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Kovchegov, Yevgeniy - Department of Mathematics, Oregon State University
Orthogonality and probability: mixing times Yevgeniy Kovchegov
Mixing times via super-fast coupling Mixing times via super-fast coupling
Occupation times and Bessel densities Yevgeniy Kovchegov
Generalized Symmetric Exclusion Processes
Adiabatic times for Markov chains and applications Kyle Bradford and Yevgeniy Kovchegov
The Brownian Bridge Asymptotics in the Subcritical Phase of Bernoulli Bond Percolation Model.
BROWNIAN BRIDGE, PERCOLATION AND RELATED PROCESSES
Occupation times and modified Bessel functions
A note on adiabatic theorem for Markov chains and
Exclusion Processes with Multiple Interactions. Yevgeniy Kovchegov
Mixing times via super-fast coupling. Robert M. Burton
Multi-particle processes with reinforcements. Yevgeniy Kovchegov
Orthogonality and probability: beyond nearest neighbor transitions
Teaching Statement Yevgeniy Kovchegov
Orthogonal polynomials and mixing Yevgeniy Kovchegov
A P2P VIDEO DELIVERY NETWORK (P2P-VDN) Kien Nguyen, Thinh Nguyen
Quantum interchange walk as a unifying Zlatko Dimcovic1 and Yevgeniy Kovchegov2
Quantum Random Walk via Classical Random Walk With Internal States
A note on adiabatic theorem for Markov chains Yevgeniy Kovchegov
Discrete and continuous quantum walks
Orthogonality and probability: beyond nearest neighbor
Markov Chain Monte Carlo and mixing rates
Critical percolation and Lorentz lattice gas model
Subcritical percolation: cluster expansion and Brownian bridge
Research Statement Yevgeniy Kovchegov
MIXING TIMES FOR THE MEAN-FIELD BLUME-CAPEL MODEL VIA AGGREGATE PATH COUPLING
Russo's formula for Lorentz Lattice Gas Model Yevgeniy Kovchegov
Distributed Data Replenishment Kien Nguyen, Thinh Nguyen, Member, IEEE, Yevgeniy Kovchegov, Viet Le
P2P Distributed Data Replenishment Kien Nguyen, Thinh Nguyen, Viet Le
Data Loss Modeling and Analysis in Partially-Covered Delay-Tolerant Networks
arXiv:1109.6050v1[math.CA]27Sep2011 A CLASS OF MARKOV CHAINS WITH NO SPECTRAL GAP
Tokunaga and Horton self-similarity for level set trees of Markov chains
