University of Alaska Fairbanks
Department of Mathematics and Statistics
Recent Publications by
graduate students in Mathematics
The
following are peer-reviewed journal articles
and conference proceedings of which at least one (co-)author is a
graduate
student in Mathematics who is either a current student or graduated
after
Spring 2000. They are listed in reverse
chronological order and then alphabetically by first author. The graduate student author(s) are in bold.
- Viktoria Averina, Ilya
Kolmanovsky, Alex Gibson, Gary Song, and Ed Bueler. (2005). Analysis and
Control of Delay-Dependent Behavior of Engine Air-To-Fuel Ratio.
IEEE Conference on Control
Applications, August 2005, Toronto,
Canada.
- Ed Bueler, Craig S. Lingle, Jed A. Kallen-Brown, David N. Covey, and Latrice
N. Bowman. (2005). Exact
solutions and the verification of numerical models for isothermal ice
sheets. J. Glaciology, 51
no. 173, 291—306.
- Haitao Ma, Venkatesh Deshmukh, Eric
Butcher, and Victoria Averina. (2005).
Delayed State Feedback And Chaos Control For
Time-Periodic Systems Via a Symbolic Approach.
Communications in Nonlinear Science and Numerical
Simulation, 10 no. 5, 479—497.
- Belov, Sergei and
Rybkin, Alexei. (2004)
On the existence of WKB-type asymptotics for the
generalized eigenvectors of discrete string operators. Bull. London Math. Soc. 36 no. 2, 241--251.
- Belov, S. M, Avdonina,
N. B., Felfli, Z., Marletta, M., Msezane, A. Z., and Naboko, S. N.
(2004). Semiclassical approach
to Regge poles trajectories calculations for nonsingular potentials:
Thomas-Fermi type. J. Phys. A 37 no. 27, 6943--6954.
- Eric A. Butcher, Haitao Ma, Ed Bueler,
Viktoria Averina, and Zsolt Szabo. (2004). Stability of time-periodic
delay-differential equations via Chebyshev polynomials. Int. J.
Numerical Methods in Engineering, 59 no. 7, 895—922.
- Belov, S. M. and
Rybkin, A. V. (2003). Higher
order trace formulas of the Buslaev-Faddeev-type for the half-line
Schrödinger operator with long-range potentials. J. Math.
Phys. 44 no. 7, 2748--2761.
- Avdonina, N. B., Belov, S.,
Felfli, Z., Msezane, A. Z., and Naboko, S. N. (2002). Semiclassical
approach for calculating Regge-pole trajectories for singular potentials.
Phys. Rev. A (3) 66 no. 2, 022713, 7 pp.
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