Cardinality Constrained Portfolio Optimization on an Ising Machine

被引：0

作者：

Parizy, Matthieu ^{[1
,2
]}

Sadowski, Przemyslaw ^{[2
]}

Togawa, Nozomu ^{[1
]}

机构：

[1] Waseda Univ, Dept Comp Sci & Commun Engn, Tokyo, Japan

[2] Fujitsu Ltd, Fujitsu Res, Minato, Japan

来源：

2022 IEEE 35TH INTERNATIONAL SYSTEM-ON-CHIP CONFERENCE (IEEE SOCC 2022) | 2022年

关键词：

portfolio; optimization; Ising machine; cardinality constraint; integer encoding;

D O I：

10.1109/SOCC56010.2022.9908082

中图分类号：

TP3 [计算技术、计算机技术];

学科分类号：

0812 ;

摘要：

In this paper, we propose an Ising-machine based method for solving the cardinality constrained mean-variance portfolio optimization problem (CCMVPOP), which is an NP-hard problem and often solved using metaheuristics. Firstly, we formulate this problem as a binary quadratic program (BQP) to be solved by an Ising machine-software system. Namely, we propose formulations for each objective and constraint using binary variables exclusively. Furthermore, we evaluate and compare well known integer to binary variable encoding as well as propose a new encoding for the CCMVPOP. The evaluation is done by studying which encoding converges the fastest to the highest return over risk collection of assets for a given data set which represent stocks involved in a capital market index. Used data range from capital market index composed of 31 assets for the smallest and up to 225 for the largest. The experimental results confirm that the proposed formulations to the CCMVPOP for an Ising machine-software system are effective.

引用

页码：136 / 141

页数：6

共 50 条

[1] Hybrid search for cardinality constrained portfolio optimization
Gomez, Miguel A.
Flores, Carmen X.
Osorio, Maria A.
[J]. GECCO 2006: GENETIC AND EVOLUTIONARY COMPUTATION CONFERENCE, VOL 1 AND 2, 2006, : 1865 - +
[2] A Mayfly algorithm for cardinality constrained portfolio optimization
Zheng, Xuanyu
Zhang, Changsheng
Zhang, Bin
[J]. EXPERT SYSTEMS WITH APPLICATIONS, 2023, 230
[3] On cardinality constrained mean-CVaR portfolio optimization
Cheng, Runze
Gao, Jianjun
[J]. 2015 27TH CHINESE CONTROL AND DECISION CONFERENCE (CCDC), 2015, : 1074 - 1079
[4] Cardinality-constrained distributionally robust portfolio optimization
Kobayashi, Ken
Takano, Yuichi
Nakata, Kazuhide
[J]. EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2023, 309 (03) : 1173 - 1182
[5] Heuristic Algorithm for the Cardinality Constrained Portfolio Optimization Problem
Homchenko, A. A.
Lucas, C.
Mironov, S. V.
Sidorov, S. P.
[J]. IZVESTIYA SARATOVSKOGO UNIVERSITETA NOVAYA SERIYA-MATEMATIKA MEKHANIKA INFORMATIKA, 2013, 13 (02): : 17 - 17
[6] Robust optimization framework for cardinality constrained portfolio problem
Sadjadi, Seyed Jafar
Gharakhani, Mohsen
Safari, Ehram
[J]. APPLIED SOFT COMPUTING, 2012, 12 (01) : 91 - 99
[7] A Combinatorial Algorithm for The Cardinality Constrained Portfolio Optimization Problem
Cui, Tianxiang
Cheng, Shi
Bai, Ruibin
[J]. 2014 IEEE CONGRESS ON EVOLUTIONARY COMPUTATION (CEC), 2014, : 491 - 498
[8] A comparative study of heuristic methods for cardinality constrained portfolio optimization
Fu, Lei
Li, Jun
Pu, Shanwen
[J]. HIGH-CONFIDENCE COMPUTING, 2023, 3 (01):
[9] A local relaxation method for the cardinality constrained portfolio optimization problem
Walter Murray
Howard Shek
[J]. Computational Optimization and Applications, 2012, 53 : 681 - 709
[10] Lagrangian relaxation procedure for cardinality-constrained portfolio optimization
Shaw, Dong X.
Liu, Shucheng
Kopman, Leonid
[J]. OPTIMIZATION METHODS & SOFTWARE, 2008, 23 (03): : 411 - 420

← 1 2 3 4 5 →