Survey 1979: Equational Logic - Department of Mathematics ...
Survey 1979: Equational Logic - Department of Mathematics ...
Survey 1979: Equational Logic - Department of Mathematics ...
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52.* __<br />
, Current trends in algebra, Amer. Math. Monthly, 80(1973), 760-782. {1 }<br />
, The rise <strong>of</strong> modem algebra to 1936,41-62 in Men and Institutions in American<br />
55.<br />
<strong>Mathematics</strong>, Graduate Studies, Texas Tech. Univ., 13(1976). { 1,3 }<br />
, The rise <strong>of</strong> modern algebra, 1936-1950, Ibid., 65-85. {1 }<br />
Biryukov, A. P., Varieties <strong>of</strong> idempotent semigroups, Algebra i Logika, 9(1970),<br />
255-273. { 9.4,10,13.6}<br />
Bleicher, M. N., M. Schneider and R. L. Wilson, Permanence <strong>of</strong> identities on algebras, Algebra<br />
Universalis, 3(1973), 72-93. {3 }<br />
56. Blok, W. J., and P. Dwinger, <strong>Equational</strong> classes <strong>of</strong> closure algebras, Indag. Math., 37(1975),<br />
189-198.<br />
57. Bloom, S. L., Varieties <strong>of</strong> ordered algebras, J. Computers and System Sci., 13(1976),<br />
200-212. {3}<br />
58. Boardman, J. M., Homotopy structures and the language <strong>of</strong> trees, 37-58 in: Algebraic Topology<br />
(Conference, Madison, 1970). A. Liulevicius, ed., Symposia in Pure Math., Vol. 22. {7,17.8}<br />
59. Bolbot, A.D., Varieties <strong>of</strong>2-algebras, Algebra i Logika, 9(1970), 406-414. { 13}<br />
60. , Varieties <strong>of</strong>quasigroups, Algebra i Logika, 13(1972), 252-271.<br />
61. Boone, W. W., The word problem, Ann. Math. (2), 70(1959), 207-265. { 12 }<br />
62. Boone, W. W., F. B. Cannonito and R. C. Lyndon (eds.), Decision problems and Burnside<br />
Problems in group theory, Studies in <strong>Logic</strong> and Foundations, Vol. 71, North-Holland,<br />
1973. { [66] ,[302] ,[329] }<br />
63. Boone, W. W., and G. Higman, An algebraic characterization <strong>of</strong> groups with soluble word<br />
problem J. Austral. Math. Soc., 18(1974), 41-53. {12}<br />
64. Brainerd, B., Review <strong>of</strong> Cohn [91], Amer. Math. Monthly, 74(1967), 879-880. { Introduction}<br />
65. Britton, J.L., The word problem, Ann. Math.,77(1963), 16-32. {12}<br />
66. , The existence <strong>of</strong> infinite Burnside groups, 67-364 in [62] .{ 14.5}<br />
67. Bruns, G., Free ortholattices, Canad. J. Math., 28(1976), 977-985. { 12 }<br />
68. Bruns, G. and H. Lakser, Injectire hulls <strong>of</strong> semilattices, Canad. Math. Bull., 13(1970),<br />
115-118. {14.9}<br />
69. Bryars, D. A., On the syntactic characterization <strong>of</strong> some model-theoretic relations, Ph.D. thesis,<br />
London, 1973. {14.6}<br />
70. Bichi, J. R., Transfinite automata recursions and the weak second order theory <strong>of</strong> ordinals,<br />
The 1964 International Congress for <strong>Logic</strong>, Methodology and Philosophy <strong>of</strong> Science<br />
(Jerusalem, 1964), North-Holland. {12}<br />
71. Budkin, A. I., Semivarieties and Schreier varieties <strong>of</strong> unary algebras, Math. Notes Ak. Sci.,<br />
USSR, 15(1974), 150-154. {14.12 }<br />
72. Bulman-Fleming, S., I. Fleischer and K. Keimel, Semilattices with additional endomorphisms<br />
which are equationally compact, Proc. Amer. Math. Soc., to appear. {14.8}<br />
73.* Bulman-Flerrdng, S., and W. Taylor, Union indecomposable varieties, Colloq. Math., 35(1976),<br />
189-199. { 15}<br />
74. Burris, S., On the structure <strong>of</strong> the lattice <strong>of</strong> equational classes L(r), Algebra Universalis,<br />
1(1971), 39-45. {5,13}<br />
75. , Models in equational theories <strong>of</strong> unary algebras, Algebra Universalis, 1(1972),<br />
386-392. {12.2 }<br />
77.*<br />
78.<br />
, Subdirect representation in axiomatic classes, Colloq. Math., 34(1976),<br />
191-197. {4}<br />
, Boolean powers, Algebra Universalis, 5(1976), 341-360.<br />
Burris, S., and E. Nelson, Embedding the dual <strong>of</strong> II m in the lattice <strong>of</strong> equationalclasses <strong>of</strong><br />
commutative semigroups, Proc. Amer. Math. Soc., 30(1971), 37-39. { 11,13.5 }<br />
55