Publication list of Lajos Soukup
  1. Hajnal, A.; Juhász, I.; Soukup, L. On saturated almost disjoint families. Comment. Math. Univ. Carolin. 28 (1987), no. 4, 629-633.
  2. Hajnal, A.; Komjáth, P.; Soukup, L.; Szalkai, I. Decompositions of edge colored infinite complete graphs. Combinatorics (Eger, 1987), 277-280, Colloq. Math. Soc. János Bolyai, 52, North-Holland, Amsterdam,
  3. Juhász, I.; Shelah, S.; Soukup, L. More on countably compact, locally countable spaces. Israel J. Math. 62 (1988), no. 3, 302-310.
  4. Soukup, Lajos On chromatic number of product of graphs. Comment. Math. Univ. Carolin. 29 (1988), no. 1, 1-12.
  5. Hajnal, A.; Nagy, Z.; Soukup, L. On the number of certain subgraphs of graphs without large cliques and independent subsets. A tribute to Paul Erdos, 223-248, Cambridge Univ. Press, Cambridge, 1990.
  6. Soukup, L. On c+-chromatic graphs with small bounded subgraphs. Period. Math. Hungar. 21 (1990), no. 1, 1-7.
  7. Soukup, Lajos A nonspecial omega2-tree with special omega1-subtrees. Comment. Math. Univ. Carolin. 31 (1990), no. 3, 607-612.
  8. L. Soukup, On omega2-saturated families , Comment. Math. Univ. Carol, 32,2 (1991), pp. 355-359.
  9. I. Juhász, Z. Nagy, L. Soukup, and Z. Szentmiklóssy, The long club , in Sets, graphs and numbers, vol. 60 of Coll. Math. Soc. János Bolyai, Budapest,Hungary, 1991, North Holland, Amsterdam, 1992, pp. 411-419.
  10. L. Soukup, Certain L-spaces under CH, Topology and its Applications, 47 (1992), pp. 1-7.
  11. L. Soukup, Martin Axiómával konzisztens tulajdonságokról. kandidátusi értekezés, megvédve 1993-ban.
  12. S. Shelah and L. Soukup, The existence of large omega1-homogeneous but not omega-homogeneous permutation groups is consistent with ZFC + GCH , J. London. Math. Soc., 48 (1993), pp. 193-203.
  13. S. Shelah and L. Soukup, On the number of non-isomorphic subgraphs, Israel J. Math, 86 (1994), pp. 349-371.
  14. I. Juhász, L. Soukup, and Z. Szentmiklóssy, What makes a topological space have large weight? , Topology and its Applications, 57 (1994), pp. 271-285.
  15. S. Fuchino, S. Shelah, and L. Soukup, On a theorem of Shapiro Math. Japonica, 40 (1994), pp. 199-206.
  16. S. Shelah and L. Soukup, On a problem of D. Monk, Period. Math. Hungar, 30 (1995), pp. 155-163.
  17. P. Nyikos, L. Soukup, and Velickovic, Hereditary normality of gammaN-spaces, Topology and its Applications, 65 (1995), pp. 9-19.
  18. I. Juhász, L. Soukup, and Z. Szentmiklóssy, Forcing countable networks for spaces satisfying R(Xomega)=omega , Comment. Math. Univ. Carol., 37 (1996), pp. 159-170.
  19. I. Juhász, Z. Nagy, L. Soukup, and Z. Szentmiklóssy, Intersection properties of open sets, II , in Papers on general topology and applications. Proceedings of the 10th Summer Conference in General Topology and Applications,1994, E. Coplakova and K. P. Hart, eds., Annals of the New York Academy of Sciences, 788., TU Delft, Netherlands, 1996, New York Acad. Sci., pp. 147-159.
  20. I. Juhász and L. Soukup, How to force a countably tight, initially omega1-compact and non-compact space? , Topology and its Applications, 69 (1996), pp. 227-250.
  21. A. Dow, I. Juhász, L. Soukup, and Z. Szentmiklóssy, More on sequentially compact implying pseudoradial , Topology and its Applications, 73 (1996), pp. 191-195.
  22. Fuchino, Sakaé; Soukup, Lajos More set-theory around the weak Freese-Nation property.

    European Summer Meeting of the Association for Symbolic Logic (Haifa, 1995). Fund. Math. 154 (1997), no. 2, 159-176.

  23. I. Juhász, L. Soukup, and Z. Szentmiklóssy, Combinatorial principles from adding Cohen reals , in Logic Colloquium 95, Proceedings of the Annual European Summer Meeting of the Association of Symbolic Logic, J. A. Makowsky, ed., Lecture Notes in Logic. 11., Haifa, Israel, 1998, Springer, pp. 79-103.
  24. I. Juhász, L. Soukup, and Z. Szentmiklóssy, What is left of CH after you add Cohen reals? , 8th Prague Topological Symposium on General Topology and Its Relations to Modern Analysis and Algebra (1996). Topology Appl. 85 (1998), no. 1-3, 165-174
  25. S. Fuchino, S. Shelah, and L. Soukup, Sticks and clubs , Ann. Pure and Appl. Logic., 90 (1997), no 1-3, pp. 57-77.
  26. J. Roitman and L. Soukup, Luzin and anti-Luzin almost disjoint families , Fundamenta Mathematicae, 158 (1998), pp. 51-67.
  27. L. Soukup, Smooth Graphs , Comment. Math. Univ. Carolin. 40 (1999), no. 1, 187-199.
  28. L. Soukup, Indestructible properties of S- and L-spaces. Topology and its Application. 112 (2001), no 3, pp. 245-257.
  29. Fuchino, Sakaé; Geschke, Stefan; Soukup, Lajos On the weak Freese-Nation property of P(omega). Arch. Math. Logic 40 (2001), no. 6, 425-435.
  30. Fuchino, Sakaé; Geschke, Stefan; Shelah, Saharon; Soukup, Lajos On the weak Freese-Nation property of complete Boolean algebras. Ann. Pure Appl. Logic 110 (2001), no. 1-3, 89-105.
  31. Juhász, István; Soukup, Lajos; Szentmiklóssy, Zoltán A consistent example of a hereditarily c-Lindelöf first countable space of size > c. Set theory (Piscataway, NJ, 1999), 95-98, DIMACS Ser. Discrete Math. Theoret. Comput. Sci., 58, Amer. Math. Soc., Providence, RI, 2002.
  32. Juhász, István; Shelah, Saharon; Soukup, Lajos; Szentmiklóssy, Zoltán A tall space with a small bottom. Proc. Amer. Math. Soc. 131 (2003), no. 6, 1907-1916.
  33. L. Soukup, Scattered spaces, in Encyclopedia of General Topology, Hart, K. P.; Nagata, J.; Vaughan, J. E. (eds) Elsevier Science Publishers, B.V., Amsterdam, 2004. pp. 350-353.
  34. Gerlits, János; Juhász, István; Soukup, Lajos; Szentmiklóssy, Zoltán, Characterizing continuity by preserving compactness and connectedness. Top. Appl. 138 (2004), pp.  21-44.
  35. L. Soukup, A piecewise Toronto space, Studia Sci. Math. Hungar. 41 (2004), no. 3, 325-337.
  36. L. Soukup, A lifting theorem on forcing LCS spaces More sets, graphs and numbers, 341-358, Bolyai Soc. Math. Stud., 15, Springer, Berlin, 2006.
  37. I. Juhász, S.  Shelah, L. Soukup and Z. Szentmiklóssy, Cardinal sequences and Cohen real extensions, Fund. Math. 181 (2004), no. 1, 75-88.
  38. I. Juhász, L. Soukup, and Z. Szentmiklóssy, D-forced spaces: a new approach to resolvability. Topology Appl. 153 (2006), no. 11, 1800-1824.
  39. Péter L. Erdos, Lajos Soukup How to split antichains in infinite posets, Combinatorica 27 (2007), no. 2, 147-161.
  40. I. Juhász, L. Soukup, and W. Weiss, Cardinal Sequences of length < omega2 under GCH. Fund. Math. 189 (2006), No.1, 35-52 .
  41. I. Juhasz, L. Soukup, and Z. Szentmiklóssy Resolvability of spaces having small spread or extent Top. Appl 154 (2007) 144-154.
  42. Péter L. Erdos, Lajos Soukup Quasi-kernels and quasi-sinks in infinite graphs, Discrete. Math., 309(2009), 3040-3048.
  43. I. Juhasz, L. Soukup, and Z. Szentmiklóssy Resolvability and monotone normality, Israel J. Math, 166 (2008), No 1, 1-16.
  44. Fuchino, Sakaé; Geschke, Stefan; Soukup, Lajos How to drive our family mad Arch. Math. Logic, to appear. http://arxiv.org/abs/math/0611744v1
  45. Lajos Soukup Nagata's conjecture and countably compact hulls in generic extensions, Topology Appl. 155 (2008), no. 4, 347-353.
  46. Lajos Soukup Cardinal sequences and universal spaces, Open Problems in Topology II.
  47. I. Juhasz, S. Shelah and L. Soukup Resolvability vs. almost resolvability, TOp. Appl, 156(2009), no 11, 1966-1969.
  48. I. Juhasz, L. Soukup and Z. Szentmiklóssy First countable spaces without point-countable pi-bases, Fund. Math., 196(2007), no2, 139-149.
  49. Dwight Duffus, Péter L. Erdos, Jaroslav Nesetril, Lajos Soukup, Antichains in the homomorphism order of graphs, Comment. Math. Univ. Carolin. 48 (2007), no. 4, 571-583.
  50. Lajos Soukup, Infinite Combinatorics: From Finite to Infinite, Horizons of Combinatorics, Bolyai Society Mathematical Studies. vol 17, ed: Ervin Györi, Gyula O. H. Katona, Lászlá Lovász and Gábor Sági, Springer Berlin Heidelberg, pp 189-213. 2008.
  51. Juan Carlos Martinez, Lajos Soukup, Cardinal sequences of LCS spaces under GCH, Annals of Pure and Applied Logic 161:9 (2010) Pages 1180-1193

  52. Elekes, Márton ; Mátrai, Tamás ; Soukup, Lajos. Partitioning kappa-fold covers into kappa many subcovers. Real Anal. Exchange 2007, 31st Summer Symposium Conference, 121-125.

  53. Marton Elekes, Tamas Matrai, Lajos Soukup, On splitting infinite-fold covers, to appear in Fund. Math

  54. Lajos Soukup, Indestructible colourings and rainbow Ramsey theorems, Fund. Math, 2002(009), no 2, 161-180.

  55. Barnabas Farkas, Lajos Soukup, More on cardinal invariants of analytic P-ideals, Comment. Math. Univ. Carolin., 50(2009), 281-295.
  56. Juan Carlos Martinez, Lajos Soukup, Universal locally compact scattered spaces, Top. Proc. 35 (2010), 19-36.
  57. Juan Carlos Martinez, Lajos Soukup, The D-property on unions of scattered spaces, Top Appl. 156(2009), 3086-3090.
  58. Sakaé Fuchino, István Juhász, Lajos Soukup, Zoltán Szentmiklóssy, Toshimichi Usuba , Fodor-type Reflection Principle, metrizability and meta-Lindelöfness, Topology Appl. 157:8 (2010) pp. 1415-1429.
  59. István Juhász,Piotr Koszmider, Lajos Soukup, A first countable, initially omega1-compact but non-compact space, Top Appl, 156 (2009), no 10, 1863-1879.

  60. A. Hajnal, I. Juhász, L. Soukup, and Z. Szentmiklóssy. Conflict free colorings of (strongly) almost disjoint set-systems. Acta Mathematica Hungarica, 2011. to appear.

  61. Juan Carlos Martinez, Lajos Soukup, Superatomic Boolean algebras constructed from strongly unbounded functions , Mathematical Logic Quarterly, 2011. to appear.

  62. P. L. Erdős, J. Stoyle, and L.  Soukup. Balanced vertices in trees and a simpler algorithm to compute the genomic distance. Appl. Math. Letters, 24 (2011) pp. 82-86. to appear.

  63. Lajos Soukup. Pcf theory and cardinal invariants of the reals. Comment. Math. Univ. Carolin, to appear

  64. Lajos Soukup. Wide scattered spaces and morasses. Topology Appl, to appear

Notes
  1. L. Soukup Boolean algebras with prescribed topological densities Arxiv note. 1999.
  2. D. Soukup, L. Soukup Club guessing for dummies, Arxiv note. 2010.
  3. L. Soukup A note on Noetherian type of spaces Arxiv note. 2010.
  4. L. Soukup Dense families of countable sets below c Arxiv note. 2010.
  5. Sakaé Fuchino, Hiroshi Sakai, Lajos Soukup and Toshimichi Usuba, More about the Fodor-type Reflection Principle , preprint.

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