Relevant bibliographies by topics / Problems of three bodies

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Academic literature on the topic 'Problems of three bodies'

Author: Grafiati
Published: 4 June 2021
Last updated: 27 January 2023

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Journal articles on the topic "Problems of three bodies"

1

Pawlett Jackson, Sarah. "Three Bodies: Problems for Video-conferencing." Phenomenology & Mind 20 (2021): 42. http://dx.doi.org/10.17454/pam-2004.

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2

Chung, Cathy, and Philip J. Morris. "Acoustic Scattering from Two- and Three-Dimensional Bodies." Journal of Computational Acoustics 06, no. 03 (1998): 357–75. http://dx.doi.org/10.1142/s0218396x98000247.

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In this paper we consider the scattering of sound by two- and three-dimensional bodies with arbitrary geometries. Particular emphasis is placed on the methodology for the implementation of solid wall boundary conditions for high-order, high-bandwidth numerical schemes. The Impedance Mismatch Method (IMM) is introduced to treat solid wall boundaries. In this method the solid wall is simulated using a wall region in which the characteristic impedance is set to a different value from that in the fluid region. This method has many advantages over traditional solid wall boundary treatments, including simplicity of coding, speed of computation and the ability to treat curved boundaries. This method has been used to solve a number of acoustic scattering problems to demonstrate its effectiveness. These problems include acoustic reflections from an infinite plate, acoustic scattering from a two-dimensional finite plate and a cylinder, and acoustic scattering by a sphere and a cylindrical shell.
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3

Chen, W. Q., Y. L. Ma, and H. J. Ding. "On three-dimensional elastic problems of one-dimensional hexagonal quasicrystal bodies." Mechanics Research Communications 31, no. 6 (2004): 633–41. http://dx.doi.org/10.1016/j.mechrescom.2004.03.007.

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4

Nemish, Yu N. "Three-dimensional problems of mechanics of deformable bodies of noncanonical shape." International Applied Mechanics 35, no. 10 (1999): 973–88. http://dx.doi.org/10.1007/bf02682308.

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5

Bassanini, P., and A. R. Elcrat. "Separated flow past three-dimensional bodies as a singular perturbation problems." Journal of Engineering Mathematics 23, no. 2 (1989): 187–202. http://dx.doi.org/10.1007/bf00128867.

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6

Arguchintseva, M. A., and N. N. Pilyugin. "Extremal problems of heat transfer to three-dimensional bodies at hypersonic speeds." Journal of Applied Mathematics and Mechanics 56, no. 4 (1992): 545–58. http://dx.doi.org/10.1016/0021-8928(92)90010-6.

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7

SANO, Yuji. "A Finite Element Method for Contact Problems between Three-Dimensional Curved Bodies." Journal of Nuclear Science and Technology 33, no. 2 (1996): 119–27. http://dx.doi.org/10.1080/18811248.1996.9731873.

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8

Pavlychko, V. M. "Numerical solution of three-dimensional thermoplasticity problems for bodies of complex shape." Soviet Applied Mechanics 24, no. 8 (1988): 748–53. http://dx.doi.org/10.1007/bf00896383.

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9

Grigorenko, A. Ya, and I. I. Dyyak. "Solution of three-dimensional problems on the free vibration of axisymmetric bodies." International Applied Mechanics 30, no. 5 (1994): 344–47. http://dx.doi.org/10.1007/bf00847267.

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10

Nikabadze, Mikhail U., Armine R. Ulukhanyan, Tamar Moseshvili, Ketevan Tskhakaia, Nodar Mardaleishvili, and Zurab Arkania. "On the Modeling of Five-Layer Thin Prismatic Bodies." Mathematical and Computational Applications 24, no. 3 (2019): 69. http://dx.doi.org/10.3390/mca24030069.

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Proceeding from three-dimensional formulations of initial boundary value problems of the three-dimensional linear micropolar theory of thermoelasticity, similar formulations of initial boundary value problems for the theory of multilayer thermoelastic thin bodies are obtained. The initial boundary value problems for thin bodies are also obtained in the moments with respect to systems of orthogonal polynomials. We consider some particular cases of formulations of initial boundary value problems. In particular, the statements of the initial-boundary value problems of the micropolar theory of K-layer thin prismatic bodies are considered. From here, we can easily get the statements of the initial-boundary value problems for the five-layer thin prismatic bodies.
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