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Список публикаций:
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Цитирования (Crossref Cited-By Service + Math-Net.Ru) |
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1. |
E. W. H. Lee, “Identity bases for some non-exact varieties”, Semigroup Forum, 68:3 (2004), 445–457 [pdf]
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24
[x]
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2. |
M. Jackson, E. W. H. Lee, “Monoid varieties with extreme properties”, Trans. Amer. Math. Soc., 370:7 (2018), 4785–4812
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19
[x]
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3. |
E. W. H. Lee, “Finitely based finite involution semigroups with non-finitely based reducts”, Quaest. Math., 39:2 (2016), 217–243
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18
[x]
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4. |
E. W. H. Lee, W. T. Zhang, “Finite basis problem for semigroups of order six”, LMS J. Comput. Math., 18:1 (2015), 1–129
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16
[x]
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5. |
E. W. H. Lee, J. R. Li, W. T. Zhang, “Minimal non-finitely based semigroups”, Semigroup Forum, 85:3 (2012), 577–580 [pdf]
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16
[x]
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6. |
E. W. H. Lee, “Combinatorial Rees–Sushkevich varieties are finitely based”, Internat. J. Algebra Comput., 18:5 (2008), 957–978
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16
[x]
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7. |
E. W. H. Lee, “Subvarieties of the variety generated by the five-element Brandt semigroup”, Internat. J. Algebra Comput., 16:2 (2006), 417–441
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16
[x]
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8. |
E. W. H. Lee, “Finite involution semigroups with infinite irredundant bases of identities”, Forum Math., 28:3 (2016), 587–607
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15
[x]
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9. |
E. W. H. Lee, “Finite basis problem for semigroups of order five or less: generalization and revisitation”, Studia Logica, 101:1 (2013), 95–115 [pdf]
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15
[x]
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10. |
E. W. H. Lee, “Maximal Specht varieties of monoids”, Mosc. Math. J., 12:4 (2012), 787–802
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15
[x]
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11. |
E. W. H. Lee, M. V. Volkov, “Limit varieties generated by completely 0-simple semigroups”, Internat. J. Algebra Comput., 21:1–2 (2011), 257–294
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15
[x]
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12. |
E. W. H. Lee, J. R. Li, “Minimal non-finitely based monoids”, Dissertationes Math., 475 (2011), 65 pp.
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13
[x]
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13. |
E. W. H. Lee, M. V. Volkov, “On the structure of the lattice of combinatorial Rees–Sushkevich varieties”, Semigroups and Formal Languages, eds. Jorge M. André, Vítor H. Fernandes, Mário J. J. Branco, Gracinda M. S. Gomes, John Fountain, John C. Meakin, World Scientific, Singapore, 2007, 164–187
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13
[x]
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14. |
E. W. H. Lee, “On a class of completely join prime $J$-trivial semigroups with unique involution”, Algebra Universalis, 78:2 (2017), 131–145 [pdf]
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12
[x]
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15. |
E. W. H. Lee, “Hereditarily finitely based monoids of extensive transformations”, Algebra Universalis, 61:1 (2009), 31–58 [pdf]
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11
[x]
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16. |
S. I. Kublanovsky, E. W. H. Lee, N. R. Reilly, “Some conditions related to the exactness of Rees–Sushkevich varieties”, Semigroup Forum, 76:1 (2008), 87–94 [pdf]
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11
[x]
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17. |
E. W. H. Lee, “Minimal semigroups generating varieties with complex subvariety lattices”, Internat. J. Algebra Comput., 17:8 (2007), 1553–1572 (Corrigendum: Internat. J. Algebra Comput. 18:6 (2008), 1099–1100)
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11
[x]
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18. |
C. C. Edmunds, E. W. H. Lee, K. W. K. Lee, “Small semigroups generating varieties with continuum many subvarieties”, Order, 27:1 (2010), 83–100 [pdf]
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10
[x]
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19. |
E. W. H. Lee, “Finitely generated limit varieties of aperiodic monoids with central idempotents”, J. Algebra Appl., 8:6 (2009), 779–796
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10
[x]
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20. |
E. W. H. Lee, “On the complete join of permutative combinatorial Rees–Sushkevich varieties”, Int. J. Algebra, 1:1–4 (2007), 1–9
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10
[x]
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21. |
E. W. H. Lee, “Almost Cross varieties of aperiodic monoids with central idempotents”, Beitr. Algebra Geom., 54:1 (2013), 121–129 [pdf]
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9
[x]
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22. |
E. W. H. Lee, “A sufficient condition for the non-finite basis property of semigroups”, Monatsh. Math., 168:3–4 (2012), 461–472 [pdf]
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9
[x]
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23. |
E. W. H. Lee, “Combinatorial Rees–Sushkevich varieties that are Cross, finitely generated, or small”, Bull. Aust. Math. Soc., 81:1 (2010), 64–84
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8
[x]
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24. |
E. W. H. Lee, Advances in the Theory of Varieties of Semigroups, Frontiers in Mathematics, Birkhäuser, Cham, 2023 , xv+287 pp.
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7
[x]
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25. |
S. V. Gusev, E. W. H. Lee, “Varieties of monoids with complex lattices of subvarieties”, Bull. Lond. Math. Soc., 52:4 (2020), 762–775
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7
[x]
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26. |
E. W. H. Lee, “Inherently non-finitely generated varieties of aperiodic monoids with central idempotents”, Вопросы теории представлений алгебр и групп. 26, Зап. научн. сем. ПОМИ, 423, ПОМИ, СПб., 2014, 166–182 ; E. W. H. Lee, “Inherently non-finitely generated varieties of aperiodic monoids with central idempotents”, J. Math. Sci. (N. Y.), 209:4 (2015), 588–599 [pdf]
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7
[x]
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27. |
E. W. H. Lee, “Finite basis problem for 2-testable monoids”, Cent. Eur. J. Math., 9:1 (2011), 1–22 [pdf]
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7
[x]
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28. |
S. V. Gusev, E. W. H. Lee, B. M. Vernikov, “The lattice of varieties of monoids”, Japan. J. Math., 17:2 (2022), 117–183 [pdf]
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6
[x]
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29. |
E. W. H. Lee, “Varieties of involution monoids with extreme properties”, Q. J. Math., 70:4 (2019), 1157–1180
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6
[x]
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30. |
E. W. H. Lee, “On certain Cross varieties of aperiodic monoids with commuting idempotents”, Results Math., 66:3–4 (2014), 491–510 [pdf]
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6
[x]
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31. |
E. W. H. Lee, “On identity bases of exclusion varieties for monoids”, Comm. Algebra, 35:7 (2007), 2275–2280
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6
[x]
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32. |
E. W. H. Lee, “On a simpler basis for the pseudovariety EDS”, Semigroup Forum, 75:2 (2007), 477–479 [pdf]
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6
[x]
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33. |
E. W . H. Lee, N. R. Reilly, “Centrality in Rees–Sushkevich varieties”, Algebra Universalis, 58:2 (2008), 145–180 [pdf]
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5
[x]
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34. |
S. V. Gusev, E. W. H. Lee, “Cancellable elements of the lattice of monoid varieties”, Acta Math. Hungar., 165:1 (2021), 156–168 [pdf]
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4
[x]
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35. |
E. W. H. Lee, “Non-Specht variety generated by an involution semigroup of order five”, Тр. ММО, 81, № 1, МЦНМО, М., 2020, 105–115 ; E. W. H. Lee, “Non-Specht variety generated by an involution semigroup of order five”, Trans. Moscow Math. Soc., 81:1 (2020), 87–95
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4
[x]
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36. |
E. W. H. Lee, “Varieties generated by unstable involution semigroups with continuum many subvarieties”, C. R. Math. Acad. Sci. Paris, 356:1 (2018), 44–51
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4
[x]
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37. |
E. W. H. Lee, J. R. Li, “The variety generated by all monoids of order four is finitely based”, Glas. Mat. Ser. III, 50:2 (2015), 373–396
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4
[x]
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38. |
E. W. H. Lee, “Varieties generated by 2-testable monoids”, Studia Sci. Math. Hungar., 49:3 (2012), 366–389
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4
[x]
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39. |
E. W. H. Lee, “Cross varieties of aperiodic monoids with central idempotents”, Port. Math., 68:4 (2011), 425–429
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4
[x]
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40. |
E. W. H. Lee, N. R. Reilly, “The intersection of pseudovarieties of central simple semigroups”, Semigroup Forum, 73:1 (2006), 75–94 [pdf]
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4
[x]
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41. |
E. W. H. Lee, “Intervals of varieties of involution semigroups with contrasting reduct intervals”, Boll. Unione Mat. Ital., 15:4 (2022), 527–540 [pdf]
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3
[x]
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42. |
E. W. H. Lee, J. Rhodes, B. Steinberg, “On join irreducible $J$-trivial semigroups”, Rend. Semin. Mat. Univ. Padova, 147 (2022), 43–78
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2
[x]
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43. |
E. W. H. Lee, J. Rhodes, B. Steinberg, “Join irreducible semigroups”, Internat. J. Algebra Comput., 29:7 (2019), 1249–1310
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2
[x]
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44. |
E. W. H. Lee, “Equational theories of unstable involution semigroups”, Electron. Res. Announc. Math. Sci., 24 (2017), 10–20
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2
[x]
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45. |
E. W. H. Lee, “Lyndon's groupoid generates a small almost Cross variety”, Algebra Universalis, 60:2 (2009), 239–246 [pdf]
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2
[x]
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46. |
E. W. H. Lee, “A minimal pseudo-complex monoid”, Arch. Math. (Basel), 120:1 (2023), 15–25 [pdf]
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1
[x]
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47. |
E. W. H. Lee, “Variety membership problem for two classes of non-finitely based semigroups”, Wuhan Univ. J. Nat. Sci., 23:4 (2018), 323–327 [pdf]
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1
[x]
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48. |
E. W. H. Lee, “On a question of Pollák and Volkov regarding hereditarily finitely based identities”, Period. Math. Hungar., 68:2 (2014), 128–134 [pdf]
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1
[x]
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49. |
E. W. H. Lee, “Maximal normal orthogroups in rings containing no infinite semilattices”, Comm. Algebra, 34:1 (2006), 323–334
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1
[x]
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50. |
J. Araújo, J. P. Araújo, P. J. Cameron, E. W. H. Lee, J. Raminhos, “A survey on varieties generated by small semigroups and a companion website”, J. Algebra, 635 (2023), 698–735 |
51. |
E. W. H. Lee, “Embedding finite involution semigroups in matrices with transposition”, Discrete Appl. Math., 340 (2023), 327–330 |
52. |
E. W. H. Lee, “Join irreducible 2-testable semigroups”, Discuss. Math. Gen. Algebra Appl., 41:1 (2021), 103–112 |
53. |
E. W. H. Lee, Contributions to the Theory of Varieties of Semigroups, D.Sc. thesis, National Research University Higher School of Economics, Moscow, 2020 , 300 pp. [VAK] |
54. |
E. W. H. Lee, “Locally finite monoids in finitely based varieties”, Log. J. IGPL, 27:5 (2019), 743–745 |
55. |
E. W. H. Lee, “Non-finitely based finite involution semigroups with finitely based semigroup reducts”, Korean J. Math., 27:1 (2019), 53–62 |
56. |
E. W. H. Lee, “A sufficient condition for the absence of irredundant bases”, Houston J. Math., 44:2 (2018), 399–411 [pdf] |
57. |
E. W. H. Lee, “A class of finite semigroups without irredundant bases of identities”, Yokohama Math. J., 61 (2015), 1–28 [link] |
58. |
E. W. H. Lee, W. T. Zhang, “The smallest monoid that generates a non-Cross variety”, Xiamen Daxue Xuebao Ziran Kexue Ban, 53:1 (2014), 1–4 |
59. |
E. W. H. Lee, “Finitely based monoids obtained from non-finitely based semigroups”, Univ. Iagel. Acta Math., 51 (2013), 45–49 |
60. |
E. W. H. Lee, “Finite basis problem for the direct product of some $J$-trivial monoid with groups of finite exponent”, Vestn. St.-Peterbg. Univ. Ser. 1. Mat. Mekh. Astron., 2013, no. 4, 60–64 |
61. |
E. W. H. Lee, “On a semigroup variety of György Pollák”, Novi Sad J. Math., 40:3 (2010), 67–73 [pdf] |
62. |
E. W. H. Lee, “On the variety generated by some monoid of order five”, Acta Sci. Math. (Szeged), 74:3–4 (2008), 509–537 |
63. |
E. W. H. Lee, “Maximal Clifford semigroups of matrices”, Sarajevo J. Math., 2:2 (2006), 147–152 [pdf] |
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