrix multiplication even if the matrix multiplication exponent equals 2. In order to obtain our results, we generalize to higher-order tensors a result by Strassen on the asymptotic subrank of tight tensors and a result by Coppersmith and Winograd on the asymptotic rank of matrix multiplication. ...
In this paper, we give a survey of the known results concerning the tensor rank of the multiplicatio...
| openaire: EC/H2020/748354/EU//NonnegativeRankWe study tensor networks as a model of arithmetic com...
We answer a question, posed implicitly in [18, §11], [11, Rem. 15.44] and explicitly in [9, Problem ...
We present an upper bound on the exponent of the asymptotic behaviour of the tensor rank of a family...
textabstractWe present an upper bound on the exponent of the asymptotic behaviour of the tensor ran...
We introduce a method for transforming low-order tensors into higher-order tensors and apply it to t...
Matrix rank is multiplicative under the Kronecker product, additive under the direct sum, normalised...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
The slice-rank method, introduced by Tao as a symmetrized version of the polynomial method of Croot,...
The tensor rank of a tensor is the smallest number r such that the tensor can be decomposed as a sum...
We prove that the border rank of the Kronecker square of the little Coppersmith–Winograd tensor Tcw,...
We introduce probabilistic extensions of classical deterministic measures of algebraic complexity of...
The asymptotic restriction problem for tensors s and t is to find the smallest β ≥ 0 such that the n...
We develop and apply new combinatorial and algebraic tools to understand multiparty communication co...
In this paper, we give a survey of the known results concerning the tensor rank of the multiplicatio...
| openaire: EC/H2020/748354/EU//NonnegativeRankWe study tensor networks as a model of arithmetic com...
We answer a question, posed implicitly in [18, §11], [11, Rem. 15.44] and explicitly in [9, Problem ...
We present an upper bound on the exponent of the asymptotic behaviour of the tensor rank of a family...
textabstractWe present an upper bound on the exponent of the asymptotic behaviour of the tensor ran...
We introduce a method for transforming low-order tensors into higher-order tensors and apply it to t...
Matrix rank is multiplicative under the Kronecker product, additive under the direct sum, normalised...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
The slice-rank method, introduced by Tao as a symmetrized version of the polynomial method of Croot,...
The tensor rank of a tensor is the smallest number r such that the tensor can be decomposed as a sum...
We prove that the border rank of the Kronecker square of the little Coppersmith–Winograd tensor Tcw,...
We introduce probabilistic extensions of classical deterministic measures of algebraic complexity of...
The asymptotic restriction problem for tensors s and t is to find the smallest β ≥ 0 such that the n...
We develop and apply new combinatorial and algebraic tools to understand multiparty communication co...
In this paper, we give a survey of the known results concerning the tensor rank of the multiplicatio...
| openaire: EC/H2020/748354/EU//NonnegativeRankWe study tensor networks as a model of arithmetic com...
We answer a question, posed implicitly in [18, §11], [11, Rem. 15.44] and explicitly in [9, Problem ...