A Note on the Transient Solution of Stokes' Second Problem with Arbitrary Initial Phase

Liu, C.-M.; Liu, I.-C.

doi:10.1017/s1727719100001003

Cited by 28 publications

(12 citation statements)

References 4 publications

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“…The solutions of these problems in one-dimensional case and for unbounded domains are well established in literature, in particular for heat diffusion problems (see, for example, Watson [9], Batchelor [1], Erdogan [10], and Liu and Liu [11]). The strategy for the solution, as in the present paper, is to consider the Laplace transformation in time; however, the inverse transformation is not simple to achieve (see, for example, Devakar and Iyengar [12] where the inverse transform is obtained through a numerical procedure); therefore a clear and a more general strategy, which would allow the achievement of the analytical solution for different boundary conditions, has to be found.…”

Section: Mathematical Problems In Engineeringmentioning

confidence: 99%

A Residual Theorem Approach Applied to Stokes’ Problems with Generally Periodic Boundary Conditions including a Pressure Gradient Term

Durante

Broglia

2018

Mathematical Problems in Engineering

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The differential problem given by a parabolic equation describing the purely viscous flow generated by a constant or an oscillating motion of a boundary is the well-known Stokes’ problem. The one-dimensional equation is generally solved for unbounded or bounded domains; for the latter, either free slip (i.e., zero normal gradient) or no-slip (i.e., zero velocity) conditions are enforced on one boundary. Generally, the analytical strategy to solve these problems is based on finding the solutions of the Laplace-transformed (in time) equation and on inverting these solutions. In the present paper this problem is solved by making use of the residuals theorem; as it will be shown, this strategy allows achieving the solutions of First and Second Stokes’ problems in both infinite and finite depth. The extension to generally periodic boundaries with the presence of a periodic pressure gradient is also presented. This approach allows getting closed form solutions in the time domain in a rather fast and simple way. An ad hoc numerical algorithm, based on a finite difference approximation of the differential equation, has been developed to check the correctness of the analytical solutions.

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Section: Mathematical Problems In Engineeringmentioning

confidence: 99%

A Residual Theorem Approach Applied to Stokes’ Problems with Generally Periodic Boundary Conditions including a Pressure Gradient Term

Durante

Broglia

2018

Mathematical Problems in Engineering

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“…1-a their definitions (8) evaluated in t = 0. The functions H ± 2 (9) with H ± 2 (y, 0) ≡ 0 are then inserted into the formula (8) and the nondimensional quantities T = ωt and Y = y(ω/ν) 1/2 are used, according to [4]. In this way, the solution:…”

Section: Second Stokes Problemmentioning

confidence: 99%

“…Solutions of the second problem in an infinite-depth flow have been discussed in [2], [3], [4] and in many other papers. They are usually written in terms of error functions of complex arguments, because in the corresponding real forms integrands containing oscillatory functions appear, the numerical integration of which can lead to severe errors [5].…”

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confidence: 99%

Remarks on the solution of extended Stokes' problems

Riccardi

2011

International Journal of Non-Linear Mechanics

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The analytical solutions of first and second Stokes' problems are discussed, for infinite and finite-depth flows of a Newtonian fluid in planar geometries. Problems arising from the motion of the wall as a whole (one-dimensional flows) as well as of only one half of the wall (two-dimensional) are solved and the wall stresses are evaluated.The solutions are written in real form. In many cases, they improve the ones in Literature, leading to simpler mathematical forms of velocities and stresses. The numerical computation of the solutions is performed by using recurrence relations and elementary integrals, in order to avoid the evaluation of integrals of rapidly oscillating functions.The main physical features of the solutions are also discussed. In particular, the steady-state solutions of the second Stokes' problems are analyzed by separating their "in phase" and "in quadrature" components, with respect to the wall motion. By using this approach, stagnation points have been found in infinite-depth flows.

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“…There are two kinds of Stokes' problems [1] describing the flows induced by an impulsively moving plate and the oscillating plate, respectively. The complete and steady-state solutions have been provided in many literatures (for details, see [3], [4] and [5]). For geophysicists interested in the flow induced by earthquakes, fracture of ice sheets and other boundary motions, the extension of the classical Stokes' problems is required to calculate practical geophysical flows.…”

Section: Introductionmentioning

confidence: 99%

“…Since (1) and (2) (4) 978-1-4244-2126-8/08/$25.00 ©2008 IEEE Accordingly, the total solution u can be determined by superpositioning the solutions of (3) and (4). As the former case stands for the classical Stokes' first problem, the exact solution to (3) is shown as (for details, see [4]) ul uo erfcj===j (5) As for the solution to (4), owing to the fluid motions for z > 0 and z < 0 being in the opposite direction, an additional condition of u2 has to be considered u2(y,z > O,t)= -u2(y,z < 0,t) I (6) which further leads to the following condition u2(y,z = O,t)= 0. (7) Based on the conditions shown in (6) Applying the inverse Fourier sine transform and inverse Laplace transform to (12), u2 can be obtained after some algebra.…”

Section: Introductionmentioning

confidence: 99%

Solution to the Stokes' First Problem for the Earthquake-Induced Flow

Liu

2008

OCEANS 2008 - MTS/IEEE Kobe Techno-Ocean

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The classical Stokes' problems are of great importance in many theoretical studies and practical applications.There are two kinds of Stokes' problems [1] referred to the flow induced by a moving plate with constant speed and the oscillating plate, respectively. For geophysicists interested in the flow induced by earthquakes, fracture of ice sheets and other related problems, the extension of the classical Stokes' problems is required to calculate practical geophysical flows. Hence, in present study, the Stokes' first problem is modified to calculate the flow driven by a moving half-infinite plate (see Fig.1). The significant application of present study is to simulate the fluid motion motivated by the earthquake. Different from the existing results given by Zeng and Weinbaum [2], by using some mathematical techniques and integral transforms associated with the concept of symmetrical space, the velocity profile is obtained in a much easier way. At both far ends, present solution is reduced to that of the classical Stokes' first problem which implies the effect of discontinuity at z=O does not affect the farfield flow. In conclusion, present study provides a basis for predicting the flow while the earthquake occurs..

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A Note on the Transient Solution of Stokes' Second Problem with Arbitrary Initial Phase

Cited by 28 publications

References 4 publications

A Residual Theorem Approach Applied to Stokes’ Problems with Generally Periodic Boundary Conditions including a Pressure Gradient Term

A Residual Theorem Approach Applied to Stokes’ Problems with Generally Periodic Boundary Conditions including a Pressure Gradient Term

Remarks on the solution of extended Stokes' problems

Solution to the Stokes' First Problem for the Earthquake-Induced Flow

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