Joaquin Carbonara,

      Ph.D (Math, UCSD 1992), M.S. (Computer Sc., UB 2005)

Professor of Mathematics

carbonjo@buffalostate.edu

(716) 878-6423

Buffalo State College, Dept of Mathematics

Bishop Hall 304

1300 Elmwood Av

Buffalo NY 14222

Links

Publications

1. Ettestad D., Carbonara J., Jansma M., Rua M., Sember K., The Cups and Stones Counting Problem, The Sierpinski Gasket, Cellular Automata, Fractals and Pascal's Triangle, Journal of Cellular Automata Vol 6 pp 421-437, 2011.

2. Potts, D., Scott, R., Bayram, S., Carbonara, J. Woody Plants Modulate The Temporal Dynamics of Soil Moisture in a Semi-Arid Mesquite Savanna. ECOHYDROLOGY Ecohydrol. (2009) Published online in Wiley InterScience (www.interscience.wiley.com) DOI: 10.1002/eco.91

3. Tang, T., Shi, Z., Carbonara, J. and Wang, X., (August 2009). Feature Shape and Elevation Based Road Classification and Extraction on High Spatial Resolution Remote Sensing Imageries. Geoinformatics 2009 proceedings.

4. Shojania-Feizabadi,M. and Carbonara, J. Two-compartment model interacting with proliferating regulatory factor. Appl. Math. Lett. Volume 23, Number 1, pp 30-33, January 2010.

5. Ettestad, D. and Carbonara, J. O., Formulas for the number of states of an interesting finite cellular automaton and a connection to Pascal's Triangle. Journal of Cellular Automata, Vol.5, Iss.1/2; p. 157-166. January 2010.

6. Carbonara, J. O. and Ettestad, D. (2006) Fractal Properties of the Matrix for the Cups and Stones Counting Problem. International Journal of Pure and Applied Mathematics, 29, No 1, pp 81-106.

7. Carbonara, J. O. , Carini, L. & Remmel J.(2003). Trace Cocharacters and the Kronecker Products of Schur Functions. Journal of Algebra 260 632-656.

8. Carbonara, J. O. & Green, A. (1998). Enumerative Questions on Weighted Rooted Necklaces, Advances in Applied Mathematics, 21, 405-423.

9. Carbonara, J. O. (1998) A combinatorial interpretation for the inverse t-Kostka matrix , Discrete Mathematics, 193 117-145.

10. Carbonara, J. O., Remmel, J. & Yang, M. (1995). A Combinatorial Rule for the Schur Function Expansion of the Plethysm s (1 a ,b) [p k ] Linear and Multilinear Algebra, Vol 39, 341-373.

11. Carbonara, J. O., Remmel, J., & Kulikauskas, A. (November 1995). A combinatorial proof of the equivalence of the classical and combinatorial definitions of Schur functions, Journal of Combinatorial Theory, Series A, Vol. 72, No 2.