Operations Research - 1985

Uzsoy, R. (1985). A Survey of Heuristic Algorithms. Sanayi Muhendisligi, 4, 20–22.

Huang, K., & Li, Z. (1985). On the relation between the behavior and the distribution of the zeros of a polynomial. Journal of Nanjing University, Mathematics Biquarterly, 2(1), 53–59.

Delosme, J.-M., & Ipsen, I. C. F. (1985). An illustration of a methodology for the construction of efficient systolic architectures in VLSI. Proceedings of the Second International Symposium on VLSI Technology, Systems and Applications, 268–273.

Fang, S. (1985). Multiple Link Outage Analysis, AT&T Bell Laboratories (AT&T Bell Laboratories Internal Memorandum No. 54112-850703-01).

Fang, S., & Rajasekera, J. R. (1985). Controlled Dual Perturbations for lp Programming (AT&T Bell Laboratories Technical Memorandum No. 54112-851115-01).

Fang, S., & Rajasekera, J. R. (1985). A Perturbation Method for Quadratically Constrained Quadratic Programming (AT&T Bell Laboratories Technical Memorandum No. 54112-850715-01).

Fang, S., & Rajasekera, J. R. (1985). A Dual Perturbation Method for Geometric Programming (AT&T Bell Laboratories Technical Memorandum No. 54112-850815-0).

Fang, S. (1985). Dynamic Facility Network Planning – Modeling (AT&T Bell Laboratories Technical Memorandum No. 54112–850915–01).

Murr, M. R., & Fang, S. (1985). An Introduction to Multimode LITES (Technical Report No. CC8305). AT&T Engineering Research Center.

Fang, S., & Murr, M. R. (1985). Finding a Simple Sequential Algorithm for Transportation Problems. IIE Proceedings of Annual Conference, 533–537.

Roise, J. P. (1985). Diameter Class Optimization in Even Aged Stands. In R. C. Field & P. E. Dress (Eds.), Proceedings of S.A.F. Systems Analysis Symposium. Athens, Georgia.

Fang, S. C. (1985). Optimal assortment with concave cost functions. International Journal of Systems Science, 16(10), 1305–1311. https://doi.org/10.1080/00207728508926753

Fang, S. C., & Peterson, E. L. (1985). An economic equilibrium model on a multicommodity network. International Journal of Systems Science, 16(4), 479–490. https://doi.org/10.1080/00207728508926688

Fang, S. C., & Peterson, E. L. (1985). A fixed-point representation of the generalized complementarity problem. Journal of Optimization Theory and Applications, 45(3), 375–381. https://doi.org/10.1007/bf00938441

Tran, H., & Manitius, A. (1985). On the numerical approximations for linear functional differential equations with input and output delays. 1985 24th IEEE Conference on Decision and Control. Presented at the 1985 24th IEEE Conference on Decision and Control, Fort Lauderdale, FL. https://doi.org/10.1109/cdc.1985.268746

Manitius, A., & Tran, H. (1985). Computation of closed-loop eigenvalues associated with the optimal regulator problem for functional differential equations. IEEE Transactions on Automatic Control, 30(12), 1245–1248. https://doi.org/10.1109/tac.1985.1103866

Campbell, S. L. (1985). Rank deficient least squares and the numerical solution of linear singular implicit systems of differential equations. https://doi.org/10.1090/conm/047/828292

Campbell, S. L. (1985). The Numerical Solution of Higher Index Linear Time Varying Singular Systems of Differential Equations. SIAM Journal on Scientific and Statistical Computing, 6(2), 334–348. https://doi.org/10.1137/0906024

Campbell, S., & Rodriguez, J. (1985). Bounded solutions of discrete singular systems on infinite time intervals. IEEE Transactions on Automatic Control, 30(2), 165–168. https://doi.org/10.1109/tac.1985.1103905

Stallmann, M. (1985). Using PQ-trees for planar embedding problems. North Carolina State University. Dept. of Computer Science.

Gabow, H. N., & Stallmann, M. (1985). Efficient algorithms for graphic matroid intersection and parity. International Colloquium on Automata, Languages, and Programming, 210–220.

Kelley, C. T., & Sachs, E. W. (1985). Broyden's method for approximate solution of nonlinear integral equations. Journal of Integral Equations, 9(1), 25–44.

Kelley, C. T., & Mullikin, T. W. (1985). Why does the {F_N}-Method work? Trans. Th. Stat. Phys., 14, 513–526.

Clapp, T. G., Kelley, C. T., & Eberhardt, A. C. (1985). Analytical determination of normal contact stresses for arbitrary geometries with application to the tire/pavement interaction mechanism. In T. D. Gillespie & M. Sayers (Eds.), Measuring Road Roughness and its Effects on User Cost and Comfort (pp. 162–178). Baltimore.

Decker, D. W., & Kelley, C. T. (1985). Expanded Convergence Domains for Newton’s Method at Nearly Singular Roots. SIAM Journal on Scientific and Statistical Computing, 6(4), 951–966. https://doi.org/10.1137/0906064

Decker, D. W., & Kelley, C. T. (1985). Broyden’s Method for a Class of Problems Having Singular Jacobian at the Root. SIAM Journal on Numerical Analysis, 22(3), 566–574. https://doi.org/10.1137/0722034

Bhatt, S. N., & Ipsen, I. C. F. (1985). How to embed trees in hypercubes (Research Report No. 443). New Haven, Connecticut: Department of Computer Science, Yale University.

Kelley, C. T., & Mullikin, T. W. (1985). Why does the -method work? Transport Theory and Statistical Physics, 14, 513–526.