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MMMACNS
2005
Springer
2005
Springer
Networks, Markov Lie Monoids, and Generalized Entropy
The continuous general linear group in n dimensions can be decomposed into two Lie groups: (1) an n(n-1) dimensional ‘Markov type’ Lie group that is defined by preserving the sum of the components of a vector, and (2) the n dimensional Abelian Lie group, A(n), of scaling transformations of the coordinates. With the restriction of the first Lie algebra parameters to non-negative values, one obtains exactly all Markov transformations in n dimensions that are continuously connected to the identity. Networks are defined by a set of n nodes (points) along with the connections among some pairs of nodes. Such a network can be represented by a connection (or connectivity, or adjancy) matrix Cij whose off-diagonal elements give the non-negative ‘strength’ of the connection between nodes i and j in the network. In this work we show that every network, as defined by its C matrix, is in one to one correspondence to one element of the Markov monoid of the same dimensionality. It follows th...
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| Added | 28 Jun 2010 |
| Updated | 28 Jun 2010 |
| Type | Conference |
| Year | 2005 |
| Where | MMMACNS |
| Authors | Joseph E. Johnson |
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