Your search keyword '"infinite boundary"' showing total 13 results

1. A neural computational method for solving renewal delay integro-differential equations constrained by the half-line

Author

Kürkçü, Ömür Kıvanç

Published

2024

2. 基于管土作用模型的极限滑坡位移预测.

Author

高建章, 方迎潮, 李开鸿, 蒋毅, 甄莹, 曹宇光, and 祖毅真

Abstract

As one of the typical geological hazard, landslide seriously threatens the safe operation of buried pipelines. If the limit landslide displacement that the pipeline can bear can be accurately predicted, the pipeline failure accident can be effectively predicted combined with advanced landslide monitoring technology. In view of this, firstly, a pipe-soil interaction model with nonlinear contact was established and verified. Then, the effects of model parameters and boundary conditions on simulation results were discussed. Finally, the prediction method of the limit landslide displacement for stress/ strain criterion is researched. The conclusions are as follows. The nonlinear contact pipe-soil interaction model with infinite boundaries on both sides is more suitable for the mechanical response analysis of pipeline under real landslide conditions. Using this model, the large deformation and separation of pipeline and soil can be effective simulated by that model, the limit landslide displacement based on stress and strain criteria can also be predicted. This paper provides an effective technical means for the safety design of pipelines in mountainous areas and the prevention and control of landslide accidents. [ABSTRACT FROM AUTHOR]

Published

2023

3. Modified BEM for scattering analysis by a flaw at interface in an anisotropic multi-layered plate.

Author

Yang, Chen, Wang, Bin, Qian, Zhenghua, and Hirose, Sohichi

Subjects

*BOUNDARY element methods, *SCATTERING (Physics), *ELASTIC plates & shells, *WAVEGUIDES, *BENCHMARK problems (Computer science)

Abstract

In this paper, a modified boundary element method (BEM) for time-harmonic scattering computation analysis in two-dimensional (2-D), homogeneous, anisotropic and linear elastic plates is proposed. The aim of modification is to correct the spurious scattering introduced by inevitable model truncation at far-field in the traditional BEM model. The far-field wave displacement fields beyond the truncation points of BEM model are assumed to be the superposition of orthogonal propagating guided wave patterns, and are finally incorporated into BEM equation systems as the modified items to account for the contribution of infinite boundaries traditionally omitted. This method is simple and elegant, which has advantages on dimension reduction and needs no absorption medium or perfectly matched layer to suppress the reflected waves compared to FEM. Also, we can obtain the reflection and transmission coefficients of each mode directly without post-processing. This modified BEM is implemented to solve wave scattering problems due to a cavity-type defect at the interface in an infinite anisotropic multi-layered plate. The formulation is finally validated for several benchmark problems. [ABSTRACT FROM AUTHOR]

Published

2023

4. Vibration Isolation Mechanism of Row Piles Under Single-Point Excitation

Author

Liu, Jing-lei, Zhang, Rui-heng, Zhao, Xiao-yu, Liu, Huan, di Prisco, Marco, Series Editor, Chen, Sheng-Hong, Series Editor, Vayas, Ioannis, Series Editor, Kumar Shukla, Sanjay, Series Editor, Sharma, Anuj, Series Editor, Kumar, Nagesh, Series Editor, Wang, Chien Ming, Series Editor, Tutumluer, Erol, editor, Chen, Xiaobin, editor, and Xiao, Yuanjie, editor

Published

2020

5. Optical radiation force and torque of light-sheets on a cylindrical particle near an infinite boundary.

Author

Zang, Yuchen

Subjects

*TORQUE, *RADIATION, *OPTICAL tweezers, *PLANE wavefronts

Abstract

• Optical radiation force and torque derived for a cylinder in bounded space. • Radiation force varies periodically as the cylinder moves along the beam axis. • Negative pulling force observed for the cylinder under selected conditions. • Cylinder can be rotated counterclockwise or clock wise by radiation torque. This work aims to extend the previous studies on the optical radiation force and torque for a cylindrical dielectric particle to the case near an infinite boundary. Without loss of generality, the two-dimensional cylindrical object is assumed to have an arbitrary shape and be immersed in any light-sheet beam of arbitrary wave front. The partial-wave series expansion method in cylindrical coordinates and the method of images are utilized to derive the exact expressions for the axial and transverse radiation force and torque functions, which are dependent on the beam shape coefficients of the incident light-sheet and the scattering coefficients characterized by the boundary conditions at the surface. Numerical computations are performed for a circular cylindrical particle illuminated by a two-dimensional plane wave and a two-dimensional Gauss beam, respectively, with particular emphases on the size parameter, the refractive index, the particle-boundary distance, the beam waist and the offset shifts. The radiation force will increase in magnitude and reverse its direction under selected conditions. When the absorptive cylindrical particle is shifted off-axially with respect to the beam axis, it will be rotated counterclockwise or clockwise by the radiation torque. The results obtained in this work have potential applications in non-contact particle manipulation and transportation using optical tweezers. [ABSTRACT FROM AUTHOR]

Published

2024

6. Two-Phase Nanofluid Thermal Analysis over a Stretching Infinite Solar Plate Using Keller Box Method (KBM)

Author

Sobhan Mosayebidorcheh, Mahshad Vatani, Mohammad Hatami, and Davood Domiri Ganji

Subjects

solar plate, nanofluid, nanoparticle concentration, infinite boundary, keller box method (kbm), Chemical engineering, TP155-156, Chemistry, QD1-999

Abstract

In the present study, two-phase nanofluid flow in a three-dimensional system is modeled over a stretching infinite solar plate and the heat transfer analysis is performed for this problem. The governing equations are presented based on previous studies and the suitable solution method is recommended due to infinite boundary condition in the problem. Keller Box Method (KBM) using the Maple 15.0 mathematical software is applied as the solution method for the governing equation of the problem. The effect of some parameters existed in the equations (Pr (Prandtl number), Sc (Schmidt number), Nb (Brownian motion parameter), Nt (Thermophoresis parameter), λ=b/a (ratio of the stretching rate along y to x directions) and n (power-law index)), are discussed on the velocities, temperature, and nanoparticles concentration functions. As an important outcome, increasing both n and λ parameters, makes a reduction in shear stress, while it increase the Nusselt number function of heat transfer.

Published

2018

7. Two-Dimensional Finite-Element Simulation of Periodic Barriers.

Author

Huang, Hsuan Wen, Wang, Jiaji, Zhao, Chunfeng, and Mo, Y. L.

Subjects

*BAND gaps, *THEORY of wave motion, *HARMONIC analysis (Mathematics), *METAMATERIALS

Abstract

A novel kind of seismic isolation technique called "Periodic Barriers," which combines trench-type wave barriers and metamaterial, is introduced in this research. Metamaterial possesses a unique frequency-selective property that enables the metamaterial to manipulate the wave propagation. By infilling the metamaterials in the trench-type wave barriers, the periodic barriers are expected to display advantages of both the wave barriers and the metamaterials. The two-dimensional (2D) finite-element (FE) simulation is conducted to study the performance of the barriers adapting the metamaterial. This FE model is validated with the experiment on the metamaterial-based foundation. The convergence test on mesh size with different element types are investigated, and the minimum mesh size and property element type are determined for simulating the behavior of metamaterial. To simulate the unbounded domain, the absorbing boundary is implemented to eliminate the reflection from the boundaries. The dynamic responses obtained from models with infinite element boundary and viscoelastic boundary are found to converge with the increasing model size. To boost the computing efficiency, two analysis methods (fix-frequency harmonic analysis, and the time-history analysis) are adopted and found to have a strong correlation with each other. Based on the proposed modeling techniques and the analysis methods, the simulation of the periodic barriers embedded in the soil is performed. With various loading distance and the number of periodic barriers, the performance of the periodic barriers is found to comply with its theoretical frequency band gaps. [ABSTRACT FROM AUTHOR]

Published

2021

8. THREE-DIMENSIONAL AND TWO-PHASE NANOFLUID FLOW AND HEAT TRANSFER ANALYSIS OVER A STRETCHING INFINITE SOLAR PLATE.

Author

Jiandong ZHOU, Dengwei JING, HATAMI, Mohammad, and KHAZAYINEJAD, Mehdi

Subjects

*SOLAR ponds, *NANOFLUIDS, *NANOPARTICLES, *COLLOCATION methods, *HEAT transfer

Abstract

In this work, 3-D and two-phase nanofluid flow and heat transfer is modeled over a stretching infinite solar plate. The governing equations are presented based on previous studies. The infinite boundary condition and shortcoming of traditional analytical collocation method have been overcome in our study by changing the problem into a finite boundary problem with a new analytical method called optimal collocation method. The accuracy of results is examined by fourth order Runge- Kutta numerical method. Effect of some parameters, Prandtl number, Schmidt number, Brownian motion parameter, thermophoresis parameter, λ=b/a (ratio of the stretching rate along y- to x-directions), and power-law index on the velocities, temperature, and nanoparticles concentration functions are discussed. As an important outcome of our 3-D model analysis, it is found that increase in thermophoretic forces can enhance the thickness of both thermal and nanoparticle volume fraction boundary-layers. [ABSTRACT FROM AUTHOR]

Published

2018

9. Two-Phase Nanofluid Thermal Analysis over a Stretching Infinite Solar Plate Using Keller Box Method (KBM)

Author

Mosayebidorcheh, S., Vatani, M., Mohammad Hatami, and Domiri Ganji, D.

Subjects

lcsh:Chemistry, keller box method (kbm), lcsh:QD1-999, infinite boundary, solar plate, lcsh:TP155-156, nanofluid, lcsh:Chemical engineering, nanoparticle concentration

Abstract

In the present study, two-phase nanofluid flow in a three-dimensional system is modeled over a stretching infinite solar plate and the heat transfer analysis is performed for this problem. The governing equations are presented based on previous studies and the suitable solution method is recommended due to infinite boundary condition in the problem. Keller Box Method (KBM) using the Maple 15.0 mathematical software is applied as the solution method for the governing equation of the problem. The effect of some parameters existed in the equations (Pr (Prandtl number), Sc (Schmidt number), Nb (Brownian motion parameter), Nt (Thermophoresis parameter), λ=b/a (ratio of the stretching rate along y to x directions) and n (power-law index)), are discussed on the velocities, temperature, and nanoparticles concentration functions. As an important outcome, increasing both n and λ parameters, makes a reduction in shear stress, while it increase the Nusselt number function of heat transfer.

Published

2018

10. Three-dimensional and two-phase nanofluid flow and heat transfer analysis over a stretching infinite solar plate

Author

Mohammad Hatami, Dengwei Jing, Jiandong Zhou, and Mehdi Khazayinejad

Subjects

Materials science, optimal collocation method, Renewable Energy, Sustainability and the Environment, infinite boundary, 020209 energy, lcsh:Mechanical engineering and machinery, Boundary problem, Schmidt number, Prandtl number, 02 engineering and technology, Mechanics, nanoparticle concentration, Thermophoresis, symbols.namesake, Nanofluid, Collocation method, Heat transfer, 0202 electrical engineering, electronic engineering, information engineering, symbols, solar plate, nanofluid, lcsh:TJ1-1570, Boundary value problem

Abstract

In this work, three-dimensional and two-phase nanofluid flow and heat transfer is modeled over a stretching infinite solar plate. The governing equations are presented based on previous studies. The infinite boundary condition and shortcoming of traditional analytical Collocation Method have been overcome in our study by changing the problem into a finite boundary problem with a new analytical method called Optimal Collocation Method (OCM). The accuracy of results is examined by fourth order Runge-kutta numerical method. Effect of some parameters, Pr (Prandtl number), Sc (Schmidt number), Nb (Brownian motion parameter), Nt (Thermophoresis parameter), λ=b/a (ratio of the stretching rate along y to x directions) and n (power-law index), on the velocities, temperature and nanoparticles concentration functions are discussed. As an important outcome of our 3D model analysis, it is found that increase in thermophoretic forces can enhance the thickness of both thermal and nanoparticle volume fraction boundary layers.

Published

2018

11. Indivisible homogeneous directed graphs and a game for vertex partitions

Author

El-Zahar, Mohamed and Sauer, N.W.

Subjects

*GRAPH theory, *DIRECTED graphs, *ALGEBRA, *COMBINATORICS

Abstract

Abstract: Let be a set of finite tournaments. We will give a necessary and sufficient condition for the -free homogeneous directed graph to be divisible; that is, that there is a partition of into two sets neither of which contains an isomorphic copy of . [Copyright &y& Elsevier]

Published

2005

12. A directly convergent numerical method based on orthoexponential polynomials for solving integro-differential-delay equations with variable coefficients and infinite boundary on half-line.

Author

Kürkçü, Ömür Kıvanç and Sezer, Mehmet

Subjects

*POLYNOMIALS, *TAYLOR'S series, *EQUATIONS, *COLLOCATION methods, *INTEGRO-differential equations, *REACTION-diffusion equations

Abstract

In this study, main concern is focused on numerically solving the integro-differential-delay equations with variable coefficients and infinite boundary on half-line, proposing a matrix-collocation method based on the orthoexponential polynomials. The method is equipped with the collocation points and the hybridized matrix relations between the orthoexponential and Taylor polynomials, which enable us to convert an integral form with infinite boundary into a mathematical formulation. The method also directly establishes the verification of the existence and uniqueness of this integral form through a convergent result. In order to observe the validity of the method versus its computation limit, an error bound analysis is performed by using the upper bound of the orthoexponential polynomials. A computer module containing main infrastructure of the method is specifically designed and run for providing highly precise results. Thus, the numerical and graphical implementations are completely monitored in table and figures, respectively. Based on the comparisons and findings, one can state that the method is remarkable, dependable, and accurate for approaching the aforementioned equations. [ABSTRACT FROM AUTHOR]

Published

2021

13. Indivisible homogeneous directed graphs and a game for vertex partitions

Author

Mohamed H. El-Zahar and Norbert Sauer

Subjects

Vertex (graph theory), Discrete mathematics, Homogeneous structures, Infinite boundary, 010102 general mathematics, 0102 computer and information sciences, Vertex partition, Directed graph, Vertex partitions, 01 natural sciences, Theoretical Computer Science, Combinatorics, Homogeneous directed graphs, 010201 computation theory & mathematics, Homogeneous, Discrete Mathematics and Combinatorics, Tournament, 0101 mathematics, Mathematics

Abstract

Let T be a set of finite tournaments. We will give a necessary and sufficient condition for the T-free homogeneous directed graph HT to be divisible; that is, that there is a partition of HT into two sets neither of which contains an isomorphic copy of HT.

Published

2005