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Tara L. Smith
Professor, Undergraduate Director
Mathematical Sciences - Tenure-Track Faculty
811B Old Chemistry Building
513-556-4048
tara.l.smith@uc.edu
http://math.uc.edu/~tsmith
Research Support
Association for Women Mathematicians Travel Grants, Funded 05-2002
Taft Faculty Summer Research Grants, Funded 2001
Association for Women Mathematicians Travel Grants, Funded 05-1999
Faculty Development Grant, Funded 11-1996
Taft Faculty Summer Research Grants, Funded 1996
Association for Women Mathematicians Travel Grants, Funded 06-1995
Taft Faculty Summer Research Grants, Funded 1994
Provostal Support for Profession Development Award, Funded 07-1992
NSA Grant , (MDA904-92-H-3023); Funded 06-1992 to 05-1994.
NSF Grant , (DMS-9001633); Funded 06-1990 to 05-1992.
NSF Grant , (DMS-8908258); Funded 06-1989 to 05-1990.
Research Fellow in Mathematics at Ohio State Univ., Funded 09-1988 to 06-1991.
National Science Foundation Graduate Fellow, Funded 09-1982 to 08-1985.
Peer Reviewed Publications
Craven, T. (2005). Abstract theory of semiorderings. Bull. Australian Math. Soc., 72, 225 – 250.
Leep, D. (2004). Witt kernels of triquadratic extensions. Contemp. Math., 344, 249-256.
Mahé, L., & Minác?, J. (2004). Additive structure of subgroups of F*/F*2 and Galois theory. Documenta Math., 9, 301-355.
Gao, W., Leep, D., & Minác?, J. (2003). Galois groups over non-rigid fields. Fields Institute Communications, 33, 61-77.
Craven, T. (2003). Semiorderings and Witt rings. Bull. Australian Math. Soc., 67, 329-341.
Leep, D., & Solomon, R. (2002). Frattini closed groups and adequate extensions of global fields. Israel J. Math., 130, 1-10.
Grundman, H., & Leep, D. (2002). Q-adequacy of Galois 2-extensions. Israel J. Math., 130, 11-19.
Grundman, H. (2002). Q-adequacy of bicyclic bicubic fields. Fields Institute Communications, 32, 163-173.
Leep, D. (2002). Multiquadratic extensions, pythagorean fields, and rigid fields. Bull. London Math. Soc., 34, 140-148.
Craven, T. (2001). Ordered *-rings. J. Algebra, 238, 314-327.
Craven, T. (2000). Formally real fields from a Galois-theoretic perspective. J. Pure and Applied Algebra, 145, 19-36.
Craven, T. (2000). Pythagorean *-fields. J. Algebra, 225, 487-500.
Minác?, J. (2000). W-groups under quadratic extensions of fields. Canad. J. Math, 52, 833-848.
Invited Presentations
(10-2005). Forward to the Professorship. Forward to the Professorship Conference, MIT.
(05-2005). Forward to the Professorship. Forward to the Professorship Conference, Gallaudet University.
(05-2004). Forward to the Professorship. Forward to the Professorship Conference, Gallaudet University.
(12-2002). Semiorderings and Witt rings. International Conference on Algebraic and Arithmetic Theory of Quadratic Forms, Talca and Pucon, Chile.
(07-2002). Galois p-Extensions of Q as Maximal Subfields of Division Algebras. Pingree Park Conference on Brauer Groups
(03-2002). Multiplicative Subgroups of F*/F*2: Additive Properties and Extensions. Colloquiumfest , University of Saskatchewan .
(03-2001). Galois Groups Over Non-Rigid Fields. Conference on Quadratic Forms and Related Topics, Louisiana State University .
(02-2001). Determining Adequacy of Galois Extensions of Global Fields. Algebra Seminar , University of Hawaii .
(04-2000). Adequate Extensions of Global Fields. University of Western Ontario
(01-2000). Adequate Galois p-Extensions of Number Fields. Algebra Seminar, Colorado State University .
