## Filter: stochastic processes

# of Publications: 25

Showing 1 - 25 of 25

Page 1

A Semi-algebraic Approach that Enables the Design of Inter-grid Operators to Optimize Multi-grid Convergence

P. Navarrete and E. J. Coyle, “A Semi-algebraic Approach that Enables the Design of Inter-grid Operators to Optimize Multi-grid Convergence,” Numerical Linear Algebra with Applications, Vol. 15, pp. 219-247, March 2008. Mobility Models based on Correlated Random Walks

P. Navarrete and E. J. Coyle, "Mobility Models based on Correlated Random Walks," Proceedings of Mobility 2008, Ilan, Taiwan, Sept. 10-12, 2008. (Invited Paper) Stochastic Properties of Mobility Models in Mobile Ad-Hoc Networks

S. Bandyopadhyay, E. J. Coyle, and T. Falck, “Stochastic Properties of Mobility Models in Mobile Ad-Hoc Networks,” IEEE Transactions on Mobile Computing, Vol. 6, No. 11, pp. 1218-1229, Nov. 2007. Stochastic Properties of Mobility Models in Mobile Ad Hoc Networks

S. Bandyopadhyay, E. J. Coyle, and T. Falck, “Stochastic Properties of Mobility Models in Mobile Ad Hoc Networks,” 2006 Conference on Information Science and Systems, Princeton, NJ, March 22-24, 2006. Equilibrium Analysis of Skip-Free Markov Chains: Nonlinear Matrix Equations

G. R. Murthy, M. Kim, and E. J. Coyle, “Equilibrium Analysis of Skip-Free Markov Chains: Nonlinear Matrix Equations,” Communications in Statistics: Stochastic Models, vol. 7, no. 4, pp. 547-572, 1991. The Transient Solution of Time-Dependent M/M/1 Queues

J. Zhang and E. J. Coyle, “The Transient Solution of Time-Dependent M/M/1 Queues,” IEEE Trans. on Information Theory, vol. IT-37, no. 6, pp. 1690-1695, November 1991. Transient Analysis of the M(t)/M(t)/1 Queue

J. Zhang and E. J. Coyle, “Transient Analysis of the M(t)/M(t)/1 Queue,” Chapter 36 in “Numerical Solutions of Markov Chains,” pp. 655-658, edited by W.J. Stewart, Marcel Dekker, Inc., New York, 1990. (reprint of Conference Paper [44]). The Transient Solution of Time-Dependent M/M/1 Queues

J. Zhang and E. J. Coyle, “The Transient Solution of Time-Dependent M/M/1 Queues,” Proceedings of the First Int. Workshop on the Numerical Solution of Markov Chains, pp. 655-658, Raleigh, NC, Jan. 7-9, 1990. Finite Memory Recursive Solutions for the Equilibrium and Transient Analysis of G/M/1-Type Markov Processes

G. R. Murthy and E. J. Coyle, “Finite Memory Recursive Solutions for the Equilibrium and Transient Analysis of G/M/1-Type Markov Processes,” presented at the 1990 IEEE Int. Symposium on Information Theory, San Diego, CA, Jan. 14-19, 1990. State signal processingace Expansions and the Limiting Behavior of Quasi-Birth-Death Processes

S. L. Beuerman and E. J. Coyle, “State signal processingace Expansions and the Limiting Behavior of Quasi-Birth-Death Processes,” Advances in Applied Probability, vol. 21, no. 2, pp. 284 314, June 1989. Transient Analysis of Quasi-Birth-and-Death Processes

J. Zhang and E. J. Coyle, “Transient Analysis of Quasi-Birth-and-Death Processes,” Communications in Statistics: Stochastic Models, vol. 5, no. 3, pp. 459-496, July-August 1989. Nonlinear Matrix Equations and Matrix Geometric Solutions in Stochastic Models

R. M. Garimella and E. J. Coyle, “Nonlinear Matrix Equations and Matrix Geometric Solutions in Stochastic Models,” presented at the 1989 CORS/TIMS/ORSA Joint National Meeting, Vancouver, Canada, May 8-10, 1989. Matrix Quadratic Equations and Quasi-Birth-Death Models of Multiple Access Networks

R. M. Garimella and E. J. Coyle, “Matrix Quadratic Equations and Quasi-Birth-Death Models of Multiple Access Networks,” presented at the 1989 CORS/TIMS/ORSA Joint National Meeting, Vancouver, Canada, May 8-10, 1989. Finite Memory Recursive Solutions for the Equilibrium and Transient Analysis of G/M/1 Type Markov Processes with Application to Spread signal Spectrum Multiple Access Networks

G. R. Murthy and E. J. Coyle, "Finite Memory Recursive Solutions for the Equilibrium and Transient Analysis of G/M/1 Type Markov Processes with Application to Spread signal Spectrum Multiple Access Networks,” Proceedings of the 1989 Conf. on Information Science and Systems, Johns Hopkins Univ., Baltimore, MD, March 22-24, 1989. Transient and Equilibrium Analysis of Spread Spectrum Slotted ALOHA Networks: Finite Memory Recursions

G. R. Murthy and E. J. Coyle, “Transient and Equilibrium Analysis of Spread Spectrum Slotted ALOHA Networks: Finite Memory Recursions,” Proceedings of the 1989 Allerton Conf on Communication, Control, and Computing, pp. 374-382, Monticello, IL, Sept. 27-29, 1989. Complete Level Crossing Information and Recursions in One-and Two-Dimensional QBD-processes

S. L. Beuerman, J. Zhang, and E. J. Coyle, “Complete Level Crossing Information and Recursions in One-and Two-Dimensional QBD-processes,” presented at the 1988 TIMS/ORSA National Meeting, Washington, DC, April 25-27, 1988. Transient Analysis of Quasi-Birth-Death Processes with Application to CSMA/CD Networks

J. Zhang and E. J. Coyle, “Transient Analysis of Quasi-Birth-Death Processes with Application to CSMA/CD Networks,” presented at the 1988 Int. Symposium on Information Theory, Kobe, Japan, June 19-24, 1988. Matrix Recursive Solutions in Quasi-Birth-Death Models of Random Access Networks

J. Zhang and E. J. Coyle, “Matrix Recursive Solutions in Quasi-Birth-Death Models of Random Access Networks,” Proceedings of the 22nd Annual Conf. on Information Science and Systems, pp. 92-97, Princeton, Univ., Princeton, NJ, March 14-16, 1988. Equilibrium and Transient Analysis of Communication Networks Modeled by QBD-Processes,

E. J. Coyle, S. L. Beuerman, and J. Zhang, “Equilibrium and Transient Analysis of Communication Networks Modeled by QBD-Processes,” presented at the 1988 TIMS/ORSA National Meeting, Washington, DC, April 25-27, 1988. Matrix Recursive Solutions in Quasi-Birth-Death Models of Random Access Networks

J. Zhang and E. J. Coyle, “Matrix Recursive Solutions in Quasi-Birth-Death Models of Random Access Networks,” presented at the 1988 Int. Symposium on Information Theory, Kobe, Japan, June 19-24, 1988. Matrix Quadratic Equations and Quasi-Birth-and-Death Processes

G. R. Murthy and E. J. Coyle, “Matrix Quadratic Equations and Quasi-Birth-and-Death Processes,” Proceedings of the Twenty-Sixth Allerton Conf. on Communication, Control, and Computing, pp. 589-598, Monticello, IL, Sept. 28-30, 1988. Closed Form Recursive for the Stationary Probability Vector of a Quasi-Birth-Death Process with a Guard State

S. L. Beuerman and E. J. Coyle, “Closed Form Recursive for the Stationary Probability Vector of a Quasi-Birth-Death Process with a Guard State,” Proc. of the 1986 Conf. on Information Science and Systems, pp. 460-464, Princeton, NJ, March 19-21, 1986. Recursive and Matrix Geometric Solutions in CSMA/CD Networks and Quasi-Birth-Death Processes

E. J. Coyle and S. L. Beuerman, “Recursive and Matrix Geometric Solutions in CSMA/CD Networks and Quasi-Birth-Death Processes,” presented at the 1986 Operations Research Conference, Miami, FL, Oct. 27-29, 1986. The Tail of the Waiting Time Distribution of a CSMA/CD Network

S. L. Beuerman and E. J. Coyle, “The Tail of the Waiting Time Distribution of a CSMA/CD Network,” Proceedings of the 1985 IEEE Global Communications Conference, New Orleans, LA, Dec. 1985. The Distribution of Delay and Caudal Characteristic Curve of CSMA/CD Networks

S. L. Beuerman and E. J. Coyle, “The Distribution of Delay and Caudal Characteristic Curve of CSMA/CD Networks,” Proceedings of the Twenty-Second Allerton Conference on Communication, Control, and Computing, pp. 395-404, Monticello, IL, Oct. 1984.