Mathematics - 1988

Chu, M. T. (1988). A derivative-free iterative method for locating the hand position of a robot manipulator (No. MCSP48-0189). Argonne National Laboratory.

Chu, M. T., Li, T. Y., & Sauer, T. (1988). Homotopy Method for General $\lambda $-Matrix Problems. SIAM Journal on Matrix Analysis and Applications, 9(4), 528–536. https://doi.org/10.1137/0609043

Chu, M. T., & Norris, L. K. (1988). Isospectral Flows and Abstract Matrix Factorizations. SIAM Journal on Numerical Analysis, 25(6), 1383–1391. https://doi.org/10.1137/0725080

Chu, M. T. (1988). A note on the homotopy method for linear algebraic eigenvalue problems. Linear Algebra and Its Applications, 105(C), 225–236. https://doi.org/10.1016/0024-3795(88)90015-8

Chu, M. T. (1988). On the continuous realization of iterative processes. SIAM Review, 30(3), 375–387. https://doi.org/10.1137/1030090

Li, Z. (1988). Optimal conjugate gradient method for solving arbitrary linear equations. Journal of Nanjing Normal University (Natural Science Edition), (3), 28–34.

Shearer, M. (1988). Loss of strict hyperbolicity for the Buckley-Leverett equations of three phase flow in a porous medium. In M. Wheeler (Ed.), Numerical simulation in oil recovery. New York: Springer.

Campbell, S. L. (1988). Bilinear nonlinear descriptor control systems in Linear Algebra in Signals, Systems, and Control. In B. N. Datta (Ed.), Linear algebra in signals, systems, and control : proceedings of the Conference on Linear Algebra in Signals, Systems, and Control, Boston, Massachusetts, August 12-14, 1986 (pp. 439–511). Philadelphia, PA: Society for Industrial and Applied Mathematics.

Delosme, J.-M., Ipsen, I. C. F., & Paige, C. C. (1988). The Cholesky factorization, Schur complements, correlation coefficients, angles between vectors, and the QR factorization (Research Report No. 607). New Haven, Connecticut: Department of Computer Science, Yale University.

Ito, K., & Tran, H. T. (1988). Linear quadratic regulator problem for infinite dimensional linear systems with delays in control. Proceedings of the 27th IEEE Conference on Decision and Control, 2012–2017. https://doi.org/10.1109/cdc.1988.194687

Bai, Z. D., Silverstein, J. W., & Yin, Y. Q. (1988). A note on the largest eigenvalue of a large dimensional sample covariance matrix. Journal of Multivariate Analysis, 26(2), 166–168. https://doi.org/10.1016/0047-259x(88)90078-4

Campbell, S. L. (1988). A general method for nonlinear descriptor systems: an example from robotic path control. Proceedings of the 27th IEEE Conference on Decision and Control. Presented at the 27th IEEE Conference on Decision and Control. https://doi.org/10.1109/cdc.1988.194386

Shearer, M. (1988). Dynamic phase transitions in a van der Waals gas. Quarterly of Applied Mathematics, 46(4), 631–636. https://doi.org/10.1090/qam/973380

Combettes, P. L., & Trussell, H. J. (1988). Stability of the linear prediction filter: a set theoretic approach. ICASSP-88., International Conference on Acoustics, Speech, and Signal Processing, 2288–2291. https://doi.org/10.1109/icassp.1988.197094

Campbell, S. L. (1988). Control problem structure and the numerical solution of linear singular systems. Mathematics of Control, Signals, and Systems, 1(1), 73–87. https://doi.org/10.1007/bf02551237

Kaltofen, E., & Trager, B. (1988). Computing with polynomials given by black boxes for their evaluations: greatest common divisors, factorization, separation of numerators and denominators. [Proceedings 1988] 29th Annual Symposium on Foundations of Computer Science. Presented at the [Proceedings 1988] 29th Annual Symposium on Foundations of Computer Science. https://doi.org/10.1109/sfcs.1988.21946

Miller, G. L., Ramachandran, V., & Kaltofen, E. (1988). Efficient Parallel Evaluation of Straight-Line Code and Arithmetic Circuits. SIAM Journal on Computing, 17(4), 687–695. https://doi.org/10.1137/0217044

Kaltofen, E. (1988). Greatest common divisors of polynomials given by straight-line programs. Journal of the ACM, 35(1), 231–264. https://doi.org/10.1145/42267.45069

Freeman, T. S., Imirzian, G. M., Kaltofen, E., & Yagati, L. (1988). Dagwood: a system for manipulating polynomials given by straight-line programs. ACM Transactions on Mathematical Software, 14(3), 218–240. https://doi.org/10.1145/44128.214376

Gregory, B., & Kaltofen, E. (1988). Analysis of the binary complexity of asymptotically fast algorithms for linear system solving. ACM SIGSAM Bulletin, 22(2), 41–49. https://doi.org/10.1145/43876.43880

Clapp, T. G., Kelley, C. T., & Eberhardt, A. C. (1988). Development and validation of a method for approximation of road surface texture-induced contact pressure in tire/pavement interaction. Tire Science and Technology, 16, 2–17.

Kelley, C. T. (1988). The {F_N} method in finite slabs with a polynomial basis. Trans. Th. Stat. Phys., 17, 295–303.

Kelley, C. T., & Northrup, J. I. (1988). A Pointwise Quasi-Newton Method for Integral Equations. SIAM Journal on Numerical Analysis, 25(5), 1138–1155. https://doi.org/10.1137/0725065

Clapp, T. G., Eberhardt, A. C., & Kelley, C. T. (1988). Development and Validation of a Method for Approximating Road Surface Texture‐Induced Contact Pressure in Tire‐Pavement Interaction. Tire Science and Technology, 16(1), 2–17. https://doi.org/10.2346/1.2148796

Kelley, C. T. (1988). The FN method in slab geometries with a polynomial basis. Transport Theory and Statistical Physics, 17(2-3), 295–303. https://doi.org/10.1080/00411458808230869

Ipsen, I. C. F. (1988). Systolic Algorithms for the Parallel Solution of Dense Symmetric Positive-Definite Toeplitz Systems. In The IMA Volumes in Mathematics and Its Applications (pp. 85–108). https://doi.org/10.1007/978-1-4684-6357-6_7

Delosme, J.-M., & Ipsen, I. (1988). SAGA and CONDENSE: a two-phase approach for the implementation of recurrence equations on multiprocessor architectures. [1988] Proceedings of the Twenty-First Annual Hawaii International Conference on System Sciences. Volume I: Architecture Track, 126–130. https://doi.org/10.1109/hicss.1988.11756

Campbell, S. L., & Clark, K. D. (1988). Singular control problem structure and the convergence of backward differentiation formulas. In C. I. Brynes, C. F. Martin, & R. E. Saeks (Eds.), Linear Circuits, Systems, and Signal Processing (pp. 19–26). North Holland.