[F. L. BAUER, (1963), Optimally scaled matrices, Numerische Mathematik, 5, 7387.10.1007/BF01385880]Search in Google Scholar
[F. L. BAUER, (1969), Remarks on optimally scaled matrices, Numerische Mathematik, 13, 13.10.1007/BF02165268]Search in Google Scholar
[D. R. Braatz, Manfred Morari, (1994), Minimizing the Euclidean Condition Number. SIAM Journal on Control and Optimization, 32(6):17631768.10.1137/S0363012992238680]Search in Google Scholar
[P. A. Businger, (1968), Matrices Which Can Be Optimally Scaled. Numerische Mathematik, 12:346348.10.1007/BF02162515]Search in Google Scholar
[Chin-Chieh Chiang, John P. Chandler, An Approximate Equation for the Condition Numbers of Well-scaled Matrices Proceedings of The 2008 IAJC-IJME International Conference.]Search in Google Scholar
[A. Chutarat, (2001), Experience of Light: The Use of an Inverse Method and a Genetic Algorithm in Daylighting Design, Ph.D. Thesis, Dept. of Architecture, MIT, Cambridge, MA.]Search in Google Scholar
[A. R. CURTIS AND J. K. REID, (1972), On the automatic scaling of matrices for Gaussian elimination, J. Inst. Maths. Applics., 10, 118124.]Search in Google Scholar
[I. S. DUFF, A. M. ERISMAN, AND J. K. REID, (1986), Direct Methods for Sparse Matrices, Oxford University Press, London.]Search in Google Scholar
[I. S. DUFF AND J. KOSTER, (1999), On algorithms for permuting large entries to the diagonal of a sparse matrix, Tech. Rep. RAL-TR-1999-030, Rutherford Appleton Laboratory. SIAM Journal on Matrix Analysis and Applications.10.1137/S0895479897317661]Search in Google Scholar
[Gero, J., and Radford, A. (1978), A Dynamic Programming Approach to the Optimum Lighting Problem, Eng. Optimize. 3(2), pp. 71-82.]Search in Google Scholar
[HSL, (2000), A collection of Fortran codes for large scale scientific computation. http://www.cse.clrc.ac.uk/Activity/HSL]Search in Google Scholar
[D. Ruiz, A scaling algorithm to equilibrate both rows and columns norms in matrices, Tech. Rep. RAL-TR-2001-034, Rutherford Appleton Laboratory, 2001.]Search in Google Scholar
[R. Rump, Optimal scaling for p-norms and componentwise distance to singularity, IMA J. Numer. Anal. 23 (2003), pp. 19.]Search in Google Scholar
[M. H. SCHNEIDER AND S. ZENIOS, (1990), A comparative study of algorithms for matrix balancing, Operations Research, 38, 439455.10.1287/opre.38.3.439]Search in Google Scholar
[A. VAN DER SLUIS, (1969), Condition Numbers and Equilibration of Matrices, Numer. Math., 14, 1423.]Search in Google Scholar
[Watson, G. A. (1991), An Algorithm for Optimal 2 Scaling of Matrices. IMA J. Numer. Anal., 11:481492.]Search in Google Scholar