Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out to count the rank-one tensors that are critical points of the distance function to a general tensor v. As this count depends on v, we average over v drawn from a Gaussian distribution, and find formulas that relates this average to problems in random matrix theory
Joint work with Jan Draisma and Giorgio Ottaviani. Given a tensor f in a Euclidean tensor space, we ...
We provide new upper and lower bounds on the minimum possible ratio of the spectral and Frobenius no...
Given a tensor f in a Euclidean tensor space, we are interested in the critical points of the distan...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
\u3cp\u3eMotivated by the many potential applications of low-rank multi-way tensor approximations, w...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Given a tensor f in a Euclidean tensor space, we are interested in the critical points of the distan...
Joint work with Jan Draisma and Giorgio Ottaviani. Given a tensor f in a Euclidean tensor space, we ...
\u3cp\u3eGiven a tensor f in a Euclidean tensor space, we are interested in the critical points of t...
Joint work with Jan Draisma and Giorgio Ottaviani. Given a tensor f in a Euclidean tensor space, we ...
We provide new upper and lower bounds on the minimum possible ratio of the spectral and Frobenius no...
Given a tensor f in a Euclidean tensor space, we are interested in the critical points of the distan...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
\u3cp\u3eMotivated by the many potential applications of low-rank multi-way tensor approximations, w...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Motivated by the many potential applications of low-rank multi-way tensor approximations, we set out...
Given a tensor f in a Euclidean tensor space, we are interested in the critical points of the distan...
Joint work with Jan Draisma and Giorgio Ottaviani. Given a tensor f in a Euclidean tensor space, we ...
\u3cp\u3eGiven a tensor f in a Euclidean tensor space, we are interested in the critical points of t...
Joint work with Jan Draisma and Giorgio Ottaviani. Given a tensor f in a Euclidean tensor space, we ...
We provide new upper and lower bounds on the minimum possible ratio of the spectral and Frobenius no...
Given a tensor f in a Euclidean tensor space, we are interested in the critical points of the distan...
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