Travelling waves of the diffusive Nicholson’s blowflies equation with strong generic delay kernel and non-local effect

The non-local dispersion of longitudinal ultrasonic waves is shown to appear in the heterogeneous solids due to continuous spatial distributions of their density and/or elasticity (gradient solids). This dispersion gives rise to the diversity of ultrasonic transmittance spectra, including the broadband total reflectance plateau, total transmission and tunneling spectral ranges. The ultrasonic wave fields in gradient solids, formed by interference of forward and backward travelling waves as well as by evanescent and antievanescent modes are examined in the framework of exactly solvable models of media with continuously distributed density and elasticity. Examples of transmittance spectra for both metal and semiconductor gradient structures are presented, and the generality of concept of artificial non-local dispersion for gradient composite materials is considered. It should also be noted that the wave equation for acoustic waves in gradient media with a constant elasticity modulus and a certain predetermined density distribution reduces to an equation describing the electromagnetic wave propagation in transparent dielectric media. This formal similarity shows that the concept of nonlocal dispersion is common for both optical and acoustic phenomena, which opens the way to the direct use of physical concepts and exact mathematical solutions, developed for gradient optics, to solve the corresponding acoustic problems.

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A non-local formulation of rotational water waves

Journal of Fluid Mechanics ◽

10.1017/jfm.2011.404 ◽

2011 ◽

Vol 689 ◽

pp. 129-148 ◽

Cited By ~ 26

Author(s):

A. C. L. Ashton ◽

A. S. Fokas

Keyword(s):

Free Surface ◽

Water Waves ◽

Velocity Potential ◽

Vries Equation ◽

Travelling Waves ◽

Explicit Dependence ◽

Local Equation ◽

Constant Vorticity ◽

Small Parameters ◽

Non Local

AbstractThe classical equations of irrotational water waves have recently been reformulated as a system of two equations, one of which is an explicit non-local equation for the wave height and for the velocity potential evaluated on the free surface. Here, in the two-dimensional case: (a) we generalize the relevant formulation to the case of constant vorticity, as well as to the case where the free surface is described by a multivalued function; (b) in the case of travelling waves we derive an upper bound for the free surface; (c) in the case of constant vorticity we construct a sequence of nearly Hamiltonian systems which provide an approximation in the asymptotic limit of certain physical small parameters. In particular, the explicit dependence of the vorticity on the coefficients of the Korteweg–de Vries equation is clarified.

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Wave propagation in a non-local piezoelectric phononic crystal Timoshenko nanobeam

Modern Physics Letters B ◽

10.1142/s0217984921500640 ◽

2020 ◽

pp. 2150064

Author(s):

Feiyang He ◽

Denghui Qian ◽

Musai Zhai

Keyword(s):

Wave Propagation ◽

Phononic Crystal ◽

Local Effect ◽

Geometric Parameters ◽

Width Ratio ◽

Plane Wave Expansion ◽

Mechanical Coupling ◽

Non Local ◽

Influencing Parameters ◽

Scale Coefficient

By applying non-local elasticity theory and plane wave expansion (PWE) method to Timoshenko beam, the calculation method of band structure of a non-local piezoelectric phononic crystal (PC) Timoshenko nanobeam is proposed and formulized. In order to investigate the properties of wave propagating in the nanobeam in detail, bandgaps of first four orders are picked, and the corresponding influence rules of thermo-electro-mechanical coupling fields, non-local effect and geometric parameters on bandgaps are studied. During the research works, temperature variation, external electrical voltage and axial force are chosen as the influencing parameters related to the thermo-electro-mechanical coupling fields. Scale coefficient is chosen as the influencing parameter corresponding to non-local effect. Length ratio between materials PZT-4 and epoxy and height-width ratio are chosen as the influencing parameters of geometric parameters. Moreover, all the band structures and influence rules of Timoshenko nanobeam are compared to those of Euler nanobeam. The results are expected to be of help for the design of micro and nanodevices based on piezoelectric periodic nanobeams.

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Static and Dynamic Solutions of Functionally Graded Micro/Nanobeams under External Loads Using Non-Local Theory

Vibration ◽

10.3390/vibration3020006 ◽

2020 ◽

Vol 3 (2) ◽

pp. 51-69

Author(s):

Reza Moheimani ◽

Hamid Dalir

Keyword(s):

Power Index ◽

Linear Equations ◽

Local Effect ◽

Functionally Graded ◽

Local Theory ◽

Classical Elasticity ◽

Graded Materials ◽

Nano Scale ◽

Non Local ◽

External Loads

Functionally graded materials (FGMs) have wide applications in different branches of engineering such as aerospace, mechanics, and biomechanics. Investigation of the mechanical behaviors of structures made of these materials has been performed widely using classical elasticity theories in micro/nano scale. In this research, static, dynamic and vibrational behaviors of functional micro and nanobeams were investigated using non-local theory. Governing linear equations of the problem were driven using non-local theory and solved using an analytical method for different boundary conditions. Effects of the axial load, the non-local parameter and the power index on the natural frequency of different boundary condition are assessed. Then, the obtained results were compared with those obtained from classical theory. These results showed that a non-local effect could greatly affect the behaviors of these beams, especially at nano scale.

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Travelling waves in the Nicholson’s blowflies equation with spatio-temporal delay

Applied Mathematics and Computation ◽

10.1016/j.amc.2008.12.055 ◽

2009 ◽

Vol 209 (2) ◽

pp. 314-326 ◽

Cited By ~ 2

Author(s):

Guojian Lin

Keyword(s):

Travelling Waves ◽

Temporal Delay ◽

Nicholson’S Blowflies Equation ◽

Spatio Temporal

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Travelling waves for delayed reaction–diffusion equations with global response

Proceedings of The Royal Society A Mathematical Physical and Engineering Sciences ◽

10.1098/rspa.2005.1554 ◽

2005 ◽

Vol 462 (2065) ◽

pp. 229-261 ◽

Cited By ~ 111

Author(s):

Teresa Faria ◽

Wenzhang Huang ◽

Jianhong Wu

Keyword(s):

Travelling Waves ◽

Reaction Diffusion ◽

Travelling Wave ◽

Reaction Diffusion Equations ◽

Diffusion Equations ◽

Index Formula ◽

Delayed Response ◽

Travelling Wave Solutions ◽

Wave Solutions ◽

Non Local

We develop a new approach to obtain the existence of travelling wave solutions for reaction–diffusion equations with delayed non-local response. The approach is based on an abstract formulation of the wave profile as a solution of an operational equation in a certain Banach space, coupled with an index formula of the associated Fredholm operator and some careful estimation of the nonlinear perturbation. The general result relates the existence of travelling wave solutions to the existence of heteroclinic connecting orbits of a corresponding functional differential equation, and this result is illustrated by an application to a model describing the population growth when the species has two age classes and the diffusion of the individual during the maturation process leads to an interesting non-local and delayed response for the matured population.

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Stability and Hopf bifurcation analysis for Nicholson's blowflies equation with non-local delay

European Journal of Applied Mathematics ◽

10.1017/s0956792512000265 ◽

2012 ◽

Vol 23 (6) ◽

pp. 777-796 ◽

Cited By ~ 11

Author(s):

RUI HU ◽

YUAN YUAN

Keyword(s):

Hopf Bifurcation ◽

Upper And Lower Solutions ◽

Laboratory Data ◽

Steady State Solution ◽

Steady States ◽

Nicholson’S Blowflies Equation ◽

Non Local ◽

The Stability ◽

Manifold Theory ◽

Theoretical Results

We consider a diffusive Nicholson's blowflies equation with non-local delay and study the stability of the uniform steady states and the possible Hopf bifurcation. By using the upper- and lower solutions method, the global stability of constant steady states is obtained. We also discuss the local stability via analysis of the characteristic equation. Moreover, for a special kernel, the occurrence of Hopf bifurcation near the steady state solution and the stability of bifurcated periodic solutions are given via the centre manifold theory. Based on laboratory data and our theoretical results, we address the influence of various types of vaccinations in controlling the outbreak of blowflies.

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First-principles calculations for vacancy formation energies in Cu and Al; non-local effect beyond the LSDA and lattice distortion

Computational Materials Science ◽

10.1016/s0927-0256(98)00072-x ◽

1999 ◽

Vol 14 (1-4) ◽

pp. 56-61 ◽

Cited By ~ 46

Author(s):

T. Hoshino ◽

N. Papanikolaou ◽

R. Zeller ◽

P.H. Dederichs ◽

M. Asato ◽

...

Keyword(s):

First Principles ◽

Lattice Distortion ◽

Local Effect ◽

Vacancy Formation ◽

First Principles Calculations ◽

Non Local ◽

Formation Energies

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ANALYTIC CONTINUATION OF OPERATORS APPLICATIONS: FROM NUMBER THEORY AND GROUP THEORY TO QUANTUM FIELD AND STRING THEORIES

Reviews in Mathematical Physics ◽

10.1142/s0129055x99000179 ◽

1999 ◽

Vol 11 (04) ◽

pp. 463-501 ◽

Cited By ~ 4

Author(s):

S. C. WOON

Keyword(s):

Number Theory ◽

Analytic Continuation ◽

Particle Physics ◽

Fractional Derivatives ◽

Bernoulli Polynomials ◽

Local Effect ◽

Quantum Field ◽

Matrix Representations ◽

Complex Power ◽

Non Local

We are used to thinking of an operator acting once, twice, and so on. However, an operator can be analytically continued to the operator raised to a complex power. Applications include (s,r) diagrams and an extension of Fractional Calculus where commutativity of fractional derivatives is preserved, generating integrals and non-standard derivations of theorems in Number Theory, non-integer power series and breaking of Leibniz and Chain rules, pseudo-groups and symmetry deforming models in particle physics and cosmology, non-local effect in analytically continued matrix representations and its connection with noncommutative geometry, particle-physics-like scatterings of zeros of analytically continued Bernoulli polynomials, and analytic continuation of operators in QM, QFT and Strings.

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