Greg Morrow

         Dr. Greg Morrow         
Math Department Chair 

Background and Professional Information

  • Mathematics, University of Illinois (Champaign-Urbana), 1979.
  • M.S. in Statistics, University of Illinois (Champaign-Urbana), 1979.
  • M.A. in Counseling Psychology, Regis University (Denver), 1998
  • Associate Professor at CU-Colorado Springs 1986-2006.
  • Professor at CU-Colorado Springs 2006-Present.
Research interests include:

  • Probability
  • Percolation Theory
  • Directed Polymer in a Random Environment

Conference in Memory of Walter V. Philipp, June, 2009

Talk on an asymptotic evaluation of the last passage time constant in high dimensions.

Selected Papers:

1. Time constant for the once oriented last passage percolation in high dimensionsin Dependence in Probability, Analysis, and Number Theory, I. Berkes, R. C. Bradley, H. Dehling, M. Peligrad and R. Tichy, eds., Kendrick Press (2010).

2. A directed polymer approach to once-oriented first passage percolation in high dimensions, preprint, Dec., 2007.

3. (with Y. Zhang) The sizes of the pioneering, lowest crossing, and pivotal sites in critical percolation on the triangular lattice, Ann. Appl. Probab. 15, 1832-1886 (2005).

4. (with S. Chakravarty) Statistical Analysis of collision-induced timing shifts in a wavelength-division-multiplexed optical soliton-transmission system, Contemporary Mathematics 301, 235-247 (2002).

5. (with R. Schinazi and Y. Zhang) The critical contact process on a homogeneous tree, J. Appl. Prob., 31, 250-255, (1994).

6. Large deviation results for a class of Markov chains with applications to an infinite alleles model of population genetics, Ann.  Appl. Probab., 2, 857-905 (1992).

7. (with S. Sawyer) Large deviation results for a class of Markov chains arising from population genetics, Ann. Probab. 17, 1124-1146 (1989).

8. Central limit theorem for linearly dependent fields of continuous elements, Prob. Th. Rel. Fields, 75, 87-95 (1987).

Recent Conference at CU-Colorado Springs: FPD07 Program

Personal Interests include:

  • Tai Chi
  •  Jungian and Process Oriented psychologies