Related papers: Persistent Tensors and Multiqudit Entanglement Transformation

Persistent Tensors and Multiqudit Entanglement Transformation

URL: http://arxiv.org/abs/2211.00652v2
Date: Sun, 21 Jan 2024 17:24:42 GMT
Title: Persistent Tensors and Multiqudit Entanglement Transformation
Authors: Masoud Gharahi and Vladimir Lysikov
Abstract summary: We present three specific families of persistent tensors, of which the lower bound is tight. We show that there is a chain of degenerations between these three families of minimal-rank persistent tensors that can be used to study the entanglement between them.
Score: 0.07252027234425334
License: http://creativecommons.org/licenses/by-nc-nd/4.0/
Abstract: We construct a lower bound of the tensor rank for a new class of tensors, which we call persistent tensors. We present three specific families of persistent tensors, of which the lower bound is tight. We show that there is a chain of degenerations between these three families of minimal-rank persistent tensors that can be used to study the entanglement transformation between them. In addition, we show that these three families of persistent tensors are indeed different generalizations of multiqubit $\rm{W}$ states within multiqudit systems and are geometrically in the orbit closure of multiqudit $\rm{GHZ}$ states. Consequently, we show that one can obtain every one of the generalizations of $\rm{W}$ state from a multiqudit $\rm{GHZ}$ state via asymptotic Stochastic Local Operations and Classical Communication (SLOCC) with rate one. Finally, we extend the obtained lower bound of the tensor rank to direct sums with persistent summands and to even more general combinations of tensors, which we call block pyramidal tensors. As a result, we show that the tensor rank is multiplicative under the Kronecker and tensor products of minimal-rank persistent tensors with the $\rm{GHZ}$ tensor.

Related papers

Overcomplete Tensor Decomposition via Koszul-Young Flattenings [63.01248796170617]
We give a new algorithm for decomposing an $n_times n times n_3$ tensor as the sum of a minimal number of rank-1 terms. We show that an even more general class of degree-$d$s cannot surpass rank $Cn$ for a constant $C = C(d)$.
arXiv Detail & Related papers (2024-11-21T17:41:09Z)
Tensor cumulants for statistical inference on invariant distributions [49.80012009682584]
We show that PCA becomes computationally hard at a critical value of the signal's magnitude. We define a new set of objects, which provide an explicit, near-orthogonal basis for invariants of a given degree. It also lets us analyze a new problem of distinguishing between different ensembles.
arXiv Detail & Related papers (2024-04-29T14:33:24Z)
Discreteness of asymptotic tensor ranks [7.916635054977068]
We show that the subrank and the slice rank have no accumulation points, and that over the complex numbers, the slice rank has no accumulation points. Central to our approach are two new general lower bounds on the subrank of tensors, which measures how much a tensor can be diagonalized. Our rely on new lower bounds on the maximum rank in matrix subspaces that are obtained by slicing a three-tensor in the three different directions.
arXiv Detail & Related papers (2023-06-02T17:42:39Z)
Faster Robust Tensor Power Method for Arbitrary Order [15.090593955414137]
emphTensor power method (TPM) is one of the widely-used techniques in the decomposition of tensors. We apply sketching method, and we are able to achieve the running time of $widetildeO(np-1)$ on the power $p$ and dimension $n$ tensor.
arXiv Detail & Related papers (2023-06-01T07:12:00Z)
On the Accuracy of Hotelling-Type Tensor Deflation: A Random Tensor Analysis [16.28927188636617]
A rank-$r$ asymmetric spiked model of the form $sum_i=1r beta_i A_i + W$ is considered. We provide a study of Hotelling-type deflation in the large dimensional regime.
arXiv Detail & Related papers (2022-11-16T16:01:56Z)
Average-Case Complexity of Tensor Decomposition for Low-Degree Polynomials [93.59919600451487]
"Statistical-computational gaps" occur in many statistical inference tasks. We consider a model for random order-3 decomposition where one component is slightly larger in norm than the rest. We show that tensor entries can accurately estimate the largest component when $ll n3/2$ but fail to do so when $rgg n3/2$.
arXiv Detail & Related papers (2022-11-10T00:40:37Z)
Near-Linear Time and Fixed-Parameter Tractable Algorithms for Tensor Decompositions [51.19236668224547]
We study low rank approximation of tensors, focusing on the tensor train and Tucker decompositions. For tensor train decomposition, we give a bicriteria $(1 + eps)$-approximation algorithm with a small bicriteria rank and $O(q cdot nnz(A))$ running time. In addition, we extend our algorithm to tensor networks with arbitrary graphs.
arXiv Detail & Related papers (2022-07-15T11:55:09Z)
MTC: Multiresolution Tensor Completion from Partial and Coarse Observations [49.931849672492305]
Existing completion formulation mostly relies on partial observations from a single tensor. We propose an efficient Multi-resolution Completion model (MTC) to solve the problem.
arXiv Detail & Related papers (2021-06-14T02:20:03Z)
Multi-version Tensor Completion for Time-delayed Spatio-temporal Data [50.762087239885936]
Real-world-temporal data is often incomplete or inaccurate due to various data loading delays. We propose a low-rank tensor model to predict the updates over time. We obtain up to 27.2% lower root mean-squared-error compared to the best baseline method.
arXiv Detail & Related papers (2021-05-11T19:55:56Z)
Exact nuclear norm, completion and decomposition for random overcomplete tensors via degree-4 SOS [0.7233897166339269]
We show that simple semidefinite programs inspired by degree $4$ SOS can exactly solve the tensor nuclear norm, tensor decomposition, and tensor completion problems on tensors with random asymmetric components. We show that w.h.p. these semidefinite programs can exactly find the nuclear norm and components of an $(ntimes ntimes n)$-tensor $mathcalT$ with $mleq n3/2/polylog(n)$ random asymmetric components.
arXiv Detail & Related papers (2020-11-18T17:27:36Z)

This list is automatically generated from the titles and abstracts of the papers in this site.