Experimental Demonstration of a Reconfigurable Coupled Oscillator Platform to Solve the Max-Cut Problem

Experimental Demonstration of a Reconfigurable Coupled Oscillator Platform to Solve the Max-Cut Problem

In this work, we experimentally demonstrate an integrated circuit (IC) of 30 relaxation oscillators with reconfigurable capacitive coupling to solve the NP-Hard maximum cut (Max-Cut) problem. We show that under the influence of an external second-harmonic injection signal, the oscillator phases exhi...

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Bibliographic Details
Published in:IEEE journal on exploratory solid-state computational devices and circuits Vol. 6; no. 2; pp. 116 - 121
Main Authors: Bashar, Mohammad Khairul, Mallick, Antik, Truesdell, Daniel S., Calhoun, Benton H., Joshi, Siddharth, Shukla, Nikhil
Format: Journal Article
Language:English
Published: Piscataway IEEE 01-12-2020
The Institute of Electrical and Electronics Engineers, Inc. (IEEE)
Subjects:
Analog
Boolean algebra
Capacitors
Combinatorial analysis
coupled oscillators
Coupling
Graphs
integrated circuit (IC)
Integrated circuits
Ising machines
maximum cut (Max-Cut)
NP-hard problem
Optimization
Oscillators
Reconfigurable architectures
Reconfiguration
Relaxation oscillators
Room temperature
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Summary:In this work, we experimentally demonstrate an integrated circuit (IC) of 30 relaxation oscillators with reconfigurable capacitive coupling to solve the NP-Hard maximum cut (Max-Cut) problem. We show that under the influence of an external second-harmonic injection signal, the oscillator phases exhibit a bipartition that can be used to calculate a high-quality approximate Max-Cut solution. Leveraging the all-to-all reconfigurable coupling architecture, we experimentally evaluate the computational properties of the oscillators using randomly generated graph instances of varying size and edge density (<inline-formula> <tex-math notation="LaTeX">\eta </tex-math></inline-formula>). Furthermore, comparing the Max-Cut solutions with the optimal values, we show that the oscillators (after simple postprocessing) produce a Max-Cut that is within 99% of the optimal value in 28 of the 36 measured graphs; importantly, the oscillators are particularly effective in dense graphs with the Max-Cut being optimal in seven out of nine measured graphs with <inline-formula> <tex-math notation="LaTeX">\eta =0.8 </tex-math></inline-formula>. Our work marks a step toward creating an efficient, room-temperature-compatible non-Boolean hardware-based solver for hard combinatorial optimization problems.
ISSN:2329-9231
2329-9231
DOI:10.1109/JXCDC.2020.3025994