Title :
A notion of generalized graph Laplacian and its application to distributed consensus algorithm
Author_Institution :
Shibaura Inst. of Technol., Tokyo, Japan
Abstract :
In order to describe the interconnection among agents with multi-dimensional states, we generalize the notion of graph Laplacian by extending the adjacency weights from positive scalars to positive definite matrices. We prove that the generalized graph Laplacian inherits the spectral properties of the graph Laplacian. As an application example, we use the generalized graph Laplacian to establish a distributed consensus algorithm for agents described by multi-dimensional integrators.
Keywords :
Laplace equations; distributed algorithms; graph theory; multi-agent systems; adjacency weights; agents interconnection; distributed consensus algorithm; generalized graph Laplacian notion; multidimensional integrator; positive definite matrices; Laplace equations; Nickel; adjacency weights; cooperative control; distributed consensus algorithm; generalized graph Laplacian; graph Laplacian;
Conference_Titel :
Advanced Mechatronic Systems (ICAMechS), 2011 International Conference on
Conference_Location :
Zhengzhou
Print_ISBN :
978-1-4577-1698-0
