Editorial: Special issue on finite geometries in honor of Frank De Clerck

Bibliography of Frank De Clerck

1. 2.
   Thas, J.A., De Clerck, F.: Some applications of the fundamental characterization theorem of R. C. Bose to partial geometries. Atti Accad. Naz. Lincei Rend. Cl. Sci. Fis. Mat. Natur. 29(1–2), 86–90 (1976)Google Scholar
2. 3.
   Thas, J.A., De Clerck, F.: Partial geometries satisfying the axiom of Pasch. Simon Stevin 51(3), 123–137 (1977/78)Google Scholar
3. 4.
   De Clerck, F., Thas, J.A.: Partial geometries in finite projective spaces. Arch. Math. (Basel) 30(5), 537–540 (1978)Google Scholar
4. 5.
   De Clerck, F.: Partial geometries–a combinatorial survey. Bull. Soc. Math. Belg. Sér. B 31(2), 135–145 (1979)Google Scholar
5. 6.
   De Clerck, F.: The pseudogeometric and geometric \((t,\, s,\, s-1)\)-graphs. Simon Stevin 53(4), 301–317 (1979)Google Scholar
6. 7.
   De Clerck, F., Thas, J.A.: Note on the extension of restricted \((r,\,\lambda )\)-designs. Ars. Comb. 7, 261–263 (1979)Google Scholar
7. 8.
   De Clerck, F., Dye, R.H., Thas, J.A.: An infinite class of partial geometries associated with the hyperbolic quadric in PG\((4n--1,\,2)\). Eur. J. Comb. 1(4), 323–326 (1980)Google Scholar
8. 9.
   Debroey, I., De Clerck, F.: Nontrivial \(\Gamma \Delta \)-regular graphs. Discret. Math. 41(1), 7–15 (1982)Google Scholar
9. 10.
   De Clerck, F., Thas, J.A.: The embedding of \((0,\,\alpha )\)-geometries in PG\((n,\, q)\). I. In: Combinatorics ’81 (Rome, 1981), North-Holland Math. Stud., vol. 78, pp 229–240. North-Holland, Amsterdam (1983)Google Scholar
10. 11.
    De Clerck, F.: Substructures of Partial Geometries. Quaderno 5 del Seminario di Geometrie Combinatorie, Università degli Studi de L’Aquila, pp. 1–16 (1984)Google Scholar
11. 12.
    Thas, J.A., Debroey, I., De Clerck, F.: The embedding of \((0,\,\alpha )\)-geometries in PG\((n,\, q)\). II. Discret. Math. 51(3), 283–292 (1984)Google Scholar
12. 13.
    De Clerck, F., Thas, J.A.: Exterior sets with respect to the hyperbolic quadric in PG\((2n-1, q)\). In: Finite geometries (Winnipeg, Man., 1984), Lecture Notes in Pure and Applied Mathematics, vol. 103, pp. 83–89. Dekker, New York (1985)Google Scholar
13. 14.
    De Clerck, F.: Flocks di un cono in PG\((3, q)\). Quaderno 75 del Seminario di Geometrie Combinatorie “G. Tallini” (Roma), p. 8, (1987)Google Scholar
14. 15.
    De Clerck, F., De Soete, M., Gevaert, H.: A characterization of the partial geometry \(T^*_2(K)\). Eur. J. Comb. 8(2), 121–127 (1987)Google Scholar
15. 16.
    De Clerck, F., Gevaert, H., Thas, J.A.: Flocks of a quadratic cone in PG\((3, q),\;q\le 8\). Geom. Dedicata 26(2), 215–230 (1988)Google Scholar
16. 17.
    De Clerck, F., Gevaert, H., Thas, J.A.: Translation partial geometries. In: Combinatorics ’86 (Trento, 1986), Annals of Discrete Mathematics, vol. 37, pp. 117–135. North-Holland, Amsterdam (1988)Google Scholar
17. 18.
    De Clerck, F., Mazzocca, F.: The classification of polarities in reducible projective spaces. Eur. J. Comb. 9(3), 245–247 (1988)Google Scholar
18. 19.
    De Clerck, F., Del Fra, A., Ghinelli, D.: Pointsets in partial geometries. In: Advances in finite geometries and designs (Chelwood Gate, 1990), Oxford Science Publishers, pp. 93–110. Oxford Univ. Press, New York (1991)Google Scholar
19. 20.
    De Clerck, F., Gevaert, H., Thas, J.A.: Partial geometries and copolar spaces. In: Combinatorics ’88, (Ravello, 1988), Research Lecture Notes Mathematics, Vol. 1, pp. 267–280. Mediterranean, Rende (1991)Google Scholar
20. 21.
    De Clerck, F., Johnson, N.L.: Subplane covered nets and semipartial geometries. Discret. Math., 106/107:127–134, 1992. A collection of contributions in honour of Jack van Lint.Google Scholar
21. 22.
    De Clerck, F., Tonchev, V.D.: Partial geometries and quadrics. Sankhyā Ser. A, 54(Special Issue):137–145, 1992. Combinatorial mathematics and applications (Calcutta, 1988)Google Scholar
22. 23.
    Thas, J.A., Herssens, C., De Clerck, F.: Flocks and partial flocks of the quadratic cone in PG\((3, q)\). In: Finite geometry and combinatorics (Deinze, 1992), London Math. Soc. Lecture Note Ser., vol. 191, pp. 379–393. Cambridge Univ. Press, Cambridge (1993)Google Scholar
23. 24.
    De Clerck, F., Van Maldeghem, H.: On flocks of infinite quadratic cones. Bull. Belg. Math. Soc. Simon Stevin, 1(3):399–415, 1994. A tribute to J. A. Thas (Gent, 1994)Google Scholar
24. 25.
    De Clerck, F., Van Maldeghem, H.: On linear representations of \((\alpha ,\beta )\)-geometries. Eur. J. Comb., 15(1):3–11, 1994. Algebraic combinatorics (Vladimir, 1991)Google Scholar
25. 26.
    De Clerck, F., Van Maldeghem, H.: Some classes of rank \(2\) geometries. In: Handbook of incidence geometry, pp. 433–475. North-Holland, Amsterdam (1995)Google Scholar
26. 27.
    De Clerck, F.: New partial geometries constructed from old ones. Bull. Belg. Math. Soc. Simon Stevin, 5(2–3):255–263, 1998. Finite geometry and combinatorics (Deinze, 1997)Google Scholar
27. 28.
    De Bruyn, B., De Clerck, F.: Near polygons from partial linear spaces. Geom. Dedicata 75(3), 287–300 (1999)Google Scholar
28. 29.
    De Bruyn, B., De Clerck, F.: On linear representations of near hexagons. Eur. J. Comb. 20(1), 45–60 (1999)Google Scholar
29. 30.
    De Clerck, F., Delanote, M.: Partial geometries and the triality quadric. J. Geom. 68(1–2), 34–47 (2000)Google Scholar
30. 31.
    De Clerck, F., Delanote, M.: Two-weight codes, partial geometries and Steiner systems. Des. Codes Cryptogr., 21(1–3):87–98, 2000. Special issue dedicated to Dr. Jaap Seidel on the occasion of his 80th birthday (Oisterwijk, 1999)Google Scholar
31. 32.
    De Clerck, F., Hamilton, N., O’Keefe, C.M., Penttila, T.: Quasi-quadrics and related structures. Australas. J. Comb. 22, 151–166 (2000)Google Scholar
32. 33.
    Cauchie, S., De Clerck, F., Hamilton, N.: Full embeddings of \((\alpha ,\beta )\)-geometries in projective spaces. Eur. J. Comb. 23(6), 635–646 (2002)Google Scholar
33. 34.
    De Clerck, F., Delanote, M., Hamilton, N., Mathon, R.: Perp-systems and partial geometries. Adv. Geom. 2(1), 1–12 (2002)Google Scholar
34. 35.
    Brown, M.R., De Clerck, F., Delanote, M.: Affine semipartial geometries and projections of quadrics. J. Combin. Theory Ser. A 103(2), 281–289 (2003)Google Scholar
35. 36.
    De Clerck, F.: Partial and semipartial geometries: an update. Discret. Math., 267(1–3):75–86, (2003). Combinatorics 2000 (Gaeta)Google Scholar
36. 37.
    De Clerck, F., Durante, N., Thas, J.A.: Dual partial quadrangles embedded in PG\((3, q)\). Adv. Geom., (suppl.):S224–S231 (2003). Special issue dedicated to Adriano BarlottiGoogle Scholar
37. 38.
    De Clerck, F., De Winter, S., Thas, J.A.: A characterization of the semipartial geometries \(T_{2}^{\ast }(\cal U)\) and \(T_{2}^{\ast }(\cal B)\). Eur. J. Comb. 25(1), 73–85 (2004)Google Scholar
38. 39.
    De Clerck, F., Delanote, M.: On \((0,\alpha )\)-geometries and dual semipartial geometries fully embedded in an affine space. Des. Codes Cryptogr. 32(1–3), 103–110 (2004)Google Scholar
39. 40.
    De Clerck, F., De Feyter, N., Durante, N.: Two-intersection sets with respect to lines on the Klein quadric. Bull. Belg. Math. Soc. Simon Stevin 12(5), 743–750 (2005)Google Scholar
40. 41.
    De Clerck, F., De Feyter, N., Thas, J.A.: Affine embeddings of \((0,\alpha )\)-geometries. Eur. J. Comb. 27(1), 74–78 (2006)Google Scholar
41. 42.
    De Clerck, F., De Feyter, N.: Projections of quadrics in finite projective spaces of odd characteristic. Innov. Incid. Geom. 3, 51–80 (2006)Google Scholar
42. 43.
    De Clerck, F., De Winter, S., Kuijken, E., Tonesi, C.: Distance-regular \((0,\alpha )\)-reguli. Des. Codes Cryptogr. 38(2), 179–194 (2006)Google Scholar
43. 44.
    De Clerck, F., De Feyter, N.: A characterization of the sets of internal and external points of a conic. Eur. J. Comb. 28(7), 1910–1921 (2007)Google Scholar
44. 45.
    De Clerck, F., De Feyter, N.: On connected line sets of antiflag class \([0,\alpha , q]\) in AG\((n, q)\). Eur. J. Comb. 29(6), 1427–1435 (2008)Google Scholar
45. 46.
    Bamberg, J., De Clerck, F., Durante, N.: A hemisystem of a nonclassical generalised quadrangle. Des. Codes Cryptogr. 51(2), 157–165 (2009)Google Scholar
46. 47.
    Bamberg, J., De Clerck, F.: A geometric construction of Mathon’s perp-system from four lines of PG\((5,3)\). J. Comb. Des. 18(6), 450–461 (2010)Google Scholar
47. 48.
    Bamberg, J., De Clerck, F., Durante, N.: Intriguing sets in partial quadrangles. J. Comb. Des. 19(3), 217–245 (2011)Google Scholar
48. 49.
    De Clerck, F., De Feyter, N.: A new characterization of projections of quadrics in finite projective spaces of even characteristic. Discret. Math. 311(13), 1179–1186 (2011)Google Scholar
49. 50.
    De Clerck, F., De Winter, S., Maes, T.: A geometric approach to Mathon maximal arcs. J. Comb. Theory Ser. A 118(4), 1196–1211 (2011)Google Scholar
50. 51.
    De Clerck, F., De Winter, S., Maes, T.: Partial flocks of the quadratic cone yielding Mathon maximal arcs. Discret. Math. 312(16), 2421–2428 (2012)Google Scholar
51. 52.
    De Clerck, F., Durante, N.: Constructions and characterizations of classical sets in PG\((n, q)\). In: De Beule, J. and Storme, L. (eds.) Current research topics in Galois geometry, Mathematics Research Developments, chapter 1, pp. 1–33. Nova Science Publishers, New York (2012)Google Scholar
52. 53.
    De Clerck, F., De Winter, S., Maes, T.: Singer 8-arcs of Mathon type in PG\((2,2^7)\). Des. Codes Cryptogr. 64(1–2), 17–31 (2012)Google Scholar