Journal of Algebraic Combinatorics (EMIS Electronic Version)

Home > Vol 1, No 1 (1992)

A Combinatorial Characterization of Hermitian Curves

J.A. Thas

DOI: 10.1023/A:1022437415099

Abstract

A unital U with parameter q is a 2 - ( q ³ + 1, q + 1, 1) design. If a point set U in PG(2, q ²) together with its ( q + 1)-secants forms a unital, then U is called a Hermitian arc. Through each point p of a Hermitian arc H there is exactly one line L having with H only the point p in common; this line L is called the tangent of H at p. For any prime power q, the absolute points and nonabsolute lines of a unitary polarity of PG(2, q ²) form a unital that is called the classical unital. The points of a classical unital are the points of a Hermitian curve in PG(2, q ²).

Let H be a Hermitian arc in the projective plane PG(2, q ²). If tangents of H at collinear points of H are concurrent, then H is a Hermitian curve. This result proves a well known conjecture on Hermitian arcs.

Pages: 97–102

Keywords: Hermitian curve; unital; projective plane

Full Text: PDF

References

1. A. Blokhuis, A.E. Brouwer, and H.A. Wilbrink, "Hermitian unitals are codewords," Discrete Mathematics, to appear.
2. F. Buekenhout, "Existence of unitals in finite translation planes of order q2 with kernel of order q," Geometriae Dedicata, vol.5, pp. 189-194, 1976.
3. O. Faina and G. Korchmaros, "A graphic characterization of Hermitian curves,"Annals of Discrete Mathematics, vol.18, pp. 335-342, 1983.
4. J.W.P. Hirschfeld, Projective Geometries over Finite Fields, Clarendon Press, Oxford, 1979.
5. J.W.P. Hirschfeld, L. Storme, J.A. Thas, and J.F. Voloch, "A characterization of Hermitian curves," Journal of Geometry, vol.41, pp. 72-78, 1991.
6. C. Lefevre-Percsy, "Characterization of Hermitian curves," Achiv de Mathematik, vol.39, pp.476- 480, 1982.
7. R. Metz, "On a class of unitals," Geometrica Dedicata, vol.8, pp. 125-126, 1979.
8. M. Tallini Scafati, "Caratterizzazione grafica delle forme hermitiane di un Sr,q," Rendiconti di Matematica, vol.26, pp. 273-303, 1967.

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	JOURNAL OF ALGEBRAIC COMBINATORICS
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	Home > Vol 1, No 1 (1992) A Combinatorial Characterization of Hermitian Curves J.A. Thas DOI: 10.1023/A:1022437415099 Abstract A unital U with parameter q is a 2 - ( q ³ + 1, q + 1, 1) design. If a point set U in PG(2, q ²) together with its ( q + 1)-secants forms a unital, then U is called a Hermitian arc. Through each point p of a Hermitian arc H there is exactly one line L having with H only the point p in common; this line L is called the tangent of H at p. For any prime power q, the absolute points and nonabsolute lines of a unitary polarity of PG(2, q ²) form a unital that is called the classical unital. The points of a classical unital are the points of a Hermitian curve in PG(2, q ²). Let H be a Hermitian arc in the projective plane PG(2, q ²). If tangents of H at collinear points of H are concurrent, then H is a Hermitian curve. This result proves a well known conjecture on Hermitian arcs. Pages: 97–102 Keywords: Hermitian curve; unital; projective plane Full Text: PDF References 1. A. Blokhuis, A.E. Brouwer, and H.A. Wilbrink, "Hermitian unitals are codewords," Discrete Mathematics, to appear. 2. F. Buekenhout, "Existence of unitals in finite translation planes of order q2 with kernel of order q," Geometriae Dedicata, vol.5, pp. 189-194, 1976. 3. O. Faina and G. Korchmaros, "A graphic characterization of Hermitian curves,"Annals of Discrete Mathematics, vol.18, pp. 335-342, 1983. 4. J.W.P. Hirschfeld, Projective Geometries over Finite Fields, Clarendon Press, Oxford, 1979. 5. J.W.P. Hirschfeld, L. Storme, J.A. Thas, and J.F. Voloch, "A characterization of Hermitian curves," Journal of Geometry, vol.41, pp. 72-78, 1991. 6. C. Lefevre-Percsy, "Characterization of Hermitian curves," Achiv de Mathematik, vol.39, pp.476- 480, 1982. 7. R. Metz, "On a class of unitals," Geometrica Dedicata, vol.8, pp. 125-126, 1979. 8. M. Tallini Scafati, "Caratterizzazione grafica delle forme hermitiane di un Sr,q," Rendiconti di Matematica, vol.26, pp. 273-303, 1967. © 1992–2009 Journal of Algebraic Combinatorics © 2012 FIZ Karlsruhe / Zentralblatt MATH for the EMIS Electronic Edition

JOURNAL OF ALGEBRAIC COMBINATORICS

A Combinatorial Characterization of Hermitian Curves

Abstract

References

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