4,883 research outputs found
Low rank tensor recovery via iterative hard thresholding
We study extensions of compressive sensing and low rank matrix recovery
(matrix completion) to the recovery of low rank tensors of higher order from a
small number of linear measurements. While the theoretical understanding of low
rank matrix recovery is already well-developed, only few contributions on the
low rank tensor recovery problem are available so far. In this paper, we
introduce versions of the iterative hard thresholding algorithm for several
tensor decompositions, namely the higher order singular value decomposition
(HOSVD), the tensor train format (TT), and the general hierarchical Tucker
decomposition (HT). We provide a partial convergence result for these
algorithms which is based on a variant of the restricted isometry property of
the measurement operator adapted to the tensor decomposition at hand that
induces a corresponding notion of tensor rank. We show that subgaussian
measurement ensembles satisfy the tensor restricted isometry property with high
probability under a certain almost optimal bound on the number of measurements
which depends on the corresponding tensor format. These bounds are extended to
partial Fourier maps combined with random sign flips of the tensor entries.
Finally, we illustrate the performance of iterative hard thresholding methods
for tensor recovery via numerical experiments where we consider recovery from
Gaussian random measurements, tensor completion (recovery of missing entries),
and Fourier measurements for third order tensors.Comment: 34 page
Preconditioned low-rank Riemannian optimization for linear systems with tensor product structure
The numerical solution of partial differential equations on high-dimensional
domains gives rise to computationally challenging linear systems. When using
standard discretization techniques, the size of the linear system grows
exponentially with the number of dimensions, making the use of classic
iterative solvers infeasible. During the last few years, low-rank tensor
approaches have been developed that allow to mitigate this curse of
dimensionality by exploiting the underlying structure of the linear operator.
In this work, we focus on tensors represented in the Tucker and tensor train
formats. We propose two preconditioned gradient methods on the corresponding
low-rank tensor manifolds: A Riemannian version of the preconditioned
Richardson method as well as an approximate Newton scheme based on the
Riemannian Hessian. For the latter, considerable attention is given to the
efficient solution of the resulting Newton equation. In numerical experiments,
we compare the efficiency of our Riemannian algorithms with other established
tensor-based approaches such as a truncated preconditioned Richardson method
and the alternating linear scheme. The results show that our approximate
Riemannian Newton scheme is significantly faster in cases when the application
of the linear operator is expensive.Comment: 24 pages, 8 figure
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