Related papers: Taxonomy of Polar Subspaces of Multi-Qubit Symplectic Polar Spaces of Small Rank

Taxonomy of Polar Subspaces of Multi-Qubit Symplectic Polar Spaces of Small Rank

URL: http://arxiv.org/abs/2105.03635v2
Date: Sun, 25 Jul 2021 17:32:07 GMT
Title: Taxonomy of Polar Subspaces of Multi-Qubit Symplectic Polar Spaces of Small Rank
Authors: Metod Saniga, Henri de Boutray, Frederic Holweck and Alain Giorgetti
Abstract summary: We study certain physically-relevant subgeometries of binary symplectic polar spaces $W(2N-1,2)$ of small rank $N$. Key characteristics of a subspace $W(2N-1,2)$ are: the number of its negative lines, the distribution of types of observables, the character of the geometric hyperplane the subspace shares with the distinguished quadric of $W(2N-1,2)$ and the structure of its Veldkamp space.
Score: 0.22940141855172028
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We study certain physically-relevant subgeometries of binary symplectic polar spaces $W(2N-1,2)$ of small rank $N$, when the points of these spaces canonically encode $N$-qubit observables. Key characteristics of a subspace of such a space $W(2N-1,2)$ are: the number of its negative lines, the distribution of types of observables, the character of the geometric hyperplane the subspace shares with the distinguished (non-singular) quadric of $W(2N-1,2)$ and the structure of its Veldkamp space. In particular, we classify and count polar subspaces of $W(2N-1,2)$ whose rank is $N-1$. $W(3,2)$ features three negative lines of the same type and its $W(1,2)$'s are of five different types. $W(5,2)$ is endowed with 90 negative lines of two types and its $W(3,2)$'s split into 13 types. 279 out of 480 $W(3,2)$'s with three negative lines are composite, i.\,e. they all originate from the two-qubit $W(3,2)$. Given a three-qubit $W(3,2)$ and any of its geometric hyperplanes, there are three other $W(3,2)$'s possessing the same hyperplane. The same holds if a geometric hyperplane is replaced by a `planar' tricentric triad. A hyperbolic quadric of $W(5,2)$ is found to host particular sets of seven $W(3,2)$'s, each of them being uniquely tied to a Conwell heptad with respect to the quadric. There is also a particular type of $W(3,2)$'s, a representative of which features a point each line through which is negative. Finally, $W(7,2)$ is found to possess 1908 negative lines of five types and its $W(5,2)$'s fall into as many as 29 types. 1524 out of 1560 $W(5,2)$'s with 90 negative lines originate from the three-qubit $W(5,2)$. Remarkably, the difference in the number of negative lines for any two distinct types of four-qubit $W(5,2)$'s is a multiple of four.

Related papers

The Communication Complexity of Approximating Matrix Rank [50.6867896228563]
We show that this problem has randomized communication complexity $Omega(frac1kcdot n2log|mathbbF|)$. As an application, we obtain an $Omega(frac1kcdot n2log|mathbbF|)$ space lower bound for any streaming algorithm with $k$ passes.
arXiv Detail & Related papers (2024-10-26T06:21:42Z)
LevAttention: Time, Space, and Streaming Efficient Algorithm for Heavy Attentions [54.54897832889028]
We show that for any $K$, there is a universal set" $U subset [n]$ of size independent of $n$, such that for any $Q$ and any row $i$, the large attention scores $A_i,j$ in row $i$ of $A$ all have $jin U$. We empirically show the benefits of our scheme for vision transformers, showing how to train new models that use our universal set while training as well.
arXiv Detail & Related papers (2024-10-07T19:47:13Z)
Lieb-Schultz-Mattis Theorem with Long-Range Interactions [0.0]
We prove the Lieb-Schultz-Mattis theorem in $d$-dimensional spin systems exhibiting $SO(3)$ spin rotation and lattice translation symmetries. Two types of Hamiltonians are considered: Type I comprises long-range spin-spin couplings, while Type II features long-range couplings between $SO(3)$ symmetric local operators.
arXiv Detail & Related papers (2024-05-23T18:00:37Z)
Metric Dimension and Resolvability of Jaccard Spaces [49.1574468325115]
A subset of points in a metric space is said to resolve it if each point in the space is uniquely characterized by its distance to each point in the subset. We show that a much smaller subset of $2X$ suffices to resolve, with high probability, all different pairs of subsets of cardinality at most $sqrt|X|/ln|X|$, up to a factor.
arXiv Detail & Related papers (2024-05-19T02:09:50Z)
Subspace Controllability and Clebsch-Gordan Decomposition of Symmetric Quantum Networks [0.0]
We describe a framework for the controllability analysis of networks of $n$ quantum systems of an arbitrary dimension $d$, it qudits Because of the symmetry, the underlying Hilbert space, $cal H=(mathbbCd)otimes n$, splits into invariant subspaces for the Lie algebra of $S_n$-invariant elements in $u(dn)$, denoted here by $uS_n(dn)$.
arXiv Detail & Related papers (2023-07-24T16:06:01Z)
Algebraic Aspects of Boundaries in the Kitaev Quantum Double Model [77.34726150561087]
We provide a systematic treatment of boundaries based on subgroups $Ksubseteq G$ with the Kitaev quantum double $D(G)$ model in the bulk. The boundary sites are representations of a $*$-subalgebra $Xisubseteq D(G)$ and we explicate its structure as a strong $*$-quasi-Hopf algebra. As an application of our treatment, we study patches with boundaries based on $K=G$ horizontally and $K=e$ vertically and show how these could be used in a quantum computer
arXiv Detail & Related papers (2022-08-12T15:05:07Z)
Multi-qubit doilies: enumeration for all ranks and classification for ranks four and five [0.20999222360659603]
For $N geq 2$, an $N$-qubit doily is a doily living in the $N$-qubit symplectic polar space. We present an effective algorithm for the generation of all $N$qubit doilies.
arXiv Detail & Related papers (2022-06-07T21:35:57Z)
Beyond the Berry Phase: Extrinsic Geometry of Quantum States [77.34726150561087]
We show how all properties of a quantum manifold of states are fully described by a gauge-invariant Bargmann. We show how our results have immediate applications to the modern theory of polarization.
arXiv Detail & Related papers (2022-05-30T18:01:34Z)
Low-Rank Approximation with $1/\epsilon^{1/3}$ Matrix-Vector Products [58.05771390012827]
We study iterative methods based on Krylov subspaces for low-rank approximation under any Schatten-$p$ norm. Our main result is an algorithm that uses only $tildeO(k/sqrtepsilon)$ matrix-vector products.
arXiv Detail & Related papers (2022-02-10T16:10:41Z)
On minimal representations of shallow ReLU networks [0.0]
We show that the minimal representation for $f$ uses either $n$, $n+1$ or $n+2$ neurons. In particular, where the input layer is one-dimensional, minimal representations always use at most $n+1$ neurons but in all higher dimensional settings there are functions for which $n+2$ neurons are needed.
arXiv Detail & Related papers (2021-08-12T10:22:24Z)
Vector Properties of Entanglement in a Three-Qubit System [0.0]
We show that dynamics of entanglement induced by different two-qubit coupling terms is entirely determined by mutual orientation of vectors $A$, $B$, $C$ which can be controlled by single-qubit transformations. We illustrate the power of this vector description of entanglement by solving quantum control problems involving transformations between $W$, Greenberg-Horne-Zeilinger ($GHZ$) and biseparable states.
arXiv Detail & Related papers (2020-03-31T17:34:11Z)

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

This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.