Stone algebra
In mathematics, a Stone algebra, or Stone lattice, is a pseudo-complemented distributive lattices such that a* ∨a** = 1. They were introduced by Grätzer & Schmidt (1957) and named after Marshall Harvey Stone.
Boolean algebras are Stone algebras, and Stone algebras are Ockham algebras.
Examples:
- The open-set lattice of an extremally disconnected space is a Stone algebra.
- The lattice of positive divisors of a given positive integer is a Stone lattice.
See also
References
- Balbes, Raymond (1970), "A survey of Stone algebras", Proceedings of the Conference on Universal Algebra (Queen's Univ., Kingston, Ont., 1969), Kingston, Ont.: Queen's Univ., pp. 148–170, MR 0260638
- Fofanova, T.S. (2001), "Stone lattice", in Hazewinkel, Michiel, Encyclopedia of Mathematics, Springer, ISBN 978-1-55608-010-4
- Grätzer, George; Schmidt, E. T. (1957), "On a problem of M. H. Stone", Acta Mathematica Academiae Scientiarum Hungaricae, 8: 455–460, doi:10.1007/BF02020328, ISSN 0001-5954, MR 0092763
- Grätzer, George (1971), Lattice theory. First concepts and distributive lattices, W. H. Freeman and Co., ISBN 978-0-486-47173-0, MR 0321817
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