CYLINDRICAL LONG WAVE INTO A CYLINDRICAL SHELF

Based on the linear non-dispersive theory, the reflection of a Converging Cylindrical long wave, of wave length L, onto a Cylindrical shelf, of radius r = a and positive or negative height A h relative to an otherwise flat bottom, is study analitically. It is found that these linear approximation agrees well with the existing non-linear numerical solution when the ratio a/L is large enough. It is also found that these two-dimensional reflection process is the contrary of the corresponding one-dimensional case, since the solution of these problem gives a negative reflected wave for a positive step and a positive reflected wave for a negative step.

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The formation of gas hydrates under shock wave impact on the bubble media (two-dimensional case)

Proceedings of the Mavlyutov Institute of Mechanics ◽

10.21662/uim2010.1.007 ◽

2010 ◽

Vol 7 ◽

pp. 90-97

Author(s):

M.N. Galimzianov ◽

I.A. Chiglintsev ◽

U.O. Agisheva ◽

V.A. Buzina

Keyword(s):

Shock Wave ◽

Gas Hydrates ◽

Hydrate Formation ◽

Dimensional Case ◽

Two Dimensional ◽

Wave Impact ◽

Bubble Liquid ◽

One Dimensional ◽

Bubble Media ◽

Main Factors

Formation of gas hydrates under shock wave impact on bubble media (two-dimensional case) The dynamics of plane one-dimensional shock waves applied to the available experimental data for the water–freon media is studied on the base of the theoretical model of the bubble liquid improved with taking into account possible hydrate formation. The scheme of accounting of the bubble crushing in a shock wave that is one of the main factors in the hydrate formation intensification with increasing shock wave amplitude is proposed.

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Regions-based Two-dimensional Continua: The Euclidean Case

10.1093/oso/9780198712749.003.0005 ◽

2018 ◽

Author(s):

Geoffrey Hellman ◽

Stewart Shapiro

Keyword(s):

Mathematical Induction ◽

Dimensional Case ◽

Two Dimensional ◽

Entire Space ◽

Euclidean Case ◽

Free Basis ◽

One Dimensional ◽

Archimedean Property ◽

The One

This chapter develops a Euclidean, two-dimensional, regions-based theory. As with the semi-Aristotelian account in Chapter 2, the goal here is to recover the now orthodox Dedekind–Cantor continuum on a point-free basis. The chapter derives the Archimedean property for a class of readily postulated orientations of certain special regions, what are called “generalized quadrilaterals” (intended as parallelograms), by which the entire space is covered. Then the chapter generalizes this to arbitrary orientations, and then establishes an isomorphism between the space and the usual point-based one. As in the one-dimensional case, this is done on the basis of axioms which contain no explicit “extremal clause”, and we have no axiom of induction other than ordinary numerical (mathematical) induction.

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Numerical solution of two-dimensional first kind Fredholm integral equations by using linear Legendre wavelet

International Journal of Wavelets Multiresolution and Information Processing ◽

10.1142/s0219691316500041 ◽

2016 ◽

Vol 14 (01) ◽

pp. 1650004 ◽

Cited By ~ 3

Author(s):

M. Tahami ◽

A. Askari Hemmat ◽

S. A. Yousefi

Keyword(s):

Integral Equation ◽

Tensor Product ◽

Numerical Solution ◽

Fredholm Integral Equation ◽

Fredholm Integral Equations ◽

Wavelet Basis ◽

Two Dimensional ◽

Legendre Wavelets ◽

Numerical Examples ◽

One Dimensional

In one-dimensional problems, the Legendre wavelets are good candidates for approximation. In this paper, we present a numerical method for solving two-dimensional first kind Fredholm integral equation. The method is based upon two-dimensional linear Legendre wavelet basis approximation. By applying tensor product of one-dimensional linear Legendre wavelet we construct a two-dimensional wavelet. Finally, we give some numerical examples.

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A Graphical Exposition of the Ising Problem

Journal of the Australian Mathematical Society ◽

10.1017/s1446788700009836 ◽

1971 ◽

Vol 12 (3) ◽

pp. 365-377 ◽

Cited By ~ 5

Author(s):

Frank Harary

Keyword(s):

Dimensional Case ◽

Two Dimensional ◽

One Dimensional ◽

Higher Dimensional ◽

The One

Ising [1] proposed the problem which now bears his name and solved it for the one-dimensional case only, leaving the higher dimensional cases as unsolved problems. The first solution to the two dimensional Ising problem was obtained by Onsager [6]. Onsager's method was subsequently explained more clearly by Kaufman [3]. More recently, Kac and Ward [2] discovered a simpler procedure involving determinants which is not logically complete.

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Cluster Structure of Optimal Solutions in Bipartitioning of Small Worlds

Entropy ◽

10.3390/e22111319 ◽

2020 ◽

Vol 22 (11) ◽

pp. 1319

Author(s):

Adam Lipowski ◽

António L. Ferreira ◽

Dorota Lipowska

Keyword(s):

Cluster Structure ◽

Finite Size ◽

Lattice Models ◽

Square Lattice ◽

Dimensional Case ◽

Two Dimensional ◽

Small Worlds ◽

Replica Symmetry ◽

One Dimensional ◽

Optimal Partitions

Using simulated annealing, we examine a bipartitioning of small worlds obtained by adding a fraction of randomly chosen links to a one-dimensional chain or a square lattice. Models defined on small worlds typically exhibit a mean-field behavior, regardless of the underlying lattice. Our work demonstrates that the bipartitioning of small worlds does depend on the underlying lattice. Simulations show that for one-dimensional small worlds, optimal partitions are finite size clusters for any fraction of additional links. In the two-dimensional case, we observe two regimes: when the fraction of additional links is sufficiently small, the optimal partitions have a stripe-like shape, which is lost for a larger number of additional links as optimal partitions become disordered. Some arguments, which interpret additional links as thermal excitations and refer to the thermodynamics of Ising models, suggest a qualitative explanation of such a behavior. The histogram of overlaps suggests that a replica symmetry is broken in a one-dimensional small world. In the two-dimensional case, the replica symmetry seems to hold, but with some additional degeneracy of stripe-like partitions.

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Numerical Solution of the Fractional Schrödinger Equation via Diagonalization — A Plea for the Harmonic Oscillator Basis. Part I: The One Dimensional Case

Fractional Calculus ◽

10.1142/9789813274587_0027 ◽

2018 ◽

pp. 443-490

Keyword(s):

Harmonic Oscillator ◽

Numerical Solution ◽

Schrodinger Equation ◽

Dimensional Case ◽

Harmonic Oscillator Basis ◽

One Dimensional ◽

Oscillator Basis ◽

Basis Part ◽

The One ◽

Fractional Schrodinger Equation

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SOME PECULIAR PROPERTIES OF THE DARWIN’S LAGRANGIAN

International Journal of Modern Physics B ◽

10.1142/s0217979295001166 ◽

1995 ◽

Vol 09 (23) ◽

pp. 3069-3083 ◽

Cited By ~ 4

Author(s):

I.P. PAVLOTSKY ◽

M. STRIANESE

Keyword(s):

Phase Space ◽

Dimensional Case ◽

Minimal Distance ◽

Rectilinear Motion ◽

Two Dimensional ◽

Singular Surfaces ◽

One Dimensional ◽

Local Singularity ◽

Dynamical Properties

In the post-Galilean approximation the Lagrangians are singular on a submanifold of the phase space. It is a local singularity, which differs from the ones considered by Dirac. The dynamical properties are essentially peculiar on the studied singular surfaces. In the preceding publications,1,2,3 two models of singular relativistic Lagrangians and the rectilinear motion of two electrons, determined by Darwin’s Lagrangian, were examined. In the present paper we study the peculiar dynamical properties of the two-dimensional Darwin’s Lagrangian. In particular, it is shown that the minimal distance between two electrons (the so called “radius of electron”) appears in the two-dimensional motion as well as in one-dimensional case. Some new peculiar properties are discovered.

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Revisiting the 1D and 2D Laplace Transforms

10.20944/preprints202007.0266.v1 ◽

2020 ◽

Author(s):

Manuel Duarte Ortigueira ◽

José Tenreiro Machado

Keyword(s):

Transfer Function ◽

Laplace Transform ◽

Linear Systems ◽

Laplace Transforms ◽

Dimensional Case ◽

Initial Condition ◽

Two Dimensional ◽

One Dimensional ◽

The One

This paper reviews the unilateral and bilateral, one- and two-dimensional Laplace transforms. The unilateral and bilateral Laplace transforms are compared in the one-dimensional case, leading to the formulation of the initial-condition theorem. This problem is solved with all generality in the one- and two-dimensional cases with the bilateral Laplace transform. General two-dimensional linear systems are introduced and the corresponding transfer function defined.

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A Two-Dimensional Model of the Fluid Dynamics of an Air Reverser

Journal of Applied Mechanics ◽

10.1115/1.2789021 ◽

1998 ◽

Vol 65 (1) ◽

pp. 171-177 ◽

Cited By ~ 8

Author(s):

S. Mu¨ftu¨ ◽

T. S. Lewis ◽

K. A. Cole ◽

R. C. Benson

Keyword(s):

Design Guidelines ◽

Dimensional Case ◽

Two Dimensional ◽

Dimensional Model ◽

Web Handling ◽

One Dimensional ◽

Air Supply ◽

Two Dimensional Model ◽

The One ◽

The Web

A theoretical analysis of the fluid mechanics of the air cushion of the air reversers used in web-handling systems is presented. A two-dimensional model of the air flow is derived by averaging the equations of conservation of mass and momentum over the clearance between the web and the reverser. The resulting equations are Euler’s equations with nonlinear source terms representing the air supply holes in the surface of the reverser. The equations are solved analytically for the one-dimensional case and numerically for the two-dimensional case. Results are compared with an empirical formula and the one-dimensional airjet theory developed for hovercraft. Conditions that maximize the air pressure supporting the web are analyzed and design guidelines are deduced.

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Approximate methods of solving amplitude-phase problem for continuous signals

Izmeritel`naya Tekhnika ◽

10.32446/0368-1025it.2021-5-37-46 ◽

2021 ◽

pp. 37-46

Author(s):

Ilia V. Boikov ◽

Yana V. Zelina

Keyword(s):

Integral Equations ◽

Collocation Methods ◽

Dimensional Case ◽

Two Dimensional ◽

Algebraic Equations ◽

Phase Problem ◽

Spline Collocation ◽

Approximate Methods ◽

Nonlinear Operator Equations ◽

One Dimensional

Amplitude and phase problems in physical research are considered. The construction of methods and algorithms for solving phase and amplitude problems is analyzed without involving additional information about the signal and its spectrum. Mathematical models of the amplitude and phase problems in the case of one-dimensional and two-dimensional continuous signals are proposed and approximate methods for their solution are constructed. The models are based on the use of nonlinear singular and bisingular integral equations. The amplitude and phase problems are modeled by corresponding nonlinear singular and bisingular integral equations defined on the numerical axis (in the one-dimensional case) and on the plane (in the two-dimensional case). To solve the constructed nonlinear singular and bisingular integral equations, spline-collocation methods and the method of mechanical quadratures are used. Systems of nonlinear algebraic equations that arise during the application of these methods are solved by the continuous method of solving nonlinear operator equations. A model example shows the effectiveness of the proposed method for solving the phase problem in the two-dimensional case.

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