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第 11 期李金泽，等：结构动响应的自启动单解时域积分器优化 2789

解时域积分器 [J]. 力学学报，2025，57（3）：767-781. Methods in Engineering，2021，122（4）：1089-1132.
LI Jinze，LIU Yaokun，CUI Naigang，et al. The self-start- [21] ZHAO R，LI J Z，YU K P. A self-starting dissipative alter-
ing single-solve time integrators with identical second-order native to the central difference methods[J]. Archive of Applied
accuracy[J]. Chinese Journal of Theoretical and Applied Mechanics，2023，93（2）：571-603.
Mechanics，2025，57（3）：767-781. [22] FOX L，GOODWIN E T. Some new methods for the numeri-
[10] 季明辉，秦建国，弓海霞，等. 水下法兰连接器密封结构 cal integration of ordinary differential equations[J]. Mathemat-
优化设计研究 [J]. 内蒙古工业大学学报 (自然科学版)， ical Proceedings of the Cambridge Philosophical Society，
2024，43（4）： 323-329. 1949，45（3）：373-388.
JI Minghui，QIN Jianguo，GONG Haixia，et al. Optimiza- [23] 李金泽，刘耀坤，于开平，等. 自启动单解显式时间积分器
tion design of sealing structure for subsea flange connectors[J]. 的研究进展及性能评估 [J]. 力学进展，2025，55（2）：288-339.
Journal of Inner Mongolia University of Technology (Natural LI Jinze， LIU Yaokun， YU Kaiping， et al. Research
Science Edition)，2024，43（4）：323-329. progress and performance evaluations for self-starting single-
[11] LI J Z，CUI N G，ZHU Y J，et al. Novel implicit integra- solve explicit time integrators[J]. Advances in Mechanics，
tion algorithms with identical second-order accuracy and flexi- 2025，55（2）：288-339.
ble dissipation control for first-order transient problems[J]. [24] ZHOU X，TAMMA K K. Design，analysis，and synthesis
International Journal for Numerical Methods in Engineering， of generalized single step single solve and optimal algorithms
2025，126（3）：e7639. for structural dynamics[J]. International Journal for Numerical
[12] 李金泽，刘耀坤，崔乃刚，等. 结构动力学自启动单解隐式 Methods in Engineering，2004，59（5）：597-668.
积分器的分析与优化 [J/OL]. 振动工程学报，1-20[2025-06- [25] 邵慧萍，蔡承文. 结构动力学方程数值积分的三参数算法
23]. https://link.cnki.net/urlid/32.1349.TB.20250116.1638.003. [J]. 应用力学学报，1988，5（4）：76-81.
SHAO Huiping， CAI Chengwen. A three parameters algo-
LI Jinze，LIU Yaokun，CUI Naigang，et al. Analysis and
rithm for numerical integration of structural dynamic equa-
optimization on self-starting single-solve implicit integrators
tions[J]. Chinese Journal of Applied Mechanics， 1988，
for structural dynamics[J/OL]. Journal of Vibration Engineer-
5（4）：76-81.
ing，1-20[2025-06-23]. https://link.cnki.net/urlid/32.1349.TB.
[26] CHUNG J，HULBERT G M. A time integration algorithm for
20250116.1638.003.
[13] NEWMARK N M. A method of computation for structural structural dynamics with improved numerical dissipation：the
generalized-α method[J]. Journal of Applied Mechanics，
dynamics[J]. Journal of the Engineering Mechanics Division，
1993，60（2）：371-375.
1959，85（3）：67-94.
[27] WILSON E L. A computer program for the dynamic stress
[14] LEE C J， BATHE K J， NOH G. Stability of the Bathe
analysis of underground structure： No. 68-1[R]. Berkeley：
implicit time integration methods in the presence of physical
University of California，1968.
damping[J]. Computers & Structures，2024，295：107294.
[28] WILSON E. Elastic dynamic response of axisymmetric struc-
[15] HUGHES T J R. Analysis of Transient Algorithms with Partic-
tures：No. 69-2[R]. Berkeley：University of California，1969.
ular Reference to Stability Behavior[M]//Computational Meth-
[29] WILSON E L，FARHOOMAND I，BATHE K J. Nonlinear
ods for Transient Analysis： Vol 1. Amsterdam， North-
dynamic analysis of complex structures[J]. Earthquake Engi-
Holland， 1983：67-155.
neering & Structural Dynamics，1972，1（3）：241-252.
[16] HILBER H M，HUGHES T J R. Collocation，dissipation and
[30] 蔡承文，恽馥，刘明杰. 结构动响应的样条插值加权残量
‘overshoot’ for time integration schemes in structural dynam- 算法
ics[J]. Earthquake Engineering & Structural Dynamics， [J]. 上海力学，1991，12（2）：53-61.
CAI Chengwen， YUN Fu， LIU Mingjie. An algorithm for
1978，6（1）：99-117.
the dynamic response of structures based upon the spline inter-
[17] MAXAM D J，TAMMA K K. A re-evaluation of overshoot-
polation and weighted residuals method[J]. Chinese Quarterly
ing in time integration schemes：The neglected effect of phys-
of Mechanics，1991，12（2）：53-61.
ical damping in the starting procedure[J]. International Journal
[31] BEZANSON J， EDELMAN A， KARPINSKI S， et al.
for Numerical Methods in Engineering， 2022， 123（ 12）：
Julia： a fresh approach to numerical computing[J]. SIAM
2683-2704.
Review，2017，59（1）：65-98.
[18] ZHANG J. Optimal implicit single-step time integration meth-
[32] GÉRADIN M， RIXEN D. Mechanical Vibrations： Theory
ods with equivalence to the second-order-type linear multistep
and Application to Structural Dynamics[M]. 3rd ed. Chich-
methods for structural dynamics：accuracy analysis based on
ester：Wiley，2015.
an analytical framework[J]. Computer Methods in Applied
[33] LI J Z，LI H，YU K P，et al. High-order accurate multi-sub-
Mechanics and Engineering，2024，418：116503.
step implicit integration algorithms with dissipation control for
[19] LI J Z，LI H，LIAN Y W，et al. On designing and develop-
hyperbolic problems[J]. Archive of Applied Mechanics，
ing single-step second-order implicit methods with dissipation
2024，94（8）：2285-2334.
control and zero-order overshoots via subsidiary variables[J].
International Journal for Numerical Methods in Engineering，
第一作者：李金泽（1994—），男，博士，副研究员。
2023，124（22）：4880-4940.
[20] LI J Z，YU K P，LI X Y. An identical second-order single E-mail：pinkie.ljz@hit.edu.cn
step explicit integration algorithm with dissipation control for 通信作者：于开平（1968—），男，博士，教授。
structural dynamics[J]. International Journal for Numerical E-mail：yukp@hit.edu.cn

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