The Theory and VLSI Implementation of Stack Filters

E. J. Coyle, “The Theory and VLSI Implementation of Stack Filters,” Chapter appearing in VLSI Signal Processing, II, IEEE Press, edited by S. Y. Kung, R. E. Owen, and J. G. Nash, pp. 141-151, 1986. (text for Conference Presentation [21]) Median Filtering by Threshold Decomposition

J. P. Fitch, E. J. Coyle, and N. C. Gallagher, “Median Filtering by Threshold Decomposition,” IEEE Trans. on Acoustics Speech and Signal Processing, vol. ASSP-32, no. 6, pp. 1183-1188, Dec. 1984. Best Paper Award for Authors under Age 30, ASSP Society, 1986. The Analog Median Filter

J. P. Fitch, E. J. Coyle, and N. C. Gallagher, “The Analog Median Filter,” IEEE Trans. on Circuits and Systems, vol. CAS-33, no. 3, pp. 94-103, Jan. 1986. Stack Filters

P. D. Wendt, E. J. Coyle, and N. C. Gallagher, “Stack Filters,” IEEE Trans. on Acoustics, signal processingeech, and Signal Processing, vol. ASsignal processing-34, no. 4, pp. 898-911, August 1986 An Application of Median Filters to Digital Television

N. C. Gallagher, E. J. Coyle, and S. Naqvi, “An Application of Median Filters to Digital Television,” Proceedings of the 1986 Int. Conf. on Acoustics, Speech and Signal Processing, pp. 2451-2454, Tokyo, Japan, April 1986. The Theory and VLSI Implementation of Stack Filters

E. J. Coyle, “The Theory and VLSI Implementation of Stack Filters,” presented at the 1986 IEEE Workshop on VLSI Signal Processing, Los Angeles, CA, Nov., 1986; VLSI Signal Processing, II, IEEE Press, ed. S.-Y. Kung, R.E. Owen, and J.G. Nash, pp. 141-151, New York, NY, 1986. A Two-Hop Packet Radio Network with Product-Form Solution

R. L. Hamilton and E. J. Coyle, “A Two-Hop Packet Radio Network with Product-Form Solution,” Proc. of the 1986 Conf. on Information Science and Systems, pp. 871-876, Princeton, NJ, March 19-21. 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. On the Optimality of Rank-Order Operations

E. J. Coyle, “On the Optimality of Rank-Order Operations,” Proceedings of the 1986 Int. Conf. on Acoustics, signal processingeech, and Signal Processing, pp. 2539-2542, Tokyo, Japan, April 1986.