Parry-Sullivan invariant
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In mathematics, the Parry-Sullivan invariant (or Parry-Sullivan number) is a numerical quantity of interest in the study of incidence matrices in graph theory, and of certain one-dimensional dynamical systems. It provides a partial classification of non-trivial irreducible incidence matrices.
It is named after the English mathematician Bill Parry and the American mathematician Dennis Sullivan, who introduced the invariant in a joint paper published in the journal Topology in 1975.
[edit] Definition
Let A be an n × n incidence matrix. Then the Parry-Sullivan number of A is defined to be
- PS(A) = det(I − A),
where I denotes the n × n identity matrix.
[edit] Properties
It can be shown that, for nontrivial irreducible incidence matrices, flow equivalence is completely determined by the Parry-Sullivan number and the Bowen-Franks group.
[edit] Reference
- Parry, W., & Sullivan, D. (1975). "A topological invariant of flows on 1-dimensional spaces". Topology 14: 297-299.
