Zhongshan (Jason) Li
Professor
Office: 790 COE
Office phone: 404.413.6437
E-mail: matzli [at]langate.gsu.edu
Personal webpage
Education
B.S. Mathematics, Lanzhou University, China, 1983
M.S. Mathematics, Beijing Normal University, China, 1986
Ph.D. Mathematics, North Carolina State University, 1990
Research/Teaching
Combinatorial Matrix Theory and Graph Theory.
Teaching Interests:
A wide range of courses including College Algebra, Precalculus, Calculus (I-III), Bridge to Higher Mathematics, Coding
Theory, Linear Algebra (I-II), Number Theory, Abstract Algebra (I-III), and Advanced Matrix Analysis.
Selected Publications
F. Hall and Z. Li , Sign Pattern Matrices, invited section (31 pages) in Handbook of Linear Algebra , CRC Press, 2006.
Marina Arav, F. Hall, S. Koyuncu, Z. Li and B. Rao, On Rational Realizations of the Minimum Rank of a Sign Pattern Matrix, Linear Algebra and Its Applications 411 (2005), 111-125.
Z. Li , F. Hall and J. Stuart, Reducible Powerful Ray Pattern Matrices, Linear Algebra and Its Applications 399 (2005), 125-140.
G. Chen, G. Davis, F. Hall, Z. Li , K. Patel, M. Stewart, An Interlacing Result on Normalized Laplacians, SIAM Journal on Discrete Mathematics 18 (2004), 353-361.
F. Hall, Z. Li and B. Rao, From Boolean to Sign Pattern Matrices, Linear Algebra and Its Applications 393 (2004), 233-51.
G. Chen, F. Hall, Z. Li and B. Wei, On Ranks of Matrices Associated with Trees, Graphs and Combinatorics 19 (2003), 323-334.
F. Hall and Z. Li , Sign Patterns, Inverses and Generalized Inverses — A Brief Survey, Numerical Mathematics: A Journal of Chinese Universities 12 (Supplement) (2003), 8-11.
G. Chen, F. Hall, Z. Li and B. Wei, On Ranks of Matrices Associated with Trees, Numerical Mathematics: A Journal of Chinese Universities 12 (Supplement) (2003), 76 – 79.
Z. Li and L. Harris, Sign Patterns That Require All Distinct Eigenvalues, JP Journal of Algebra and Number Theory and Applications 2 (2) (2002), 161-179.
Z. Li , F. Hall and J. Stuart, Irreducible Powerful Ray Pattern Matrices , Linear Algebra and its Applications 342 (2002), 47-58.
F. Hall and Z. Li , Inertia Sets of Sign Patterns, Numerical Mathematics: A Journal of Chinese Universities 10 (2001), 226-240.
F. Hall, Z. Li and Di Wang, Symmetric Sign Pattern Matrices That Require Unique Inertia , Linear Algebra and Its Applications 338 (2001), 153-169.