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Communications in Analysis and Mechanics最新文献

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Pure rolling motion of hyperquadrics in pseudo-Euclidean spaces 伪欧几里德空间中超二次曲面的纯滚动运动
Pub Date : 2022-01-12 DOI: 10.3934/jgm.2021033
André Marques, Fátima Silva Leite
<p style='text-indent:20px;'>This paper is devoted to rolling motions of one manifold over another of equal dimension, subject to the nonholonomic constraints of no-slip and no-twist, assuming that these motions occur inside a pseudo-Euclidean space. We first introduce a definition of rolling map adjusted to this situation, which generalizes the classical definition of Sharpe [<xref ref-type="bibr" r>26</xref>] for submanifolds of an Euclidean space. We also prove some important properties of these rolling maps. After presenting the general framework, we analyse the particular rolling of hyperquadrics embedded in pseudo-Euclidean spaces. The central topic is the rolling of a pseudo-hyperbolic space over the affine space associated with its tangent space at a point. We derive the kinematic equations, as well as the corresponding explicit solutions for two specific cases, and prove the existence of a rolling map along any curve in that rolling space. Rolling of a pseudo-hyperbolic space on another and rolling of pseudo-spheres are equally treated. Finally, for the central theme, we write the kinematic equations as a control system evolving on a certain Lie group and prove its controllability. The choice of the controls corresponds to the choice of a rolling curve.</p>
<p style='text-indent:20px;'>本文研究在非完整的无滑移和无扭转约束下,一个流形在另一个等维流形上的滚动运动,假设这些运动发生在伪欧几里德空间内。我们首先引入了针对这种情况的滚动映射的定义,它推广了经典的欧几里得空间子流形Sharpe [<xref ref-type="bibr" >26</xref>]的定义。我们还证明了这些滚动映射的一些重要性质。在给出一般框架之后,我们分析了嵌入在伪欧几里德空间中的超二次曲面的特殊滚动问题。中心主题是伪双曲空间在仿射空间上的滚动,仿射空间与其切线空间在一点上相关联。导出了两种特殊情况下的运动方程和相应的显式解,并证明了该滚动空间中任意曲线上的滚动映射的存在性。伪双曲空间在另一个伪双曲空间上的滚动与伪球面的滚动是同等对待的。最后,对于中心主题,我们将运动学方程写成在某李群上演化的控制系统,并证明了其可控性。控制的选择对应于滚动曲线的选择。</p>
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引用次数: 0
Efficient geometric linearization of moving-base rigid robot dynamics 运动基座刚性机器人动力学的有效几何线性化
Pub Date : 2022-01-01 DOI: 10.3934/jgm.2022009
Martijn Bos,Silvio Traversaro,Daniele Pucci,Alessandro Saccon
<p style='text-indent:20px;'>The linearization of the equations of motion of a robotics system about a given state-input trajectory, including a controlled equilibrium state, is a valuable tool for model-based planning, closed-loop control, gain tuning, and state estimation. Contrary to the case of fixed based manipulators with prismatic or revolute joints, the state space of moving-base robotic systems such as humanoids, quadruped robots, or aerial manipulators cannot be globally parametrized by a finite number of independent coordinates. This impossibility is a direct consequence of the fact that the state of these systems includes the system's global orientation, formally described as an element of the special orthogonal group SO(3). As a consequence, obtaining the linearization of the equations of motion for these systems is typically resolved, from a practical perspective, by locally parameterizing the system's attitude by means of, e.g., Euler or Cardan angles. This has the drawback, however, of introducing artificial parameterization singularities and extra derivative computations. In this contribution, we show that it is actually possible to define a notion of linearization that does not require the use of a local parameterization for the system's orientation, obtaining a mathematically elegant, recursive, and singularity-free linearization for moving-based robot systems. Recursiveness, in particular, is obtained by proposing a nontrivial modification of existing recursive algorithms to allow for computations of the geometric derivatives of the inverse dynamics and the inverse of the mass matrix of the robotic system. The correctness of the proposed algorithm is validated by means of a numerical comparison with the result obtained via geometric finite difference.</p>
<p style='text-indent:20px;'>机器人系统关于给定状态输入轨迹(包括受控平衡状态)的运动方程的线性化,是基于模型的规划、闭环控制、增益调谐和状态估计的宝贵工具。与具有移动关节或旋转关节的固定基机械臂不同,移动基机器人系统(如人形机器人、四足机器人或空中机械臂)的状态空间不能由有限数量的独立坐标进行全局参数化。这种不可能性是这样一个事实的直接结果,即这些系统的状态包括系统的全局方向,正式描述为特殊正交群SO(3)的一个元素。因此,从实用的角度来看,通常可以通过欧拉角或卡丹角等局部参数化系统的姿态来解决这些系统运动方程的线性化问题。然而,这样做的缺点是引入了人为的参数化奇点和额外的导数计算。在这篇文章中,我们表明,实际上有可能定义线性化的概念,而不需要使用系统方向的局部参数化,从而为基于移动的机器人系统获得数学上优雅的、递归的、无奇点的线性化。递归性,特别是,通过提出一个非平凡的修改现有递归算法,以允许计算逆动力学的几何导数和机器人系统的质量矩阵的逆。通过与几何有限差分法计算结果的数值比较,验证了所提算法的正确性。
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引用次数: 0
From Schouten to Mackenzie: Notes on brackets 从舒滕到麦肯齐:括号注释
Pub Date : 2021-07-15 DOI: 10.3934/jgm.2021013
Yvette Kosmann-Schwarzbach
In this paper, dedicated to the memory of Kirill Mackenzie, I relate the origins and early development of the theory of graded Lie brackets, first in the publications on differential geometry of Schouten, Nijenhuis, and Frölicher–Nijenhuis, then in the work of Gerstenhaber and Nijenhuis–Richardson in cohomology theory.
在这篇纪念基里尔·麦肯锡(Kirill Mackenzie)的论文中,我首先在Schouten、Nijenhuis和Frölicher-Nijenhuis关于微分几何的出版物中介绍了分级李氏托槽理论的起源和早期发展,然后在Gerstenhaber和Nijenhuis - richardson在上同调理论中的工作中介绍了分级李氏托槽理论。
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引用次数: 0
Erratum: Constraint algorithm for singular field theories in the begin{document}$ k $end{document}-cosymplectic framework Erratum: Constraint algorithm for singular field theories in the begin{document}$ k $end{document}-cosymplectic framework
Pub Date : 2021-05-12 DOI: 10.3934/jgm.2021007
Xavier Gràcia, Xavier Rivas, Narciso Román-Roy
Erratum note for "Constraint algorithm for singular field theories in the $ k $-cosymplectic framework".
“k -余辛框架下奇异场论的约束算法”的勘误注。
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引用次数: 0
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Communications in Analysis and Mechanics
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