Mathematical Research
Parabolic Buekenhout-Metz Unital in PG(4,q)
- Courtesy of Jeremy Dover
Publications
- K. L. Wantz. Unitals in the Regular Nearfield Planes.
Journal of Geometry. 88 (1-2):169--177, 2008.
- K. L. Wantz. A New Class of Unitals in the Hughes Plane.
Geometriae Dedicata,
70
(2):125--138, 1998.
- R. D. Baker and K. L. Wantz.
An Arc Partition of the Hughes Plane Using a Field-Theoretic Model.
Innovations in Incidence Geometry, 2: 85-94, 2005.
- R. D. Baker and K. L. Wantz.
Unitals in the Code of the Hughes Plane.
Journal of Combinatorial Designs, 12: 35-38, 2004.
- G. L. Ebert and K. Wantz.
A Group-Theoretic Characterization of Buekenhout-Metz Unitals.
Journal of Combinatorial Designs
, 4:143--152, 1996.
- R. D. Baker, J. M. Dover, G. L. Ebert, and K. L. Wantz.
Hyperbolic Fibrations of PG(3,q).
European Journal of Combinatorics, 20:1--16, 1999.
- R. D. Baker, J. M. Dover, G. L. Ebert, and K. L. Wantz.
Baer Subgeometry Partitions. Second Pythagorean Conference (Pythagoreion, 1999).
Journal of Geometry. 67:23--34, 2000.
- R. D. Baker, J. M. Dover, G. L. Ebert, and K. L. Wantz.
Perfect Baer Subplane Partitions and
Three-Dimensional Flag-Transitive Planes.
Designs, Codes and Cryptography. 21:19--39, 2000.
- R. D. Baker, G. L. Ebert, and K. L. Wantz.
Regular Hyperbolic Fibrations.
Advances in Geometry. 1:119--144, 2001.
Doctoral Dissertation
Unitals Embedded in Finite Projective Planes
Advisor: G. L. Ebert
My Mathematical Roots
My full mathematical genealogy
can be traced to Hilbert, Weierstrass, Klein, and Gauss!
My Erdös Number
My Erdös number is three, traceable along two paths:
kwantz@snu.edu