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Measure algebras of locally compact semilattices

Part of the Lecture Notes in Mathematics book series (LNM,volume 998)

Keywords

  • Compact Subset
  • Finite Subset
  • Compact Abelian Group
  • Nonempty Compact Subset
  • Maximal Ideal Space

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References

  1. Baartz, A., The measure algebra of a locally compact semigroup, Pac. J. Math. 21 (1967), 199–214.

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  2. Gierz, G., et al., A Compendium of Continuous Lattices, Springer-Verlag, Heidelberg, New York (1980), 371 pp.

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  3. Hewitt, E. and S. Kakutani, A class of multiplicative linear functionals on the measure algebras of a locally compact abelian group, Illinois J. Math. 4 (1960), 553–574.

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  4. Lawson, J. D., J. Liukkonen, and M. Mislove, Measure algebras of semilattices of finite breadth, Pac. J. Math. 69 (1977), 125–139.

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  5. Newman, S. E., Measure algebras on idempotent semigroups, Pac. J. Math. 31 (1969), 161–169.

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  6. Rudin, W., Fourier Analysis on Groups, John Wiley & Sons, New York (1960), 285 pp.

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  7. Taylor, J., Measure algebras, CBMS Regional Conference Series in Mathematics 16 (1972), 108 pp.

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© 1983 Springer-Verlag

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Liukkonen, J.R., Mislove, M. (1983). Measure algebras of locally compact semilattices. In: Hofmann, K.H., Jürgensen, H., Weinert, H.J. (eds) Recent Developments in the Algebraic, Analytical, and Topological Theory of Semigroups. Lecture Notes in Mathematics, vol 998. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0062030

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  • DOI: https://doi.org/10.1007/BFb0062030

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  • Publisher Name: Springer, Berlin, Heidelberg

  • Print ISBN: 978-3-540-12321-7

  • Online ISBN: 978-3-540-40051-6

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