Oligomorphic group

In group theory, a branch of mathematics, an oligomorphic group is a particular kind of permutation group. If a group G acts on a set S (usually infinite), then G is said to be oligomorphic if this action has only finitely many orbits on every Cartesian product Sⁿ of S (n-tuples of elements of S for every natural number n). The interest in oligomorphic groups is partly based on their application to model theory, e.g. automorphisms in countably categorical theories.^[1]

References

↑ Bhattacharjee, Meenaxi; Macpherson, Dugald; Möller, Rögnvaldur G.; Neumann, Peter M. (1998). Notes on infinite permutation groups. Lecture Notes in Mathematics. 1698. Berlin: Springer-Verlag. p. 83. ISBN 3-540-64965-4.

Cameron, Peter J. (1990). Oligomorphic permutation groups. London Mathematical Society Lecture Note Series. 152. Cambridge: Cambridge University Press. ISBN 0-521-38836-8.

External links

Oligomorphic permutation groups - Isaac Newton Institute preprint, Peter J. Cameron

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[1] Bhattacharjee, Meenaxi; Macpherson, Dugald; Möller, Rögnvaldur G.; Neumann, Peter M. (1998). Notes on infinite permutation groups. Lecture Notes in Mathematics. 1698. Berlin: Springer-Verlag. p. 83. ISBN 3-540-64965-4.

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