Ramsey Numbers and Adiabatic Quantum Computing

Gaitan, Frank; Clark, Lane H.

doi:10.1103/physrevlett.108.010501

Cited by 61 publications

(76 citation statements)

References 19 publications

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“…Although the main focus of the quantum annealing computational paradigm [17][18][19] has been on solving discrete optimization problems in a wide variety of application domains [20][21][22][23][24][25][26][27], it has been also introduced as a potential candidate to speed up computations in sampling applications. Indeed, it is an important open research question whether or not quantum annealers can sample from Boltzmann distributions more efficiently than traditional techniques [4,5,9].…”

Section: Introductionmentioning

confidence: 99%

Estimation of effective temperatures in quantum annealers for sampling applications: A case study with possible applications in deep learning

et al. 2016

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An increase in the efficiency of sampling from Boltzmann distributions would have a significant impact on deep learning and other machine-learning applications. Recently, quantum annealers have been proposed as a potential candidate to speed up this task, but several limitations still bar these state-of-the-art technologies from being used effectively. One of the main limitations is that, while the device may indeed sample from a Boltzmann-like distribution, quantum dynamical arguments suggest it will do so with an instance-dependent effective temperature, different from its physical temperature. Unless this unknown temperature can be unveiled, it might not be possible to effectively use a quantum annealer for Boltzmann sampling. In this work, we propose a strategy to overcome this challenge with a simple effective-temperature estimation algorithm. We provide a systematic study assessing the impact of the effective temperatures in the learning of a special class of a restricted Boltzmann machine embedded on quantum hardware, which can serve as a building block for deep-learning architectures. We also provide a comparison to k-step contrastive divergence (CD-k) with k up to 100. Although assuming a suitable fixed effective temperature also allows us to outperform one step contrastive divergence (CD-1), only when using an instance-dependent effective temperature do we find a performance close to that of CD-100 for the case studied here.

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Section: Introductionmentioning

confidence: 99%

Estimation of effective temperatures in quantum annealers for sampling applications: A case study with possible applications in deep learning

et al. 2016

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“…In the Ramsey number algorithm (RNA) [3], the calculation of Rðm; nÞ is formulated as an optimization problem which can be solved using adiabatic quantum evolution [6]. Here we present evidence of an experimental implementation of the RNA using adiabatic quantum evolution and show that it correctly determines the Ramsey numbers Rð3; 3Þ and Rðm; 2Þ for 4 m 8.…”

mentioning

confidence: 90%

“…Thus an N-vertex graph G determines a unique bit string a, and vice versa. Reference [3] (and the Supplemental Material [7]) showed how to count the number of m-cliques C N m ðaÞ and n-independent sets I N n ðaÞ in an N-vertex graph G using its associated bit string a. We can PRL 111, 130505 (2013) …”

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Putting “Quantumness” to the Test

Smith¹,

Smolin²

2013

Physics

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Ramsey theory is a highly active research area in mathematics that studies the emergence of order in large disordered structures. Ramsey numbers mark the threshold at which order first appears and are extremely difficult to calculate due to their explosive rate of growth. Recently, an algorithm that can be implemented using adiabatic quantum evolution has been proposed that calculates the two-color Ramsey numbers Rðm; nÞ. Here we present results of an experimental implementation of this algorithm and show that it correctly determines the Ramsey numbers Rð3; 3Þ and Rðm; 2Þ for 4 m 8. The Rð8; 2Þ computation used 84 qubits of which 28 were computational qubits. This computation is the largest experimental implementation of a scientifically meaningful adiabatic evolution algorithm that has been done to date. In recent years first steps have been taken towards experimentally realizing the computational advantages promised by well-known quantum algorithms. As with any nascent effort, these initial steps have been limited. To date the largest experimental implementations of scientifically meaningful quantum algorithms have used just a handful of qubits. For circuit-based algorithms [1], seven spin qubits were used to factor 15, while for adiabatic algorithms [2], four spin qubits were used to factor 143. In both cases compiled versions of the algorithms were needed to allow factoring with such small numbers of qubits. Although factoring was the focus of both experiments, other scientifically significant applications exist.In Ref.[3] an algorithm for determining the two-color Ramsey numbers was proposed which could be implemented using adiabatic quantum evolution. Ramsey numbers are part of an active research area in mathematics known as Ramsey theory [4] whose central theme is the emergence of order in large disordered structures. The disordered structures can be represented by an N-vertex graph G, and the ordered substructures by specific graphs H 1 and H 2 that are to appear as subgraphs of G. For two-color Ramsey numbers the subgraphs H 1 and H 2 are m-cliques and n-independent sets, respectively. An m-clique is a set of m vertices that has an edge connecting any two of the m vertices, and an n-independent set is a set of n vertices in which no two of the n vertices are joined by an edge. Using Ramsey theory [4,5], one can prove that a threshold value Rðm; nÞ exists so that for N ! Rðm; nÞ every graph with N vertices will contain either an m-clique or an n-independent set. The threshold value Rðm; nÞ is an example of a two-color Ramsey number. Other types of Ramsey numbers exist, though we focus on two-color Ramsey numbers here. Ramsey numbers Rðm; nÞ grow extremely quickly and are notoriously difficult to calculate. In fact, for m, n ! 3, only nine are presently known [5].In the Ramsey number algorithm (RNA) [3], the calculation of Rðm; nÞ is formulated as an optimization problem which can be solved using adiabatic quantum evolution [6]. Here we present evidence of an experimental implementation of the RNA using a...

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“…A few months later, "D-Wave One", a 128-qubit machine based on super-conducting qubits [7] experimentally demonstrated the ability to compute twocolor Ramsey numbers [2,8] making it the largest experimental implementation of a scientifically meaningful quantum algorithm. This success provides an incentive for finding problems that could be solved efficiently on a * Electronic address: itayhe@physics.ucsc.edu quantum annealer.…”

Section: Introductionmentioning

confidence: 99%

Solving the graph-isomorphism problem with a quantum annealer

Hen

Young

2012

Phys. Rev. A

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We propose a novel method using a quantum annealer -an analog quantum computer based on the principles of quantum adiabatic evolution -to solve the Graph Isomorphism problem, in which one has to determine whether two graphs are isomorphic (i.e., can be transformed into each other simply by a relabeling of the vertices). We demonstrate the capabilities of the method by analyzing several types of graph families, focusing on graphs with particularly high symmetry called strongly regular graphs (SRG's). We also show that our method is applicable, within certain limitations, to currently available quantum hardware such as "D-Wave One".

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Ramsey Numbers and Adiabatic Quantum Computing

Cited by 61 publications

References 19 publications

Estimation of effective temperatures in quantum annealers for sampling applications: A case study with possible applications in deep learning

Estimation of effective temperatures in quantum annealers for sampling applications: A case study with possible applications in deep learning

Putting “Quantumness” to the Test

Solving the graph-isomorphism problem with a quantum annealer

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