Add to ORKGMatrix rank is multiplicative under the Kronecker product, additive under the direct sum, normalised on identity matrices and non-increasing under multiplying from the left and from the right by any matrices. It is the only real matrix parameter with these properties. Strassen studied the tensor extension: find all maps from k-tensors to the reals that are multiplicative under the tensor Kronecker product, additive under the direct sum, normalised on "identity tensors", and non-increasing under acting with linear maps on the k tensor factors. These maps form the "asymptotic spectrum of k-tensors" and capture the asymptotic relations among tensors, including the asymptotic tensor rank. We give the first explicit construction of an infinite f...
We answer a question, posed implicitly in [18, §11], [11, Rem. 15.44] and explicitly in [9, Problem ...
International audienceKronecker coefficients encode the tensor products of complex irreducible repre...
In this thesis, we use algebraic-geometric and combinatorial techniques to study tensor decompositio...
textabstractWe present an upper bound on the exponent of the asymptotic behaviour of the tensor ran...
We present an upper bound on the exponent of the asymptotic behaviour of the tensor rank of a family...
Understanding the properties of objects under a natural product operation is a central theme in math...
The asymptotic restriction problem for tensors s and t is to find the smallest β ≥ 0 such that the n...
We introduce a method for transforming low-order tensors into higher-order tensors and apply it to t...
We present a polynomial time algorithm to approximately scale tensors of any format to arbitrary pre...
We develop and apply new combinatorial and algebraic tools to understand multiparty communication co...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
The slice-rank method, introduced by Tao as a symmetrized version of the polynomial method of Croot,...
The counting of the dimension of the space of $U(N) \times U(N) \times U(N)$ polynomial invariants o...
We study tensor networks as a model of arithmetic computation for evaluating multilinear maps. These...
We introduce probabilistic extensions of classical deterministic measures of algebraic complexity of...
We answer a question, posed implicitly in [18, §11], [11, Rem. 15.44] and explicitly in [9, Problem ...
International audienceKronecker coefficients encode the tensor products of complex irreducible repre...
In this thesis, we use algebraic-geometric and combinatorial techniques to study tensor decompositio...
textabstractWe present an upper bound on the exponent of the asymptotic behaviour of the tensor ran...
We present an upper bound on the exponent of the asymptotic behaviour of the tensor rank of a family...
Understanding the properties of objects under a natural product operation is a central theme in math...
The asymptotic restriction problem for tensors s and t is to find the smallest β ≥ 0 such that the n...
We introduce a method for transforming low-order tensors into higher-order tensors and apply it to t...
We present a polynomial time algorithm to approximately scale tensors of any format to arbitrary pre...
We develop and apply new combinatorial and algebraic tools to understand multiparty communication co...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
The slice-rank method, introduced by Tao as a symmetrized version of the polynomial method of Croot,...
The counting of the dimension of the space of $U(N) \times U(N) \times U(N)$ polynomial invariants o...
We study tensor networks as a model of arithmetic computation for evaluating multilinear maps. These...
We introduce probabilistic extensions of classical deterministic measures of algebraic complexity of...
We answer a question, posed implicitly in [18, §11], [11, Rem. 15.44] and explicitly in [9, Problem ...
International audienceKronecker coefficients encode the tensor products of complex irreducible repre...
In this thesis, we use algebraic-geometric and combinatorial techniques to study tensor decompositio...