Generalization of the Multiplicative and Additive Compounds of Square Matrices and Contraction Theory in the Hausdorff Dimension

Author(s)

Wu, Chengshuai; Pines, Raz; Margaliot, Michael; Slotine, Jean-Jacques

Abstract

The k multiplicative and k additive compounds of a matrix play an important role in geometry, multilinear algebra, the asymptotic analysis of nonlinear dynamical systems, and in bounding the Hausdorff dimension of fractal sets. These compounds are defined for the integer values of k . Here, we introduce generalizations called the α multiplicative and α additive compounds of a square matrix, with α real. We study the properties of these new compounds and demonstrate an application in the context of the Douady and Oesterlé theorem. Our results lead to a generalization of contracting systems to α -contracting systems, with α real. Roughly speaking, the dynamics of such systems contracts any set with the Hausdorff dimension larger than α . For α=1 , they reduce to standard contracting systems. We demonstrate our theoretical results by designing a state-feedback controller for a classical chaotic system, guaranteeing the well-ordered behavior of the closed-loop system.

Date issued

2022-09

URI

https://hdl.handle.net/1721.1/155762

Department

Massachusetts Institute of Technology. Department of Mechanical Engineering
Massachusetts Institute of Technology. Department of Brain and Cognitive Sciences

Journal

IEEE Transactions on Automatic Control

Publisher

Institute of Electrical and Electronics Engineers

Citation

C. Wu, R. Pines, M. Margaliot and J. -J. Slotine, "Generalization of the Multiplicative and Additive Compounds of Square Matrices and Contraction Theory in the Hausdorff Dimension," in IEEE Transactions on Automatic Control, vol. 67, no. 9, pp. 4629-4644, Sept. 2022, doi: 10.1109/TAC.2022.3162547.

Version: Author's final manuscript

ISSN

0018-9286

1558-2523

2334-3303