WAVES AND VIBRATIONS IN INHOMOGENEOUS STRUCTURES ...

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Acknowledgements The work was partially supported by the Danish Technical Research Council through the project ‘‘Designing bandgap materials and structures with optimized dynamic properties’’ and by the Danish Center for Scientific Computing (DCSC). References a Fraction of input power b Fraction of input power 1.0 0.8 0.6 0.4 0.2 0.0 1.0 0.8 0.6 0.4 0.2 ARTICLE <strong>IN</strong> PRESS J.S. Jensen / Journal of Sound and Vibration 301 (2007) 319–340 339 0 200 400 600 800 1000 1200 1400 1600 Frequency [Hz] 0.0 0 200 400 600 800 1000 1200 1400 1600 Frequency [Hz] Fig. 15. Dissipation D, reflectance R, and transmittance T for the optimized three-phase design in Fig. 13a for an S wave, (a) Z r ¼ 0:05 s 1 and (b) Z r ¼ 0:75 s 1 . Dissipation (solid), reflectance (dash), transmittance (dot). [1] M. Sigalas, M.S. Kushwaha, E.N. Economou, M. Kafesaki, I.E. Psarobas, W. Steurer, Classical vibrational modes in phononic lattices: theory and experiment, Zeitschrift für Kristallographie 220 (2005) 765–809. [2] O. Sigmund, J.S. Jensen, Systematic design of phononic band-gap materials and structures by topology optimization, Philosophical Transactions of the Royal Society London, Series A (Mathematical Physical and Engineering Sciences) 361 (2003) 1001–1019. [3] C. Rupp, M. Frenzel, A. Evgrafov, K. Maute, M.L. Dunn, Design of nanostructures phononic materials, Proceedings of IMECE2005, 2005 ASME International Mechanical Engineering Congress and Exposition, Orlando, Florida, USA, 2005. [4] S. Halkjær, O. Sigmund, J.S. Jensen, Inverse design of phononic crystals by topology optimization, Zeitschrift für Kristallographie 220 (2005) 895–905. [5] M.I. Hussein, K. Hamza, G.M. Hulbert, R.A. Scott, K. Saitou, Multiobjective evolutionary optimization of periodic layered materials for desired wave dispersion characteristics, Structural and Multidisciplinary Optimization 31 (2006) 60–75. [6] J.S. Jensen, Optimal design of lossy bandgap structures, Proceedings of XXI International Congress on Theoretical and Applied Mechanics, pages on CD–rom, Warsaw, August 15–21, 2004. [7] D. Razansky, P.D. Einziger, D.R. Adam, Effectiveness of acoustic power dissipation in lossy layers, Journal of the Acoustic Society of America 116 (1) (2004) 84–89. [8] I. Takewaki, Optimal damper placement for planar building frames using transfer functions, Structural and Multidisciplinary Optimization 20 (2000) 280–287.
340 ARTICLE <strong>IN</strong> PRESS J.S. Jensen / Journal of Sound and Vibration 301 (2007) 319–340 [9] J.A. Bishop, A.G. Striz, On using genetic algorithms for optimum damper placement in space trusses, Structural and Multidisciplinary Optimization 28 (2004) 136–145. [10] C.S. Jog, Topology design of structures subjected to periodic loading, Journal of Sound and Vibration 253 (3) (2002) 687–709. [11] B. Wang, G. Chen, Design of cellular structures for optimum efficiency of heat dissipation, Structural and Multidisciplinary Optimization 30 (2005) 447–458. [12] S.J. Cox, D.C. Dobson, Maximizing band gaps in two-dimensional photonic crystals, SIAM Journal for Applied Mathematics 59 (6) (1999) 2108–2120 ISSN 00361399. [13] J.S. Jensen, O. Sigmund, Systematic design of photonic crystal structures using topology optimization: low-loss waveguide bends, Applied Physics Letters 84 (12) (2004) 2022–2024. [14] D. Royer, E. Dieulesaint, Elastic Waves in Solids I, Springer, Berlin, Heidelberg, 2000 ISBN 3-540-65932-3. [15] M.P. Bendsøe, O. Sigmund, Topology Optimization—Theory, Methods and Applications, Springer, Berlin, Heidelberg, 2003. [16] J.S. Jensen, O. Sigmund, Topology optimization of photonic crystal structures: a high-bandwidth low-loss T-junction waveguide, Journal of the Optical Society of America B 22 (6) (2005) 1191–1198. [17] G. Allaire, G.A. Francfort, A numerical algorithm for topology and shape optimization, in: M.P. Bendsøe, C.A. Mota Soares (Eds.), Topology Optimization of Structures, Klu¨ wer Academic Publishers, Dordrecht, 1993, pp. 239–248. [18] U. Basu, A.K. Chopra, Perfectly matched layers for time-harmonic elastodynamics of unbounded domains: theory and finite-element implementation, Computer Methods in Applied Mechanics and Engineering 192 (2003) 1337–1375. [19] D.A. Tortorelli, P. Michaleris, Design sensitivity analysis: overview and review, Inverse Problems in Engineering 1 (1994) 71–105. [20] L.H. Olesen, F. Okkels, H. Bruus, A high-level programming-language implementation of topology optimization applied to steadystate navier-stokes flow, International Journal for Numerical Methods in Engineering 65 (2006) 975–1001. [21] K. Svanberg, The method of moving asymptotes—a new method for structural optimization, International Journal for Numerical Methods in Engineering 24 (1987) 359–373. [22] K. Svanberg, The method of moving asymptotes—modelling aspects and solution schemes, Lecture Notes for the DCAMM Course: advanced Topics in Structural Optimization, Lyngby, June 25–July 3, 1998. [23] D.V. Jones, M. Petyt, Ground vibration in the vicinity of a strip load: an elastic layer on an elastic half-space, Journal of Sound and Vibration 161 (1) (1993) 1–18.
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WAVES AND VIBRATIONS IN INHOMOGENEO
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Denne afhandling er af Danmarks Tek
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List of Thesis Papers [1] J. S. Jen
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Contents Preface i List of Thesis P
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Chapter 1 Introduction This thesis
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eplacemen Phononic and photonic ban
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Optimal material distribution - top
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Chapter 2 The bandgap phenomenon In
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2.1 Band diagram and forced vibrati
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2.3 Experimental demonstration 11 F
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y 2.5 Nonlinearities 13 Response in
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Relations to recent work 15 Amplitu
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Chapter 3 Bandgap structures as opt
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3.1 Vibration-quenching structures
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3.2 Maximizing wave reflection 21 d
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3.4 Maximizing wave dissipation 23
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3.4 Maximizing wave dissipation 25
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3.5 Plate structures 27 a) b) Figur
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3.6 Acoustic design 29 design domai
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Chapter 4 Optimization of photonic
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4.1 Waveguide bends and junctions 3
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4.2 Photonic crystal building block
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4.2 Photonic crystal building block
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4.4 Ridge waveguides 39 w ε =1 ?
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Relations to recent work 41 wave in
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Chapter 5 Advanced optimization pro
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5.1 Padé approximants 45 h 2h A f
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5.3 Space-time topology optimizatio
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5.3 Space-time topology optimizatio
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Relations to recent work 51 Figure
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Chapter 6 Conclusions In the first
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References K. Asakawa, Y. Sugimoto,
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References 57 W. R. Frei, D. A. Tor
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References 59 F. Maestre, A. Münch
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References 61 O. Sigmund, J. S. Jen
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References 63 X. M. Zhou and G. K.
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Dansk resumé 65 i strukturen. En r
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1054 ARTICLE IN PRESS J.S. Jensen /
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1058 fundamental eigenfrequency o
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1060 ðo 2 y;j;k ARTICLE IN PRESS J
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1062 local resonator and splits up
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1064 3.1. Model equations A finite
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1066 FRF (dB) 150 100 50 0 -50 -100
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1068 3.3. Example 2: a 2-D waveguid
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wave-guiding properties show promis
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(a) (b) Acceleration response (dB)
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B.S. Lazarov, J.S. Jensen / Interna
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ω/κ ω/κ 1.5 1.4 1.3 1.2 1.1 1 0
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[B 2000 ] [B 2000 ] [B 2000 ] 0.25
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[B 400 ] 0.25 0.2 0.15 0.1 0.05 B.S
Page 115 and 116: 1002 (a) (c) (e) 0. Sigmund and J.
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Page 127 and 128: 1014 . ct . _ a) Q^ s^c "3
Page 129 and 130: 1016 O. Sigmund and J. S. Jensen (a
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Page 134 and 135: Z. Kristallogr. 220 (2005) 895-905
Page 136 and 137: Inverse design of phononic crystals
Page 144: Inverse design of phononic crystals
Page 147 and 148: 320 Optimization of the dissipation
Page 149 and 150: 322 The reflection of the wave is f
Page 151 and 152: 324 which averaged over a wave peri
Page 153 and 154: 326 where the modified stress compo
Page 155 and 156: 328 optimization algorithm is enhan
Page 157 and 158: 330 reflectance are also seen (Fig.
Page 159 and 160: 332 It should be emphasized that ot
Page 161 and 162: 334 b Dissipation, D c Dissipation,
Page 163 and 164: 336 7.2. Three-phase design ARTICLE
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Page 169 and 170: 968 ARTICLE IN PRESS J.S. Jensen, N
Page 171 and 172: 970 To solve the wave equation with
Page 173 and 174: 972 In the following section, we sh
Page 175 and 176: 974 Design variable, t Design varia
Page 177 and 178: 976 Eigenvalue ratio, ω n+1 2 /ωn
Page 179 and 180: 978 to a design parameter te are gi
Page 181 and 182: 980 ARTICLE IN PRESS J.S. Jensen, N
Page 183 and 184: 982 respect to the higher bound C1
Page 185 and 186: 984 instead vary the value of b. Th
Page 187 and 188: 986 References ARTICLE IN PRESS J.S
Page 189 and 190: a thick solid was considered. A few
Page 191 and 192: The above expressions provide insta
Page 193 and 194: In all the examples shown a density
Page 195 and 196: domain. To the very left the passiv
Page 197 and 198: Jensen JS, Sigmund O (2005) Topolog
Page 199 and 200: paper extends on this work. For an
Page 201 and 202: R 1 0.9 0.8 0.7 0.6 0.5 0.4 0.3 0.2
Page 203 and 204: objective 1 0.9 0.8 0.7 0.6 0.5 0.4
Page 205 and 206: The optimization algorithm employs
Page 207 and 208: Appl. Phys. Lett., Vol. 84, No. 12,
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J. S. Jensen and O. Sigmund Vol. 22
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Topology optimization and fabricati
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Normalized transmission 1.0 0.8 0.6
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Fig. 4. Scanning electron micrograp
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Broadband photonic crystal waveguid
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2. Design and fabrication Silicon-o
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Fig. 3. Steady-state magnetic field
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Topology optimised broadband photon
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1202 IEEE PHOTONICS TECHNOLOGY LETT
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1204 IEEE PHOTONICS TECHNOLOGY LETT
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11. P. Debackere, S. Scheerlinck, P
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nanoimprinted patterns are transfer
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emoved and the spectra changed dras
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Y-splitter W1 waveguide 60-degree b
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5. Photonic Wire Waveguides Figure
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Figure 5: Optimized designs and cor
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Figure 8: Optimized designs and cor
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[13] Borel P I, Frandsen L H, Harp
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1606 J. S. JENSEN To compute a freq
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1608 J. S. JENSEN Cramer’s rule [
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1610 J. S. JENSEN The following pro
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1612 J. S. JENSEN Table I. Coeffici
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1614 J. S. JENSEN h 2h Α fcos Ωt
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1616 J. S. JENSEN The derivative of
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1618 J. S. JENSEN which is solved f
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1620 J. S. JENSEN Based on the expr
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1622 J. S. JENSEN Response, ln(u ti
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1624 J. S. JENSEN h 2h fcos Ωt Fi
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1626 J. S. JENSEN details and have
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1628 J. S. JENSEN Equation (A10) co
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1630 J. S. JENSEN 7. Coyette J-P, L
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The number of masses in the chain t
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5 Results The optimization algorith
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Figure 9. Response for optimized de
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Space-time topology optimization fo
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good for low to moderate stiffness
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V ¼ 0:3 at a given time instant fo
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The parameters used in this example
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Normalized amplitude 1 0.9 0.8 0.7
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at the Department of Mechanical Eng
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600 J.S. JENSEN techniques for obta
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602 J.S. JENSEN 1 and 2, where the
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604 J.S. JENSEN 4. Numerical analys
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606 J.S. JENSEN Energy, E a) Energy
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608 J.S. JENSEN relaxed somewhat in
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610 J.S. JENSEN when the contrast i
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612 J.S. JENSEN 6. Summary and conc
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614 J.S. JENSEN Sigmund, O. and Jen
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