Add to ORKGUpper bounds are given for the maximal rank of an element of the tensor product of three vector spaces
AbstractIf M is a subspace of a tensor product of vector spaces, A ⊕ B, we define r(M) = inf rank x(...
Given a tensor f in a Euclidean tensor space, we are interested in the critical points of the distan...
AbstractLet M be a matrix of order n=pq. Then the tensor rank of M is defined as the minimal possibl...
AbstractUpper bounds are given for the maximal rank of an element of the tensor product of three vec...
AbstractThe problem of obtaining upper bounds on the ranks of third order tensors is studied. New bo...
Let $U$, $V$ and $W$ be finite dimensional vector spaces over the same field. The rank of a tensor $...
We present the state-of-the-art on maximum symmetric tensor rank, for each given dimension and order...
It is shown that the maximal rank of m × n × ( m n - k ) tensors with k min {( m - 1 ) 2 /2 , ( ...
AbstractUpper bounds on the typical rank R(n, m, l) of tensors ( = maximal border rank = rank of alm...
Let U, V and W be finite dimensional vector spaces over the same field. The rank of a tensor t in U?...
The problem of computing the best rank-(p,q,r) approximation of a third order tensor is considered. ...
AbstractThe typical rank (= maximal border rank) of tensors of a given size and the set of optimal b...
\u3cp\u3eGiven a tensor f in a Euclidean tensor space, we are interested in the critical points of t...
AbstractThe main result reads: if a nonsingular matrix A of order n=pq is a tensor-product binomial ...
A new definition of rank for a tensor allows new decompositions for tensor algebras and some propert...
AbstractIf M is a subspace of a tensor product of vector spaces, A ⊕ B, we define r(M) = inf rank x(...
Given a tensor f in a Euclidean tensor space, we are interested in the critical points of the distan...
AbstractLet M be a matrix of order n=pq. Then the tensor rank of M is defined as the minimal possibl...
AbstractUpper bounds are given for the maximal rank of an element of the tensor product of three vec...
AbstractThe problem of obtaining upper bounds on the ranks of third order tensors is studied. New bo...
Let $U$, $V$ and $W$ be finite dimensional vector spaces over the same field. The rank of a tensor $...
We present the state-of-the-art on maximum symmetric tensor rank, for each given dimension and order...
It is shown that the maximal rank of m × n × ( m n - k ) tensors with k min {( m - 1 ) 2 /2 , ( ...
AbstractUpper bounds on the typical rank R(n, m, l) of tensors ( = maximal border rank = rank of alm...
Let U, V and W be finite dimensional vector spaces over the same field. The rank of a tensor t in U?...
The problem of computing the best rank-(p,q,r) approximation of a third order tensor is considered. ...
AbstractThe typical rank (= maximal border rank) of tensors of a given size and the set of optimal b...
\u3cp\u3eGiven a tensor f in a Euclidean tensor space, we are interested in the critical points of t...
AbstractThe main result reads: if a nonsingular matrix A of order n=pq is a tensor-product binomial ...
A new definition of rank for a tensor allows new decompositions for tensor algebras and some propert...
AbstractIf M is a subspace of a tensor product of vector spaces, A ⊕ B, we define r(M) = inf rank x(...
Given a tensor f in a Euclidean tensor space, we are interested in the critical points of the distan...
AbstractLet M be a matrix of order n=pq. Then the tensor rank of M is defined as the minimal possibl...