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, Volume 5, Issue 3, pp 221–223 | Cite as

Obituary: Evelyn M. Nelson

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Publications

  1. 1.
    Finiteness of semigroups of operators in universal algebra, Can. J. Math. 19 (1967) 764–768; MR35 (1968) # 6606.Google Scholar
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    With B. Banaschewski, Elementary properties of limit reduced powers with application to Boolean powers. Contributions to Universal Algebra (Collow. Jzsef Attila Univ., Szeged), pp. 21–25, Colloq. Math. Soc. Jnos Bolyai, Vol. 17, North Holland, Amsterdam, 1977, MR58 (1979) # 5178.Google Scholar
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    Algebras of continuous functions in universal algebra. General topology and its relations to modern analysis and algebra IV. (Proc. Fourth Prague Topological Sympos., Prague, 1976), Part B, pp. 331–332. Soc. Czech. Math. and Phys. Prague 1977, MR58 (1979) # 5466.Google Scholar
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    With B. Banaschewski, On the non-existence of injective near-ring modules, Can. Math. Bull. 20 (1977) 17–23; MR57 (1979) # 12612.Google Scholar
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    Internal hom functors for polarities, Can. Math. Bull. 22 (1979) 187–202.Google Scholar
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    With B. Banaschewski, Boolean powers as algebras of continuous functions, Dissertationes Mathematicae CLXXILX (1980) 5–55; MR8 li: 03040.Google Scholar
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    The independence of the subalgebra lattice, congruence lattice, and automorphism group of an infinitary algebra, J. Pure Appl. Alg. 17 (1980) 187–201; MR81g: 08003.Google Scholar
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    An elementary proof that there are no non-trivial injective lattices, Alg. Univ. 10 (1980) 164–265; MR81c: 06009.Google Scholar
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    Categorical and topological aspects of formal languages, Math. Systems Theory 13 (1980) 255–273; MR82a: 68149.Google Scholar
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    On exponentiating exponentiation, J. Pure Appl. Alg. 20 (1981) 79–91; MR82c: 18010.Google Scholar
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    Z-Continuous algebras, Proc. Continuous Lattices Workshop IV, Bremen, 1979. Lecture Notes in Mathematics Vol. 871, pp. 315–334, Springer, 1981.Google Scholar
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    Homomorphisms of mono-unary algebras, Pacific J. Math 99 (1982) 427–429.Google Scholar
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    With J. Adamek and J. Reiterman, Tree constructions of free continuous algebras. J. Comput. System. Sci. 24 (1982) 114–146.Google Scholar
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    With B. Banaschewski, Completions of partially ordered sets as reflections, SIAM J. Comput. 11 (1982) 521–528.Google Scholar
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    Iterative Algebras, Theoret. Comput. Sci. 25 (1983) 67–94.Google Scholar
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    With J. Adamek, Separately continous algebras, Theoret. Comput. Sci. 27 (1983) 225–231.Google Scholar
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    Recent results on continuous ordered algebras, FCT 1985, Cottbus. LNCS 199, pp. 320–330. Springer 1985.Google Scholar
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    With Octavio Garcia, On the non-existence of free complete distributive lattices, Order 1 (1985) 399–403.Google Scholar
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    With J. Adamek, J. Reiterman, and V. Koubek, Arbitrarily large continuous algebras on one generator, Trans. A.M.S. 291 (1985) 681–699.Google Scholar
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    With J. Adamek and J. Reiterman, The Birkhoff variety theorem for continous algebras, Alg. Univ. 20 (1985) 328–350.Google Scholar
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    With J. Adamek and J. Reiterman, Continous semilattices, Theoret. Comput. Sci. 43 (1986) 293–313.Google Scholar
  42. 42.
    With J. Adamek, Absolutely definable varieties of continuous algebras, Alg. Univ. (to appear).Google Scholar
  43. 43.
    With J. Adamek and A. Mekler, On the logic of continuous algebras, Notre Dame J. Formal Logic (to appear).Google Scholar
  44. 44.
    With A. Mekler and S. Shelah, A variety with solvable, but not uniformly solvable, word problem. (submitted).Google Scholar
  45. 45.
    with J. Adamek, J. Reiterman, and A. Tarlecki, Comparison of subset systems.Google Scholar

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© Kluwer Academic Publishers 1988

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