Result 1 to 20 from 46 total
Estimating bounds for quadratic assignment problems associated with Hamming and Manhattan distance matrices based on semidefinite programming. (English)
SIAM J. Optim. 20, No. 6, 3408-3426 (2010).
1
Prediction of the binding affinities of peptides to class II MHC using a regularized thermodynamic model. (English)
BMC Bioinform. 11, 41 (2010).
2
A new relaxation framework for quadratic assignment problems based on matrix splitting. (English)
Math. Program. Comput. 2, No. 1, 59-77 (2010).
3
Estimating bounds for quadratic assignment problems associated with Hamming and manhattan distance matrices based on semidefinite programming (English)
SIAM Journal on Optimization 20, No. 6, 3408-3426 (2010).
4
High-accuracy semidefinite programming bounds for kissing numbers (English)
Experimental Mathematics 19, No. 2, 175-179 (2010).
5
On computation of performance bounds of optimal index assignment (English)
DCC, 189-198 (2010).
6
Inner and outer loop optimization in semiconductor manufacturing supply chain management. (English)
Comput. Manag. Sci. 6, No. 4, 411-434 (2009).
7
A server for automated performance analysis of benchmarking data. (English)
Optim. Methods Softw. 21, No. 1, 105-120 (2006).
8
Recent developments in barycentric rational interpolation. (English)
Mache, Detlef H. (ed.) et al., Trends and applications in constructive approximation. Papers of the 4th IBoMAT meeting, Witten-Bommerholz, Germany, February 15‒19, 2004. Basel: Birkhäuser (ISBN 3-7643-7124-2/hbk). ISNM. International Series of Numerical Mathematics 151, 27-51 (2005).
9
Hybrid discrete event simulation with model predictive control for semiconductor supply-chain manufacturing (English)
Winter Simulation Conference, 256-266 (2005).
10
Adaptive point shifts in rational approximation with optimized denominator. (English)
J. Comput. Appl. Math. 164-165, 81-92 (2004).
11
Linear rational interpolation and its application in approximation and boundary value problems. (English)
Rocky Mt. J. Math. 32, No.2, 527-544 (2002).
12
Sufficient optimality for discretized parabolic and elliptic control problems. (English)
Hoffmann, Karl-Heinz (ed.) et al., Fast solution of discretized optimization problems. Workshop held at the Weierstrass Institute for Applied Analysis and Stochastics, Berlin, Germany, May 8-12, 2000. Basel: Birkhäuser. ISNM, Int. Ser. Numer. Math. 138, 184-196 (2001).
13
Optimization techniques for solving elliptic control problems with control and state constraints. II: Distributed control. (English)
Comput. Optim. Appl. 18, No.2, 141-160 (2001).
14
Rational interpolation through the optimal attachment of poles to the interpolating polynomial. (English)
Numer. Algorithms 23, No.4, 315-328 (2000).
15
Solving elliptic control problems with interior point and SQP methods: Control and state constraints. (English)
J. Comput. Appl. Math. 120, No.1-2, 175-195 (2000).
16
Optimization techniques for solving elliptic control problems with control and state constraints. I: Boundary control. (English)
Comput. Optim. Appl. 16, No.1, 29-55 (2000).
17
Exponentially convergent linear rational interpolation between equidistant (and other) points. (English)
Methods Appl. Anal. 4, No.1, 67-76 (1997).
18
Lebesgue constant minimizing linear rational interpolation of continuous functions over the interval. (English)
Comput. Math. Appl. 33, No.6, 77-86 (1997).
19
Matrices for the direct determination of the barycentric weights of rational interpolation. (English)
J. Comput. Appl. Math. 78, No.2, 355-370 (1997).
20
Result 1 to 20 from 46 total
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