Research on the Optimization Model and Algorithm for the Movement Path of the "Bench Dragon"

Xiayu Wu; Shiyu Wang; Yingyin Liu; Yu Jiang; Xiaoyu Bai; Kexin Lyu

doi:10.54097/gy2f7d16

Authors

Xiayu Wu
Shiyu Wang
Yingyin Liu
Yu Jiang
Xiaoyu Bai
Kexin Lyu

DOI:

https://doi.org/10.54097/gy2f7d16

Keywords:

Path Optimization, Bisection Method, Iterative Method, Arc Differential, Polar Coordinates.

Abstract

To enhance the organizational efficiency and cultural presentation effectiveness of the folk activity "Bench Dragon", this paper focuses on the dynamic optimization problem of the Bench Dragon's "panlong" (coiling) movement. A chain path optimization modeling method based on plane geometric recursion and kinematic constraints is proposed: First, an Archimedean spiral model is constructed to characterize the movement trajectory of the dragon head. The spatiotemporal coordinates and velocity distribution of each dragon body segment are systematically derived using differential-integral methods. For collision constraints during movement, a safety distance verification model in polar coordinate space is established. Combined with the bisection method and iterative algorithms, the critical coiling time is accurately solved. Under the constraint of turn space, the minimum safe pitch is determined through parameter optimization. The quantitative model system constructed in this study provides a scientific dynamic analysis framework and optimization strategy support for improving the coordination and spectacle of the dragon dance performance.

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References

[1] Xiao Qi, Lin Mingzhu. Activation and Utilization of Intangible Cultural Heritage Tourism Resources in Minzhong: A Case Study of Sanming Datian Bench Dragon [J]. Chinese National Expo, 2020 (22): 65–67.

[2] Hao B, Zhao J, Wang Q. A Review of Intelligence - Based Vehicles Path Planning [J]. SAE Int. J. Commer. Veh., 2023, 16 (4): 329 - 339.

[3] Zhou, Y.; Yan, L.; Han, Y.; Xie, H.; Zhao, Y. A Survey on the Key Technologies of UAV Motion Planning [J]. Drones, 2025, 9 (4): 194.

[4] Liu, M.; Hu, J.; Zhou, W.; Wang, X. Cyber - Physical Revitalization of Intangible Cultural Heritage: Geometric - Numerical Framework for Archimedean Spiral Trajectories in Autonomous Robotic Systems Performing the Traditional Dance Named Bench Dragon [J]. Symmetry, 2025, 17 (4): 524.

[5] Li Yuhang, Wu Rushan, Zhang Chi, et al. Research on Modeling and Path Optimization of the Marching State of the Folk Activity "Bench Dragon" [J/OL]. Experiment Science and Technology, 2025:1-7.

[6] Guo Z, Li Z, Zhang J, Guo K, Shen F, Zhou Q, Zhou H. Review of the Functions of Archimedes’ Spiral Metallic Nanostructures [J]. Nanomaterials, 2017, 11 (7): 405.

[7] Liu Chongjun. Principle and Calculation of Equiangular Spirals [J]. Mathematics in Practice and Theory, 2018, 48 (11):165-174.

[8] Nystedt P. Arc length of function graphs via Taylor's formula [J]. International Journal of Mathematical Education in Science and Technology, 2021, 52 (2): 310 - 323.

[9] Lin S, Hu B, Zhang X, et al. White dwarf binary modulation can help stochastic gravitational wave background search [J]. Science China (Physics,Mechanics & Astronomy), 2023, 66 (09):132-137.

[10] Zhang W, Wan W, Wang W. The Evolution and Review of the Cultural Ecology of Village Sports Performances: A Study on the “Bench Dragon” in Chongren [J]. Academic Journal of Humanities & Social Sciences, 2024, 7 (8): 18-23.