View related pages

COSAM » COSAM Faculty » Mathematics and Statistics » Curt Lindner

Curt Lindner

University Distinguished Professor

University Distinguished Professor

**Research Areas**
- Discrete Mathematics

**Office: **133-D Allison Lab

**Phone: **(334) 844-3747

**E-Mail: **lindncc@auburn.edu

__Education__

Ph.D., Emory University

1969

M.S., Emory University

1963

B.S., Presbyterian College

1960

__Professional Employment__

Professor, Department of Mathematics and Statistics, Auburn University

1976 - present

Associate Professor, Department of Mathematics and Statistics, Auburn University

1973 - 1976

Assistant Professor, Department of Mathematics and Statistics, Auburn University

1969 - 1973

Coker College Hartsville

1963 - 1967

__Honors and Awards__

Alumni Professor, Auburn University

1985 - 1990

Distinguished University Professor

1994 - present

Honorary Professor, University of Queensland

1994 - present

Honorary Professor, Combinatorics, Universita di Catania

2004 - present

__Professional Activities__

Editorial Board Member: ARS Combinatoria, ALE Matematiche, Journal Algorithms and Computations, Transactions on Combinatorics, ISRN Discrete Mathematics

Member: Combinatorical Mathematics Society of Australia, Institute of Combinatorics and it's Applications

Referee: Australasian Journal of Combinatorics, JSMCC, JCT, Discrete Mathematics Combinatorica, Canadian Journal of Mathematics, Aequationes Mathematicae, SIAM Utilitas Mathematica, Algbra Universailis, Ars Conbinatoria, Proc. AMS, J. London Math. Soc., European J. of Combinatorics, IEEE Transactions of Information Theory

__Research and Teaching Interests__

Discrete Mathematics: Combinatorics; Design Theory

__Selected Publications__

- From squashed 6-cycle systems to Steiner triple systems, J. Combinatorial Designs, online 2013; DOI: 10.1002/jcd.21346 (with Alex Rosa and M. Meszka).
- Book: Design Theory, Second Edition, CRC Press, 2009, 264 pages (with C. A. Rodger)
- 2-perfect m-cycle systems can be equationally defined for m=3, 5 and 7 only, Algebra Universalis, 35 (1996), 1-7 (with D. E. Bryant).
- Steiner pentagon systems, Discrete Math., 52 (1984), 67-74 (with D. R. Stinson).
- A partial Steiner triple system of order n can be embedded in a Steiner triple system of order 6n+3, J. Combinatorial Theory Ser. A, 18 (1975), 349-351.