Closed Loop Vector Formulation in Eulers Complex Numbers for Multi Loop Planar Mechanisms With N bars A Novel Modeling Approach and Algorithm

Pub Date : 2023-11-01 DOI:10.14429/dsj.73.18941
Rahul V M, Sandesh Bhaktha, Gangadharan K.V.
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Abstract

This paper presents a novel iterative algorithm incorporated in a user-friendly GUI for modeling the kinematics of multiple looped N-bar closed-loop mechanisms. Past research works have used custom coding or expensive commercial software to analyze the mechanisms of specific applications. The proposed algorithm focuses on kinematics and offers a quick, easy-to-use, cost-effective solution to analyze a wide range of generic mechanisms, reducing the need for custom coding and lowering computational costs. The algorithm employs algebraic equations, such as solving complex closed-loop vector equations using the Euler form of complex numbers, to simulate and derive the unknowns necessary to characterise any generic closed-loop mechanism. The Python code implemented in the algorithm adapts to various scenarios by utilising available information on the position, velocity, and acceleration variables of the mechanisms. The simulation tool can display real-time color contour plots (RGB color scale) for linear and angular velocities and accelerations, simulate mechanisms with multiple loops and switch configurations, and find inverse mechanisms. The approach for solving multiple loop problems and the algorithm utilized to solve the configurations, methods, equations used and GUI features implementation are all described in this study. The case study considered for a four-bar mechanism indicates a strong agreement between the results obtained from the proposed kinematics-based simulator and ANSYS software. These results demonstrate the simulator’s effectiveness in providing low-cost and user-friendly simulation results for various generic mechanisms involving multiple interconnected loops.
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多环平面机构的欧拉复数闭环矢量形式一种新的建模方法和算法
本文提出了一种新的迭代算法,结合用户友好的图形用户界面来建模多环n杆闭环机构的运动学。过去的研究工作使用定制编码或昂贵的商业软件来分析特定应用程序的机制。所提出的算法侧重于运动学,并提供了一个快速,易于使用,具有成本效益的解决方案来分析广泛的通用机构,减少了自定义编码的需要,降低了计算成本。该算法采用代数方程,例如使用复数的欧拉形式求解复杂的闭环矢量方程,来模拟和推导表征任何通用闭环机制所需的未知量。算法中实现的Python代码通过利用有关机构的位置、速度和加速度变量的可用信息来适应各种场景。该仿真工具可以实时显示线速度和角速度和加速度的颜色轮廓图(RGB色标),模拟具有多回路和开关配置的机制,并找到逆机制。本文描述了多回路问题的求解方法和求解配置、方法、方程的算法以及图形用户界面功能的实现。以四杆机构为例进行的研究表明,所提出的基于运动学的仿真结果与ANSYS软件的结果非常吻合。这些结果表明,该模拟器可以有效地为涉及多个互连回路的各种通用机构提供低成本和用户友好的仿真结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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