Evolution and Optimum Seeking

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262 References Chichinadze, V.K. (1969), The Psi-transform for solving linear and non-linear programming problems, Automatica 5, 347-356 Cizek, F., D. Hodanova (1971), Evolution als Selbstregulation, G. Fischer, Jena, Germany Clayton, D.G. (1971), Algorithm AS-46|Gram-Schmidt orthogonalization, Appl. Stat. 20, 335-338 Clegg, J.C. (1970), Variationsrechnung, Teubner, Stuttgart Cochran, W.G., G.M. Cox (1950), Experimental designs, Wiley, NewYork Cockrell, L.D. (1969), A comparison of several random search techniques for multimodal surfaces, Proceedings of the National Electronics Conference, Chicago IL, Dec. 1969, pp. 18-23 Cockrell, L.D. (1970), On search techniques in adaptive systems, Ph.D. thesis, Purdue University, Lafayette IN, June 1970 Cohen, A.I. (1972), Rate of convergence of several conjugate gradient algorithms, SIAM J. Numer. Anal. 9, 248-259 Cohn, D.L. (1954), Optimal systems I|the vascular system, Bull. Math. Biophys. 16, 59-74 Collatz, L., W. Wetterling (1971), Optimierungsaufgaben, 2nd ed., Springer, Berlin Colville, A.R. (1968), A comparative study on nonlinear programming codes, IBM New York Science Center, report 320-2949, June 1968 Colville, A.R. (1970), A comparative study of nonlinear programming codes, in: Kuhn (1970), pp. 487-501 Conrad, M. (1988), Prolegomena to evolutionary programming, in: Kochen and Hastings (1988), pp. 150-168 Converse, A.O. (1970), Optimization, Holt, Rinehart, Winston, New York Cooper, L. (Ed.) (1962), Applied mathematics in chemical engineering, AIChE Engineering Progress Symposium Series 58, no. 37 Cooper, L., D. Steinberg (1970), Introduction to methods of optimization, W.B. Saunders, Philadelphia Cornick, D.E., A.N. Michel (1972), Numerical optimization of distributed parameter systems by the conjugate gradient method, IEEE Trans. AC-17, 358-362 Courant, R. (1943), Variational methods for the solution of problems of equilibrium and vibrations, Bull. Amer. Math. Soc. 49, 1-23
References 263 Courant, R., D. Hilbert (1968a), Methoden der mathematischen Physik, 3rd ed., vol. 1, Springer, Berlin Courant, R., D. Hilbert (1968b), Methoden der mathematischen Physik, 2nd ed., vol. 2, Springer, Berlin Cowdrey, D.R., C.M. Reeves (1963), An application of the Monte Carlo method to the evaluation of some molecular integrals, Comp. J. 6, 277-286 Cox, D.R. (1958), Planning of experiments, Wiley, New York Cragg, E.E., A.V. Levy (1969), Study on a supermemory gradient method for the minimization of functions, JOTA 4, 191-205 Crippen, G.M., H.A. Scheraga (1971), Minimization of polypeptide energy, X|a global search algorithm, Arch. Biochem. Biophys. 144, 453-461 Crockett, J.B., H. Cherno (1955), Gradient methods of maximization, Pacif. J. Math. 5, 33-50 Crowder, H., P. Wolfe (1972), Linear convergence to the conjugate gradient method, IBM T.J. Watson Research Center, report RC-3330, Yorktown Heights NY, May 1972 Cryer, C.W. (1971), The solution of a quadratic programming problem using systematic overrelaxation, SIAM J. Contr. 9, 385-392 Cullum, J. (1972), An algorithm for minimizing a di erentiable function that uses only function values, in: Balakrishnan (1972), pp. 117-127 Curry, H.B. (1944), The method of steepest descent for non-linear minimization problems, Quart. Appl. Math. 2, 258-261 Curtis, A.R., J.K. Reid (1974), The choice of step lengths when using di erences to approximate Jacobian matrices, JIMA 13, 121-126 Curtiss, J.H. (1956), A theoretical comparison of the e ciencies of two classical methods and a Monte Carlo method for computing one component of the solution of a set of linear algebraic equations, in: Meyer (1956), pp. 191-233 Dambrauskas, A.P. (1970), The simplex optimization method with variable step, Engng. Cybern. 8, 28-36 Dambrauskas, A.P. (1972), Investigation of the e ciency of the simplex method of optimization with variable step in a noise situation, Engng. Cybern. 10, 590-599 Daniel, J.W. (1967a), The conjugate gradient method for linear and nonlinear operator equations, SIAM J. Numer. Anal. 4, 10-26
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Evolution and Optimum Seeking Hans-
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vi Multiple Data) machines with man
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viii 3.2.1.6 Complex Strategy of Bo
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Chapter 1 Introduction There is sca
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Introduction 3 simple matter to col
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Chapter 2 Problems and Methods of O
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Particular Problems and Methods of
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Other Special Cases 19 with expecta
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Other Special Cases 21 parts of the
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Chapter 3 Hill climbing Strategies
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One Dimensional Strategies 25 then
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One Dimensional Strategies 27 Even
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One Dimensional Strategies 29 The b
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One Dimensional Strategies 31 F(x)
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One Dimensional Strategies 33 For t
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One Dimensional Strategies 35 It is
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One Dimensional Strategies 37 F P F
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Multidimensional Strategies 39 the
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Multidimensional Strategies 41 asch
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Multidimensional Strategies 43 e 2
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Multidimensional Strategies 45 Step
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Multidimensional Strategies 47 Numb
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Multidimensional Strategies 49 wher
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Multidimensional Strategies 53 Numb
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Multidimensional Strategies 55 The
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Multidimensional Strategies 57 Anum
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Multidimensional Strategies 61 Iter
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Multidimensional Strategies 63 (If
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Multidimensional Strategies 65 eval
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Multidimensional Strategies 67 The
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Multidimensional Strategies 69 devi
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Multidimensional Strategies 71 spec
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Multidimensional Strategies 73 othe
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Multidimensional Strategies 75 anot
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Multidimensional Strategies 77 3.2.
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Multidimensional Strategies 81 Brow
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Multidimensional Strategies 83 (197
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Multidimensional Strategies 85 meth
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Chapter 4 Random Strategies One gro
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Random Strategies 89 parts is taken
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Random Strategies 91 Pardalos and R
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Random Strategies 93 to write the n
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Random Strategies 95 the expectatio
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Random Strategies 97 maintained at
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Random Strategies 99 works entirely
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Random Strategies 101 the principle
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Random Strategies 103 out, a limite
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Chapter 5 Evolution Strategies for
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The Two Membered Evolution Strategy
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A Multimembered Evolution Strategy
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Genetic Algorithms 151 too is the c
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Genetic Algorithms 153 mean objecti
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Genetic Algorithms 155 p( ∆x) 1 1
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Genetic Algorithms 157 out any chan
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Genetic Algorithms 159 Average Numb
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Simulated Annealing 161 There are t
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Tabu Search and Other Hybrid Concep
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Chapter 6 Comparison of Direct Sear
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Theoretical Results 167 Oettli, 196
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Theoretical Results 169 where 0
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Theoretical Results 171 tions. Simi
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Numerical Comparison of Strategies
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Page 245 and 246: Summary and Outlook 237 numerical o
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Page 257 and 258: Chapter 8 References Glossary of ab
Page 259 and 260: References 251 Anscombe, F.J. (1959
Page 261 and 262: References 253 Bandler, J.W. (1969b
Page 263 and 264: References 255 Bendin, F. (1992), E
Page 265 and 266: References 257 Booth, A.D. (1955),
Page 267 and 268: References 259 Brent, R.P. (1971),
Page 269: References 261 Carroll, C.W. (1961)
Page 273 and 274: References 265 Davies, M., I.J. Whi
Page 275 and 276: References 267 Dvoretzky, A. (1956)
Page 277 and 278: References 269 Fiacco, A.V. (1974),
Page 279 and 280: References 271 Fogel, L.J., A.J. Ow
Page 281 and 282: References 273 Gill, P.E., W. Murra
Page 283 and 284: References 275 Graves, R.L., P. Wol
Page 285 and 286: References 277 Heckler, R., H.-P. S
Page 287 and 288: References 279 Ho meister, F., H.-P
Page 289 and 290: References 281 Idelsohn, J.M. (1964
Page 291 and 292: References 283 Karnopp, D.C. (1966)
Page 293 and 294: References 285 Kochen, M., H.M. Has
Page 295 and 296: References 287 Kunzi, H.P., H.G. Tz
Page 297 and 298: References 289 LeCam, L.M., J. Neym
Page 299 and 300: References 291 Mamen, R., D.Q. Mayn
Page 301 and 302: 294 References Miele, A., H.Y. Huan
Page 303 and 304: 296 References Murray, W. (Ed.) (19
Page 305 and 306: 298 References Oldenburger, R. (Ed.
Page 307 and 308: 300 References Peschel, M. (1980),
Page 309 and 310: 302 References Powell, M.J.D. (1970
Page 311 and 312: 304 References Rechenberg, I. (1989
Page 313 and 314: 306 References Rybashov, M.V. (1969
Page 315 and 316: 308 References Schmidt, J.W., K. Ve
Page 317 and 318: 310 References Shedler, G.S. (1967)
Page 319 and 320: 312 References Steinbuch, K. (1971)
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314 References Tabak, D. (1970), Ap
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316 References Varela, F.J., P. Bou
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318 References White, L.J., R.G. Da
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320 References Youden, W.J., O. Kem
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322 References Glossary of Abbrevia
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324 References
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326 Appendix A Problem 1.2 Objectiv
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328 Appendix A Minimum: x =(3 0:5)
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330 Appendix A Figure A.3: Graphica
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332 Appendix A Several of the searc
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338 Appendix A Minimum: Start: Prob
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340 Appendix A Problem 2.20 Objecti
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342 Appendix A Problem 2.23 Objecti
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344 Appendix A Start: x (0) i =10 f
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346 Appendix A on the interval 0 y
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348 Appendix A Problem 2.32 after B
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350 Appendix A Constraints: Gj(x) =
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352 Appendix A The constraints form
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354 Appendix A Start: x (0) =(250 2
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356 Appendix A Problem 2.44 As Prob
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358 Appendix A Figure A.29: Graphic
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360 Appendix A Start: Figure A.31:
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362 Appendix A Problem 3.2 (analogo
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364 Appendix A Problem 3.6 (analogo
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366 Appendix A Minimum: x i =0 for
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368 Appendix B LF (integer) Return
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370 Appendix B 4. Convergence crite
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372 Appendix B 8. Function Z(S,R) T
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374 Appendix B 25 L(K)=L(K+1) L(10)
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376 Appendix B LF=2 (continued) No
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378 Appendix B man), vol. 15 of Pro
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380 Appendix B instead of T, as a p
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382 Appendix B 15 CONTINUE 16 FF=F(
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384 Appendix B SK(KS)=AMAX1(SM(I),A
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386 Appendix B B.3 ( + ) Evolution
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388 Appendix B EPSILO (one dimensio
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390 Appendix B GLEICH (real functio
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392 Appendix B GLEICH, and TKONTR d
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394 Appendix B 1 NL=1+N-NS NM=N-1 N
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396 Appendix B ZSTERN=ZBEST K=LBEST
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398 Appendix B C NEGATIVE (LETHAL M
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400 Appendix B C C PREPARE FINAL DA
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402 Appendix B 2 IF(.NOT.BKOMMA.OR.
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404 Appendix B 32 WRITE(KANAL,126)
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406 Appendix B DO 4 I=1,NX KI=KI1 I
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408 Appendix B Subroutine MINMAX MI
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410 Appendix B 2 IF(U.LT..965487131
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412 Appendix B parameters by multip
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414 Appendix B
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416 Appendix C - SIMP Simplex strat
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418 Appendix C C.3.2 How to Install
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420 Appendix C { } return(0.26*(x[0
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422 Appendix C 1 No recombination 2
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424 Appendix C 8e-07 8e-07 Initial
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426 Index Banach, S., 10 Bandler, J
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428 Index Coordinate strategy, 41{4
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430 Index Evolution strategy, 3, 6,
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432 Index Graves, R.L., 23 Great de
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434 Index Khurgin, Ya.I., 89 Kiefer
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436 Index Michie, D., 102 Mickey, M
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438 Index Parkinson, J.M., 61 Parta
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440 Index Rotating coordinates meth
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442 Index Storey, C., 23, 50, 54 St
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444 Index Wilson, S.W., 103 Witt, U
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