Related papers: Scaling Up the Quantum Divide and Conquer Algorithm for Combinatorial Optimization

Scaling Up the Quantum Divide and Conquer Algorithm for Combinatorial Optimization

URL: http://arxiv.org/abs/2405.00861v1
Date: Wed, 1 May 2024 20:49:50 GMT
Title: Scaling Up the Quantum Divide and Conquer Algorithm for Combinatorial Optimization
Authors: Ibrahim Cameron, Teague Tomesh, Zain Saleem, Ilya Safro,
Abstract summary: We propose a method for constructing quantum circuits which greatly reduces inter-device communication costs. We show that we can construct tractable circuits nearly three times the size of previous QDCA methods while retaining a similar or greater level of quality.
Score: 0.8121127831316319
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Quantum optimization as a field has largely been restricted by the constraints of current quantum computing hardware, as limitations on size, performance, and fidelity mean most non-trivial problem instances won't fit on quantum devices. Even proposed solutions such as distributed quantum computing systems may struggle to achieve scale due to the high cost of inter-device communication. To address these concerns, we propose Deferred Constraint Quantum Divide and Conquer Algorithm (DC-QDCA), a method for constructing quantum circuits which greatly reduces inter-device communication costs for some quantum graph optimization algorithms. This is achieved by identifying a set of vertices whose removal partitions the input graph, known as a separator; by manipulating the placement of constraints associated with the vertices in the separator, we can greatly simplify the topology of the optimization circuit, reducing the number of required inter-device operations. Furthermore, we introduce an iterative algorithm which builds on these techniques to find solutions for problems with potentially thousands of variables. Our experimental results using quantum simulators have shown that we can construct tractable circuits nearly three times the size of previous QDCA methods while retaining a similar or greater level of quality.

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