[1]李叶,洪陈春,罗和治.两阶段金融衍生品清算问题的半定规划松弛方法[J].浙江理工大学学报,2024,51-52(自科四):566-572.
LI Ye,HONG Chenchun,LUO Hezhi.The semi definite programming relaxation method for two period financial derivatives′ liquidation problem[J].Journal of Zhejiang Sci-Tech University,2024,51-52(自科四):566-572.
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两阶段金融衍生品清算问题的半定规划松弛方法(
)
LI Ye,HONG Chenchun,LUO Hezhi.The semi definite programming relaxation method for two period financial derivatives′ liquidation problem[J].Journal of Zhejiang Sci-Tech University,2024,51-52(自科四):566-572.
)浙江理工大学学报[ISSN:1673-3851/CN:33-1338/TS]
- 卷:
- 第51-52卷
- 期数:
- 2024年自科第四期
- 页码:
- 566-572
- 栏目:
- 出版日期:
- 2024-07-10
文章信息/Info
- Title:
- The semi definite programming relaxation method for two period financial derivatives′ liquidation problem
- 文章编号:
- 1673-3851 (2024) 04-0566-07
- 分类号:
- O224
- 文献标志码:
- A
- 摘要:
- 在不限制暂时性及永久性价格影响参数大小关系下,研究两阶段金融衍生品清算问题的半定规划(Semidefinite programming, SDP)松弛方法,其优化模型为一个带有线性和单个非凸二次约束的非凸二次规划(Quadratically constrained quadratic program, QCQP)问题。针对该非凸QCQP问题,给出了一个带有Secant割的SDP松弛,并估计了它与原问题之间的间隙。随机例子的数值结果表明该SDP松弛可以得到原问题更紧的上界,从而为寻求原问题的一个好的近似解提供方法。
参考文献/References:
[ 1 ] MadhavanA . Market microstructure: A survey [ J ] . Journal of Financial Markets, 2000, 3(3): 205 - 258. [2]BrownD B, Carlin B I, Lobo M S. Optimal portfolio liquidation with distress risk[J]. Management Science, 2010, 56(11):1997-2014. [3]ChenJ N. Optimal liquidation of financial derivatives[J]. Finance Research Letters, 2020, 34: 101233. [4]SiasR W, Starks L T, Titman S. The price impact of institutional trading[M]. SSRN, 2001..(2001-09-19)[2022-10-12]. [5]PardalosP M, Vavasis S A. Quadratic programming with one negative eigenvalue is NP-hard[J]. Journal of Global Optimization, 1991, 1(1): 15-22. [6]YeY Y. Approximating quadratic programming with bound and quadratic constraints[J]. Mathematical Programming, 1999, 84(2): 219-226. [7]丁晓东, 肖琳灿, 罗和治. 带边际风险控制的投资组合问题的半定规划松弛[J]. 浙江工业大学学报, 2017, 45(1): 64-68. [8]章显业, 罗和治. 带凸二次约束非凸二次规划的双非负规划松弛及其解法[J]. 浙江理工大学学报(自然科学版), 2022, 47(4): 601-607. [9]LuoH Z, Bai X D, Peng J M. Enhancing semidefinite relaxation for quadratically constrained quadratic programming via penalty methods[J]. Journal of Optimization Theory and Applications, 2019, 180(3): 964-992. [10]ZhengX J, Sun X L, Li D. Convex relaxations for nonconvex quadratically constrained quadratic programming: matrix cone decomposition and polyhedral approximation[J]. Mathematical Programming, 2011, 129(2): 301-329.
备注/Memo
- 备注/Memo:
-
收稿日期: 2022-10-12
网络出版日期:2023-01-16
基金项目: 国家自然科学基金项目(12271485,11871433);浙江省自然科学基金项目(LZ21A010003)
作者简介: 李叶(1997—),女,江西南昌人,硕士研究生,主要从事最优化理论与算法方面的研究
通信作者: 罗和治,E-mail:hzluo@zstu.edu.cn
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