Atithi Acharya, Romina Yalovetzky, Pierre Minssen, Shouvanik Chakrabarti, Ruslan Shaydulin, Rudy Raymond, Yue Sun, Dylan Herman, Ruben S. Andrist, Grant Salton, Martin J. A. Schuetz, Helmut G. Katzgraber, Marco Pistoia
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引用次数: 0
Abstract
Industrially relevant constrained optimization problems, such as portfolio
optimization and portfolio rebalancing, are often intractable or difficult to
solve exactly. In this work, we propose and benchmark a decomposition pipeline
targeting portfolio optimization and rebalancing problems with constraints. The
pipeline decomposes the optimization problem into constrained subproblems,
which are then solved separately and aggregated to give a final result. Our
pipeline includes three main components: preprocessing of correlation matrices
based on random matrix theory, modified spectral clustering based on Newman's
algorithm, and risk rebalancing. Our empirical results show that our pipeline
consistently decomposes real-world portfolio optimization problems into
subproblems with a size reduction of approximately 80%. Since subproblems are
then solved independently, our pipeline drastically reduces the total
computation time for state-of-the-art solvers. Moreover, by decomposing large
problems into several smaller subproblems, the pipeline enables the use of
near-term quantum devices as solvers, providing a path toward practical utility
of quantum computers in portfolio optimization.
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