Scott Zrebeic
Visiting Assistant Professor

Education

• Ph.D. in Mathematics, Johns Hopkins University, 2006

• B.A. in Mathematics, University of Colorado, 2000

In the Profession

• 2006-present, Visiting Assistant Professor, Texas A&M

• 2001-2006, Graduate Student Johns Hopkins University

• Summers of 2002, 2004, and 2005, Lecturer, Johns Hopkins University

Research or Scholarly Interests

By carefully placing a probability measure on functions one may obtain random functions that have nice geometric properties with respect to their domain. A considerable body of work has centered on determining statistics concerning how often a fixed value is obtained by a random function, or how often a critical point is obtained. My work has centered in studying large deviations from the mean, in terms of underlying geometric objects.

Notable Recent Grants

• Travel grants for eight conferences 04'-09'

Five Selected Publications or Scholarly Works

• S. Zrebiec, The zeros of flat Gaussian random holomorphic functions on Cⁿ, and hole probability, Michigan Math. J. 55 (2007), no. 2, 269-284.

• B. Shiffman, S. Zelditch, S. Zrebiec, Overcrowding and hole probabilities for random zeros on complex manifolds. Indiana Univ. Math. J. 57 (2008), no. 5, 1977-1997.

• S. Zrebiec, Real random Bargman-Fock Functions with few zeros, E-print Archive, ArXiv:math.CV/0807.0604, (2008). (Submitted for publication)

• S. Zrebiec, The hole probability for Gaussian random SU(2) polynomials, E-print Archive, ArXiv:math.CV/0610686, (2006). (Technical article)

• S. Zrebiec, The hole probability for Gaussian random SU(m+1) polynomials, E-print Archive, ArXiv:math.CV/0610686, (2007). (Technical article)

Recent Synergistic Activities

• Assistant Mentor for REU Program, present summer

• MathSciNet reviewer, 2008-present

• Organized the SCV seminar, 2009-present