The asymptotic restriction problem for tensors s and t is to find the smallest β ≥ 0 such that the nth tensor power of t can be obtained from the (β n+o(n))th tensor power of s by applying linear maps to the tensor legs — this is called restriction — when n goes to infinity. Applications include computing the arithmetic complexity of matrix multiplication in algebraic complexity theory, deciding the feasibility of an asymptotic transformation between pure quantum states via stochastic local operations and classical communication in quantum information theory, bounding the query complexity of certain properties in algebraic property testing, and bounding the size of combinatorial structures like tri-colored sum-free sets in additive combinat...
In this paper we introduce a new method to produce lower bounds for the Waring rank of symmetric ten...
We analyze rates of approximation by quantized, tensor-structured representations of functions with ...
The counting of the dimension of the space of $U(N) \times U(N) \times U(N)$ polynomial invariants o...
textabstractThe asymptotic restriction problem for tensors s and t is to find the smallest ≥ 0 such ...
Matrix rank is multiplicative under the Kronecker product, additive under the direct sum, normalised...
Understanding the properties of objects under a natural product operation is a central theme in math...
We develop and apply new combinatorial and algebraic tools to understand multiparty communication co...
We present a polynomial time algorithm to approximately scale tensors of any format to arbitrary pre...
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...
We introduce a method for transforming low-order tensors into higher-order tensors and apply it to t...
The slice-rank method, introduced by Tao as a symmetrized version of the polynomial method of Croot,...
We make a first geometric study of three varieties in Cm⊗ Cm⊗ Cm (for each m), including the Zariski...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
Tensor parameters that are amortized or regularized over large tensor powers, often called "asymptot...
In this paper we introduce a new method to produce lower bounds for the Waring rank of symmetric ten...
We analyze rates of approximation by quantized, tensor-structured representations of functions with ...
The counting of the dimension of the space of $U(N) \times U(N) \times U(N)$ polynomial invariants o...
textabstractThe asymptotic restriction problem for tensors s and t is to find the smallest ≥ 0 such ...
Matrix rank is multiplicative under the Kronecker product, additive under the direct sum, normalised...
Understanding the properties of objects under a natural product operation is a central theme in math...
We develop and apply new combinatorial and algebraic tools to understand multiparty communication co...
We present a polynomial time algorithm to approximately scale tensors of any format to arbitrary pre...
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...
We introduce a method for transforming low-order tensors into higher-order tensors and apply it to t...
The slice-rank method, introduced by Tao as a symmetrized version of the polynomial method of Croot,...
We make a first geometric study of three varieties in Cm⊗ Cm⊗ Cm (for each m), including the Zariski...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
Tensor parameters that are amortized or regularized over large tensor powers, often called "asymptot...
In this paper we introduce a new method to produce lower bounds for the Waring rank of symmetric ten...
We analyze rates of approximation by quantized, tensor-structured representations of functions with ...
The counting of the dimension of the space of $U(N) \times U(N) \times U(N)$ polynomial invariants o...