Related papers: Dimension reduction and redundancy removal through successive Schmidt decompositions

Dimension reduction and redundancy removal through successive Schmidt decompositions

URL: http://arxiv.org/abs/2302.04801v1
Date: Thu, 9 Feb 2023 17:47:51 GMT
Title: Dimension reduction and redundancy removal through successive Schmidt decompositions
Authors: Ammar Daskin, Rishabh Gupta, Sabre Kais
Abstract summary: We study the approximation of matrices and vectors by using their tensor products obtained through successive Schmidt decompositions. We show that data with distributions such as uniform, Poisson, exponential, or similar to these distributions can be approximated by using only a few terms. We also show how the method can be used to simplify quantum Hamiltonians.
Score: 4.084744267747294
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Quantum computers are believed to have the ability to process huge data sizes which can be seen in machine learning applications. In these applications, the data in general is classical. Therefore, to process them on a quantum computer, there is a need for efficient methods which can be used to map classical data on quantum states in a concise manner. On the other hand, to verify the results of quantum computers and study quantum algorithms, we need to be able to approximate quantum operations into forms that are easier to simulate on classical computers with some errors. Motivated by these needs, in this paper we study the approximation of matrices and vectors by using their tensor products obtained through successive Schmidt decompositions. We show that data with distributions such as uniform, Poisson, exponential, or similar to these distributions can be approximated by using only a few terms which can be easily mapped onto quantum circuits. The examples include random data with different distributions, the Gram matrices of iris flower, handwritten digits, 20newsgroup, and labeled faces in the wild. And similarly, some quantum operations such as quantum Fourier transform and variational quantum circuits with a small depth also may be approximated with a few terms that are easier to simulate on classical computers. Furthermore, we show how the method can be used to simplify quantum Hamiltonians: In particular, we show the application to randomly generated transverse field Ising model Hamiltonians. The reduced Hamiltonians can be mapped into quantum circuits easily and therefore can be simulated more efficiently.

Related papers

Efficient Learning for Linear Properties of Bounded-Gate Quantum Circuits [63.733312560668274]
Given a quantum circuit containing d tunable RZ gates and G-d Clifford gates, can a learner perform purely classical inference to efficiently predict its linear properties? We prove that the sample complexity scaling linearly in d is necessary and sufficient to achieve a small prediction error, while the corresponding computational complexity may scale exponentially in d. We devise a kernel-based learning model capable of trading off prediction error and computational complexity, transitioning from exponential to scaling in many practical settings.
arXiv Detail & Related papers (2024-08-22T08:21:28Z)
The curse of random quantum data [62.24825255497622]
We quantify the performances of quantum machine learning in the landscape of quantum data. We find that the training efficiency and generalization capabilities in quantum machine learning will be exponentially suppressed with the increase in qubits. Our findings apply to both the quantum kernel method and the large-width limit of quantum neural networks.
arXiv Detail & Related papers (2024-08-19T12:18:07Z)
Quantum Information Processing with Molecular Nanomagnets: an introduction [49.89725935672549]
We provide an introduction to Quantum Information Processing, focusing on a promising setup for its implementation. We introduce the basic tools to understand and design quantum algorithms, always referring to their actual realization on a molecular spin architecture. We present some examples of quantum algorithms proposed and implemented on a molecular spin qudit hardware.
arXiv Detail & Related papers (2024-05-31T16:43:20Z)
Efficient MPS representations and quantum circuits from the Fourier modes of classical image data [0.4326762849037007]
We show that classical data with a quickly decaying Fourier spectrum can be well-approximated by states with a small Schmidt rank. These approximated states can, in turn, be prepared on a quantum computer with a linear number of nearest-neighbor two-qubit gates. We also consider different variational circuit ans"atze and demonstrate numerically that one-dimensional sequential circuits achieve the same compression quality as more powerful ans"atze.
arXiv Detail & Related papers (2023-11-13T19:00:33Z)
Quantum data learning for quantum simulations in high-energy physics [55.41644538483948]
We explore the applicability of quantum-data learning to practical problems in high-energy physics. We make use of ansatz based on quantum convolutional neural networks and numerically show that it is capable of recognizing quantum phases of ground states. The observation of non-trivial learning properties demonstrated in these benchmarks will motivate further exploration of the quantum-data learning architecture in high-energy physics.
arXiv Detail & Related papers (2023-06-29T18:00:01Z)
Sample-size-reduction of quantum states for the noisy linear problem [0.0]
We show that it is possible to reduce a quantum sample size in a quantum random access memory (QRAM) to the linearithmic order. We achieve a shorter run-time for the noisy linear problem.
arXiv Detail & Related papers (2023-01-08T05:53:17Z)
Near-Term Advances in Quantum Natural Language Processing [0.03298597939573778]
This paper describes experiments showing that some tasks in natural language processing can already be performed using quantum computers. The first uses an explicit word-based approach, in which word-topic scoring weights are implemented as fractional rotations of individual qubit. A new phrase is classified based on the accumulation of these weights in a scoring qubit using entangling controlled-NOT gates.
arXiv Detail & Related papers (2022-06-05T13:10:46Z)
Commutation simulator for open quantum dynamics [0.0]
We propose an innovative method to investigate directly the properties of a time-dependent density operator $hatrho(t)$. We can directly compute the expectation value of the commutation relation and thus of the rate of change of $hatrho(t)$. A simple but important example is demonstrated in the single-qubit case and we discuss extension of the method for practical quantum simulation with many qubits.
arXiv Detail & Related papers (2022-06-01T16:03:43Z)
Machine learning applications for noisy intermediate-scale quantum computers [0.0]
We develop and study three quantum machine learning applications suitable for NISQ computers. These algorithms are variational in nature and use parameterised quantum circuits (PQCs) as the underlying quantum machine learning model. We propose a variational algorithm in the area of approximate quantum cloning, where the data becomes quantum in nature.
arXiv Detail & Related papers (2022-05-19T09:26:57Z)
Information Scrambling in Computationally Complex Quantum Circuits [56.22772134614514]
We experimentally investigate the dynamics of quantum scrambling on a 53-qubit quantum processor. We show that while operator spreading is captured by an efficient classical model, operator entanglement requires exponentially scaled computational resources to simulate.
arXiv Detail & Related papers (2021-01-21T22:18:49Z)
Machine learning transfer efficiencies for noisy quantum walks [62.997667081978825]
We show that the process of finding requirements on both a graph type and a quantum system coherence can be automated. The automation is done by using a convolutional neural network of a particular type that learns to understand with which network and under which coherence requirements quantum advantage is possible. Our results are of importance for demonstration of advantage in quantum experiments and pave the way towards automating scientific research and discoveries.
arXiv Detail & Related papers (2020-01-15T18:36:53Z)

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