Quasi-stationary distributions and convergence to quasi-stationarity of birth-death processes EA Van Doorn Advances in applied probability 23 (4), 683-700, 1991 | 263 | 1991 |
Conditions for exponential ergodicity and bounds for the decay parameter of a birth-death process EA Van Doorn Advances in Applied Probability 17 (3), 514-530, 1985 | 142 | 1985 |
Quasi-stationary distributions for discrete-state models EA Van Doorn, PK Pollett European journal of operational research 230 (1), 1-14, 2013 | 127 | 2013 |
On the continued Erlang loss function AA Jagers, EA Van Doorn Operations Research Letters 5 (1), 43-46, 1986 | 120 | 1986 |
The deviation matrix of a continuous-time Markov chain P Coolen-Schrijner, EA Van Doorn Probability in the Engineering and informational Sciences 16 (3), 351-366, 2002 | 106 | 2002 |
Stochastic monotonicity and queueing applications of birth-death processes E Van Doorn Springer Science & Business Media, 2012 | 94 | 2012 |
Geomatric ergodicity and quasi-stationarity in discrete-time birth-death processes EA van Doorn, P Schrijner The ANZIAM Journal 37 (2), 121-144, 1995 | 69 | 1995 |
Conditional pasta EA Van Doorn, GJK Regterschot Operations Research Letters 7 (5), 229-232, 1988 | 69 | 1988 |
Representations and bounds for zeros of orthogonal polynomials and eigenvalues of sign-symmetric tri-diagonal matrices EA Van Doorn Journal of approximation theory 51 (3), 254-266, 1987 | 64 | 1987 |
Extinction probability in a birth-death process with killing EA Van Doorn, AI Zeifman Journal of applied probability 42 (1), 185-198, 2005 | 63 | 2005 |
Connectivity of circulant digraphs EA Van Doorn Journal of graph theory 10 (1-4), 9-14, 1986 | 56 | 1986 |
The transient state probabilities for a queueing model where potential customers are discouraged by queue length EA Van Doorn Journal of Applied Probability 18 (2), 499-506, 1981 | 56 | 1981 |
Quasi-stationary distributions for reducible absorbing Markov chains in discrete time PK Pollett, EA van Doorn University of Twente, 2008 | 55 | 2008 |
Bounds and asymptotics for the rate of convergence of birth-death processes EA van Doorn, AI Zeifman, TL Panfilova Theory of Probability & Its Applications 54 (1), 97-113, 2010 | 53 | 2010 |
Convexity of functions which are generalizations of the Erlang loss function and the Erlang delay function AA Jagers, EA van Doorn SIAM review 32 (2), 301, 1990 | 52 | 1990 |
Limiting conditional distributions for birthdeath processes M Kijima, MG Nair, PK Pollett, EA Van Doorn Advances in Applied Probability 29 (1), 185-204, 1997 | 46 | 1997 |
Blocking probabilities in a loss system with arrivals in geometrically distributed batches and heterogeneous service requirements EA van Doorn, FJM Panken IEEE/ACM transactions on networking 1 (6), 664-667, 1993 | 46 | 1993 |
A fluid queue driven by an infinite-state birth-death process EA van Doorn, WRW Scheinhardt Teletraffic Science and Engineering 2, 465-475, 1997 | 45 | 1997 |
Relaxation times for queueing systems JPC Blanc, EA Van Doorn CWI. Department of Operations Research and System Theory [BS], 1984 | 45 | 1984 |
A fluid reservoir regulated by a birth-death process EA Van Doom, AA Jagers, JSJ De Wit Communications in Statistics. Stochastic Models 4 (3), 457-472, 1988 | 44 | 1988 |