[1] |
HANSSEN A G, GIRARD Y, OLOVSSON L, et al. A numerical model for bird strike of aluminium foam-based sandwich panels[J]. International Journal of Impact Engineering, 2006, 32(7): 1127-1144.
|
[2] |
HELFMAN G, COLLETTE B B, FACEY D E, et al. The Diversity of Fishes: Biology, Evolution, and Ecology[M]. Chichester,UK: Wiley-Blackwell, 2009.
|
[3] |
GROTBERG J B, JENSEN O E. Biofluid mechanics in flexible tubes[J]. Annual Review of Fluid Mechanics, 2004, 36(1): 121-147.
|
[4] |
WEINBERG E J, SHAHMIRZADI D, MOFRAD M R K. On the multiscale modeling of heart valve biomechanics in health and disease[J]. Biomechanics and Modeling in Mechanobiology, 2010, 9(4): 373-387.
|
[5] |
LIU B, POWERS T R, BREUER K S. Force-free swimming of a model helical flagellum in viscoelastic fluids[J]. Proceedings of the National Academy of Sciences, 2011, 108(49): 19516-19520.
|
[6] |
ZHU L, PESKIN C S. Simulation of a flapping flexible filament in a flowing soap film by the immersed boundary method[J]. Journal of Computational Physics, 2002, 179(2): 452-468.
|
[7] |
SHELLEY M J, ZHANG J. Flapping and bending bodies interacting with fluid flows[J]. Annual Review of Fluid Mechanics, 2011, 43: 449-465.
|
[8] |
CONNELL B S H, YUE D K P. Flapping dynamics of a flag in a uniform stream[J]. Journal of Fluid Mechanics, 2007, 581:33-67.
|
[9] |
ZHU L, PESKIN C S. Interaction of two flapping filaments in a flowing soap film[J]. Physics of Fluids, 2003, 15(7): 1954-1960.
|
[10] |
SCHOWALTER W R. Mechanics of Non-Newtonian fluid[M]. Oxford: Pergamon, 1978.
|
[11] |
MIN T, YOO J Y, CHOI H, et al. Drag reduction by polymer additives in a turbulent channel flow[J]. Journal of Fluid Mechanics, 2003, 486: 213-238.
|
[12] |
HUA R N, ZHU L, LU X Y. Locomotion of a flapping flexible plate[J]. Physics of Fluids, 2013, 25(12): 121901.
|
[13] |
ZHU L. Numerical investigation of the dynamics of a flexible filament in the wake of cylinder[J]. Advances in Applied Mathematics and Mechanics, 2014, 6(4): 478-493.
|
[14] |
HE X, LUO L S. Theory of the lattice Boltzmann method: From the Boltzmann equation to the lattice Boltzmann equation[J]. Physical Review E, 1997, 56(6): 6811-6817.
|
[15] |
MALASPINAS O, FIETIER N, DEVILLE M. Lattice Boltzmann method for the simulation of viscoelastic fluid flows[J]. Journal of Non-Newtonian Fluid Mechanics, 2010, 165(23): 1637-1653.
|
[16] |
SU J, OUYANG J, WANG X, et al. Lattice Boltzmann method coupled with the Oldroyd-B constitutive model for a viscoelastic fluid[J]. Physical Review E, 2013, 88(5): 053304.
|
[17] |
GUO Z, ZHENG C, SHI B. Discrete lattice effects on the forcing term in the lattice Boltzmann method[J]. Physical Review E, 2002, 65(4): 046308.
|
[18] |
FERREIRA V G, TOM M F, MANGIAVACCHI N, et al. High-order upwinding and the hydraulic jump[J]. International Journal for Numerical Methods in Fluids, 2002, 39(7): 549-583.
|
[19] |
LEONARD B P. A stable and accurate convective modelling procedure based on quadratic upstream interpolation[J]. Computer Methods in Applied Mechanics and Engineering, 1979, 19(1): 59-98.
|
[20] |
DOYLE J F. Nonlinear Analysis of Thin-Walled Structures: Statics, Dynamics, and Stability[M]. New York: Springer Science & Business Media, 2013.
|
[21] |
HUANG W X, SHIN S J, SUNG H J. Simulation of flexible filaments in a uniform flow by the immersed boundary method[J]. Journal of Computational Physics, 2007, 226(2): 2206-2228.)
|
[1] |
HANSSEN A G, GIRARD Y, OLOVSSON L, et al. A numerical model for bird strike of aluminium foam-based sandwich panels[J]. International Journal of Impact Engineering, 2006, 32(7): 1127-1144.
|
[2] |
HELFMAN G, COLLETTE B B, FACEY D E, et al. The Diversity of Fishes: Biology, Evolution, and Ecology[M]. Chichester,UK: Wiley-Blackwell, 2009.
|
[3] |
GROTBERG J B, JENSEN O E. Biofluid mechanics in flexible tubes[J]. Annual Review of Fluid Mechanics, 2004, 36(1): 121-147.
|
[4] |
WEINBERG E J, SHAHMIRZADI D, MOFRAD M R K. On the multiscale modeling of heart valve biomechanics in health and disease[J]. Biomechanics and Modeling in Mechanobiology, 2010, 9(4): 373-387.
|
[5] |
LIU B, POWERS T R, BREUER K S. Force-free swimming of a model helical flagellum in viscoelastic fluids[J]. Proceedings of the National Academy of Sciences, 2011, 108(49): 19516-19520.
|
[6] |
ZHU L, PESKIN C S. Simulation of a flapping flexible filament in a flowing soap film by the immersed boundary method[J]. Journal of Computational Physics, 2002, 179(2): 452-468.
|
[7] |
SHELLEY M J, ZHANG J. Flapping and bending bodies interacting with fluid flows[J]. Annual Review of Fluid Mechanics, 2011, 43: 449-465.
|
[8] |
CONNELL B S H, YUE D K P. Flapping dynamics of a flag in a uniform stream[J]. Journal of Fluid Mechanics, 2007, 581:33-67.
|
[9] |
ZHU L, PESKIN C S. Interaction of two flapping filaments in a flowing soap film[J]. Physics of Fluids, 2003, 15(7): 1954-1960.
|
[10] |
SCHOWALTER W R. Mechanics of Non-Newtonian fluid[M]. Oxford: Pergamon, 1978.
|
[11] |
MIN T, YOO J Y, CHOI H, et al. Drag reduction by polymer additives in a turbulent channel flow[J]. Journal of Fluid Mechanics, 2003, 486: 213-238.
|
[12] |
HUA R N, ZHU L, LU X Y. Locomotion of a flapping flexible plate[J]. Physics of Fluids, 2013, 25(12): 121901.
|
[13] |
ZHU L. Numerical investigation of the dynamics of a flexible filament in the wake of cylinder[J]. Advances in Applied Mathematics and Mechanics, 2014, 6(4): 478-493.
|
[14] |
HE X, LUO L S. Theory of the lattice Boltzmann method: From the Boltzmann equation to the lattice Boltzmann equation[J]. Physical Review E, 1997, 56(6): 6811-6817.
|
[15] |
MALASPINAS O, FIETIER N, DEVILLE M. Lattice Boltzmann method for the simulation of viscoelastic fluid flows[J]. Journal of Non-Newtonian Fluid Mechanics, 2010, 165(23): 1637-1653.
|
[16] |
SU J, OUYANG J, WANG X, et al. Lattice Boltzmann method coupled with the Oldroyd-B constitutive model for a viscoelastic fluid[J]. Physical Review E, 2013, 88(5): 053304.
|
[17] |
GUO Z, ZHENG C, SHI B. Discrete lattice effects on the forcing term in the lattice Boltzmann method[J]. Physical Review E, 2002, 65(4): 046308.
|
[18] |
FERREIRA V G, TOM M F, MANGIAVACCHI N, et al. High-order upwinding and the hydraulic jump[J]. International Journal for Numerical Methods in Fluids, 2002, 39(7): 549-583.
|
[19] |
LEONARD B P. A stable and accurate convective modelling procedure based on quadratic upstream interpolation[J]. Computer Methods in Applied Mechanics and Engineering, 1979, 19(1): 59-98.
|
[20] |
DOYLE J F. Nonlinear Analysis of Thin-Walled Structures: Statics, Dynamics, and Stability[M]. New York: Springer Science & Business Media, 2013.
|
[21] |
HUANG W X, SHIN S J, SUNG H J. Simulation of flexible filaments in a uniform flow by the immersed boundary method[J]. Journal of Computational Physics, 2007, 226(2): 2206-2228.)
|