A Geometric Task-Space Port-Hamiltonian Formulation for Redundant Manipulators

Abstract

We present a novel geometric port-Hamiltonian formulation of redundant manipulators performing a differential kinematic task η=J(q)q, where q is a point on the configuration manifold, η is a velocity-like task space variable, and J(q) is a linear map representing the task, for example the classical analytic or geometric manipulator Jacobian matrix. The proposed model emerges from a change of coordinates from canonical Hamiltonian dynamics, and splits the standard Hamiltonian momentum variable into a task-space momentum variable and a null-space momentum variable. Properties of this model and relation to Lagrangian formulations present in the literature are highlighted. Finally, we apply the proposed model in an Interconnection and Damping Assignment Passivity-Based Control (IDA-PBC) design to stabilize and shape the impedance of a 7-DOF Emika Panda robot in simulation.