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25 results on '"Pelloni, Beatrice"'

1. Jumps and cusps: a new revival effect in local dispersive PDEs

Author

Boulton, Lyonell, Farmakis, George, Pelloni, Beatrice, and Smith, David A.

Subjects
Mathematics - Analysis of PDEs, 35P05
Abstract

We study the presence of a non-trivial revival effect in the solution of linear dispersive boundary value problems for two benchmark models which arise in applications: the Airy equation and the dislocated Laplacian Schr{\"o}dinger equation. In both cases, we consider boundary conditions of Dirichlet-type. We prove that, at suitable times, jump discontinuities in the initial profile are revived in the solution not only as jump discontinuities but also as logarithmic cusp singularities. We explicitly describe these singularities and show that their formation is due to interactions between the symmetries of the underlying spatial operators with the periodic Hilbert transform., Comment: 35 pages, 3 figures, 2 appendices

Published
2024

2. Revivals, or the Talbot effect, for the Airy equation

Author

Pelloni, Beatrice and Smith, David A.

Subjects
Mathematics - Analysis of PDEs, 35P05
Abstract

We study Dirichlet-type problems for the simplest third-order linear dispersive PDE, often referred to as the Airy equation. Such problems have not been extensively studied, perhaps due to the complexity of the spectral structure of the spatial operator. Our specific interest is to determine whether the peculiar phenomenon of revivals, also known as Talbot effect, is supported by these boundary conditions, which for third order problems are not reducible to periodic ones. We prove that this is the case only for a very special choice of the boundary conditions, for which a new type of weak cusp revival phenomenon has been recently discovered. We also give some new results on the functional class of the solution for other cases., Comment: 20 pages, 4 figures, 1 appendix

Published
2024

3. The phenomenon of revivals on complex potential Schr\'odinger's equation

Author

Boulton, Lyonell, Farmakis, George, and Pelloni, Beatrice

Subjects
Mathematics - Analysis of PDEs, Mathematical Physics, Mathematics - Spectral Theory
Abstract

The mysterious phenomena of revivals in linear dispersive periodic equations was discovered first experimentally in optics in the 19th century, then rediscovered several times by theoretical and experimental investigations. While the term has been used systematically and consistently by many authors, there is no consensus on a rigorous definition. In this paper, we describe revivals modulo a regularity condition in a large class of Schr\"odinger's equations with complex bounded potentials. As we show, at rational times the solution is given explicitly by finite linear combinations of translations and dilations of the initial datum, plus an additional continuous term., Comment: 17 pages, 2 figures. This paper is published in https://ems.press/journals/zaa/articles/14297854

Published
2023
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4. A new implementation of the geometric method for solving the Eady slice equations

Author

Egan, Charlie P., Bourne, David P., Cotter, Colin J., Cullen, Mike J. P., Pelloni, Beatrice, Roper, Steven M., and Wilkinson, Mark

Subjects
Mathematics - Numerical Analysis
Abstract

We present a new implementation of the geometric method of Cullen & Purser (1984) for solving the semi-geostrophic Eady slice equations which model large scale atmospheric flows and frontogenesis. The geometric method is a Lagrangian discretisation, where the PDE is approximated by a particle system. An important property of the discretisation is that it is energy conserving. We restate the geometric method in the language of semi-discrete optimal transport theory and exploit this to develop a fast implementation that combines the latest results from numerical optimal transport theory with a novel adaptive time-stepping scheme. Our results enable a controlled comparison between the Eady-Boussinesq vertical slice equations and their semi-geostrophic approximation. We provide further evidence that weak solutions of the Eady-Boussinesq vertical slice equations converge to weak solutions of the semi-geostrophic Eady slice equations as the Rossby number tends to zero., Comment: 43 pages, 9 figures

Published
2022
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5. Beyond periodic revivals for linear dispersive PDEs

Author

Boulton, Lyonell, Farmakis, George, and Pelloni, Beatrice

Subjects
Mathematics - Analysis of PDEs
Abstract

We study the phenomenon of revivals for the linear Schr\"odinger and Airy equations over a finite interval, by considering several types of non-periodic boundary conditions. In contrast with the case of the linear Schr\"odinger equation examined recently (which we develop further), we prove that, remarkably, the Airy equation does not generally exhibit revivals even for boundary conditions very close to periodic. We also describe a new, weaker form of revival phenomena, present in the case of certain Robin-type boundary conditions for the linear Schr\"odinger equation. In this weak revival, the dichotomy between the behaviour of the solution at rational and irrational times persists, but in contrast with the classical periodic case, the solution is not given by a finite superposition of copies of the initial condition., Comment: 26 pages, 8 figures, typos corrected, main results moved to the introduction, reduced size of the figures

Published
2021
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6. New Revival Phenomena for Linear Integro-Differential Equations

Author

Boulton, Lyonell, Olver, Peter J., Pelloni, Beatrice, and Smith, David A.

Subjects
Mathematics - Analysis of PDEs, Mathematical Physics, Primary: 35C05. Secondary: 35B65, 35R09
Abstract

We present and analyse a novel manifestation of the revival phenomenon for linear spatially periodic evolution equations, in the concrete case of three nonlocal equations that arise in water wave theory and are defined by convolution kernels. Revival in these cases is manifested in the form of dispersively quantised cusped solutions at rational times. We give an analytic description of this phenomenon, and present illustrative numerical simulations.

Published
2020

7. Semi-discrete optimal transport methods for the semi-geostrophic equations

Author

Bourne, David P., Egan, Charlie P., Pelloni, Beatrice, and Wilkinson, Mark

Subjects
Mathematics - Analysis of PDEs
Abstract

We give a new and constructive proof of the existence of global-in-time weak solutions of the 3-dimensional incompressible semi-geostrophic equations (SG) in geostrophic coordinates, for arbitrary initial measures with compact support. This new proof, based on semi-discrete optimal transport techniques, works by characterising discrete solutions of SG in geostrophic coordinates in terms of trajectories satisfying an ordinary differential equation. It is advantageous in its simplicity and its explicit relation to Eulerian coordinates through the use of Laguerre tessellations. Using our method, we obtain improved time-regularity for a large class of discrete initial measures, and we compute explicitly two discrete solutions. The method naturally gives rise to an efficient numerical method, which we illustrate by presenting simulations of a 2-dimensional semi-geostrophic flow in geostrophic coordinates generated using a numerical solver for the semi-discrete optimal transport problem coupled with an ordinary differential equation solver., Comment: 35 pages, 2 figures

Published
2020
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8. Evolution equations on time-dependent intervals

Author

Fokas, Athanasios S., Pelloni, Beatrice, and Xia, Baoqiang

Subjects
Mathematics - Analysis of PDEs, 35C99, 34K10
Abstract

We study initial boundary value problems for linear evolution partial differential equations (PDEs) posed on a time-dependent interval $l_1(t)

Published
2019

9. Cullen's Stability Principle and Weak Solutions of the Free-surface Semi-geostrophic Equations

Author

Cullen, Mike J. P., Kuna, Tobias, Pelloni, Beatrice, and Wilkinson, Mark

Subjects
Mathematics - Analysis of PDEs, Physics - Atmospheric and Oceanic Physics
Abstract

The semi-geostrophic equations are used widely in the modelling of large-scale atmospheric flows. In this note, we prove the global existence of weak solutions of the incompressible semi-geostrophic equations, in geostrophic coordinates, in a three-dimensional domain with a free upper boundary. The proof, based on an energy minimisation argument originally inspired by Cullen's Stability Principle, uses optimal transport results as well as the analysis of Hamiltonian ODEs in spaces of probability measures as studied by Ambrosio and Gangbo. We also give a general formulation of Cullen's Stability Principle in a rigorous mathematical framework.

Published
2018

10. A numerical implementation of the unified Fokas transform for evolution problems on a finite interval

Author

Kesici, Emine, Pelloni, Beatrice, Pryer, Tristan, and Smith, David

Subjects
Mathematics - Numerical Analysis, Mathematics - Analysis of PDEs
Abstract

We present the numerical solution of two-point boundary value problems for a third order linear PDE, representing a linear evolution in one space dimension. The difficulty of this problem is in the numerical imposition of the boundary conditions, and to our knowledge, no such computations exist. Instead of computing the evolution numerically, we evaluate the solution representation formula obtained by the unified transform of Fokas. This representation involves complex line integrals, but in order to evaluate these integrals numerically, it is necessary to deform the integration contours using appropriate deformation mappings. We formulate a strategy to implement effectively this deformation, which allows us to obtain accurate numerical results., Comment: 20 pages, 14 figures

Published
2016

11. Nonlocal and multipoint boundary value problems for linear evolution equations

Author

Pelloni, Beatrice and Smith, David A

Subjects
Mathematics - Analysis of PDEs, 35G16 (primary), 35C15, 34B10 (secondary)
Abstract

We derive the solution representation for a large class of nonlocal boundary value problems for linear evolution PDEs with constant coefficients in one space variable. The prototypical such PDE is the heat equation, for which problems of this form model physical phenomena in chemistry and for which we formulate and prove a full result. We also consider the third order case, which is much less studied and has been shown by the authors to have very different structural properties in general. The nonlocal conditions we consider can be reformulated as \emph{multipoint conditions}, and then an explicit representation for the solution of the problem is obtained by an application of the Fokas transform method. The analysis is carried out under the assumption that the problem being solved is well posed, i.e.\ that it admits a unique solution. For the second order case, we also give criteria that guarantee well-posedness., Comment: 28 pages, 4 figures

Published
2015

12. Innovative Science

Author

Braben, Donald W, Allen, John F, Amos, William, Ball, Richard, Bayley, Hagan, Birkhead, Tim, Cameron, Peter, Campbell, Eleanor, Cogdell, Richard, Colquhoun, David, Davies, Steve, Dowler, Rod, Edwards, Peter, Engle, Irene, Fernandez-Armesto, Felipe, Fitzgerald, Desmond, Frampton, Jon, Glover, Dame Anne, Hall, John, Heslop-Harrison, Pat, Herschbach, Dudley, Huang, Sui, Kimble, H Jeff, Kroto, Sir Harry, Ladyman, James, Lawrence, Peter, Leake, Mark, Leroi, Armand, Logan, David, MacIntyre, Angus, Marchesi, Julian, Mattick, John, McLeish, Colin McInnes. Tom, Medley, Graham, Miller, Thomas, Nesse, Randolph, Pollack, Gerald, Pelloni, Beatrice, Randall, Douglas, Ray, David, Roberts, Sir Richard J, Seddon, Ken, Self, Colin, Swinney, Harry, Troy, Chris Thomas. William, Tucker, Robin, Vita-Finzi, Claudio, and Wild, David

Subjects
Physics - Physics and Society
Abstract

Sir, We write as senior scientists about a problem vital to the scientific enterprise and prosperity. Nowadays, funding is a lengthy and complex business. First, universities themselves must approve all proposals for submission. Funding agencies then subject those that survive to peer review, a process by which a few researchers, usually acting anonymously, assess a proposal's chances that it will achieve its goals, is the best value for money, is relevant to a national priority and will impact on a socio-economic problem. Only 25% of proposals received by the funding agencies are funded. These protracted processes force researchers to exploit existing knowledge, severely discourage open-ended studies and are hugely time-consuming. They are also new: before 1970, few researchers wrote proposals. Now they are virtually mandatory.

Published
2015

13. Evolution PDEs and augmented eigenfunctions. Half-line

Author

Pelloni, Beatrice and Smith, David A.

Subjects
Mathematics - Analysis of PDEs, Mathematics - Spectral Theory, 35P10 (primary), 35C15, 35G16, 47A70 (secondary)
Abstract

The solution of an initial-boundary value problem for a linear evolution partial differential equation posed on the half-line can be represented in terms of an integral in the complex (spectral) plane. This representation is obtained by the {\em unified transform} introduced by Fokas in the 90's. On the other hand, it is known that many initial-boundary value problems can be solved via a classical transform pair, constructed via the spectral analysis of the associated spatial operator. For example, the Dirichlet problem for the heat equation can be solved by applying the Fourier sine transform pair. However, for many other initial-boundary value problems there is {\em no} suitable transform pair in the classical literature. Here we pose and answer two related questions: Given any well-posed initial-boundary value problem, does there exist a (non-classical) transform pair suitable for solving that problem? If so, can this transform pair be constructed via the spectral analysis of a differential operator? The answer to both of these questions is positive and given in terms of {\em augmented eigenfunctions}, a novel class of spectral functionals. These are eigenfunctions of a suitable differential operator in a certain generalised sense, they provide an effective spectral representation of the operator, and are associated with a transform pair suitable to solve the given initial-boundary value problem., Comment: 2 figures. arXiv admin note: text overlap with arXiv:1303.2205

Published
2014

14. Non-steady state heat conduction in composite walls

Author

Deconinck, Bernard, Pelloni, Beatrice, and Sheils, Natalie

Subjects
Mathematical Physics
Abstract

The problem of heat conduction in one-dimensional piecewise homogeneous composite materials is examined by providing an explicit solution of the one-dimensional heat equation in each domain. The location of the interfaces is known, but neither temperature nor heat flux are prescribed there. Instead, the physical assumptions of their continuity at the interfaces are the only conditions imposed. The problem of two semi-infinite domains and that of two finite-sized domains are examined in detail. We indicate also how to extend the solution method to the setting of one finite-sized domain surrounded on both sides by semi-infinite domains, and on that of three finite-sized domains., Comment: 25 pages + 7 page appendix (electronic supplementary material)

Published
2014
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15. Spectral theory of some non-selfadjoint linear differential operators

Author

Smith, David Andrew and Pelloni, Beatrice

Subjects
Mathematics - Spectral Theory, Mathematics - Analysis of PDEs, 35P10
Abstract

We give a characterisation of the spectral properties of linear differential operators with constant coefficients, acting on functions defined on a bounded interval, and determined by general linear boundary conditions. The boundary conditions may be such that the resulting operator is not selfadjoint. We associate the spectral properties of such an operator $S$ with the properties of the solution of a corresponding boundary value problem for the partial differential equation $\partial_t q \pm iSq=0$. Namely, we are able to establish an explicit correspondence between the properties of the family of eigenfunctions of the operator, and in particular whether this family is a basis, and the existence and properties of the unique solution of the associated boundary value problem. When such a unique solution exists, we consider its representation as a complex contour integral that is obtained using a transform method recently proposed by Fokas and one of the authors. The analyticity properties of the integrand in this representation are crucial for studying the spectral theory of the associated operator., Comment: 1 figure

Published
2012

21. Spectral theory of some non-selfadjoint linear differential operators

Author

Pelloni, Beatrice and Smith, D. A.

Abstract

We give a characterisation of the spectral properties of linear differential operators with constant coefficients, acting on functions defined on a bounded interval, and determined by general linear boundary conditions. The boundary conditions may be such that the resulting operator is not selfadjoint. \ud \ud We associate the spectral properties of such an operator $S$ with the properties of the solution of a corresponding boundary value problem for the partial differential equation $\partial_t q \pm iSq=0$. Namely, we are able to establish an explicit correspondence between the properties of the family of eigenfunctions of the operator, and in particular whether this family is a basis, and the existence and properties of the unique solution of the associated boundary value problem. When such a unique solution exists, we consider its representation as a complex contour integral that is obtained using a transform method recently proposed by Fokas and one of the authors. The analyticity properties of the integrand in this representation are crucial for studying the spectral theory of the associated operator.

Published
2013

22. Generalised Dirichelt-to-Neumann map in time dependent domains

Author

Pelloni, Beatrice and Fokas, A. S.

Abstract

We study the heat, linear Schrodinger and linear KdV equations in the domain l(t) < x < ∞, 0 < t < T, with prescribed initial and boundary conditions and with\ud l(t) a given differentiable function. For the first two equations, we show that the unknown Neumann or Dirichlet boundary value can be computed as the solution of a\ud linear Volterra integral equation with an explicit weakly singular kernel. This integral equation can be derived from the formal Fourier integral representation of the solution.\ud For the linear KdV equation we show that the two unknown boundary values can be computed as the solution of a system of linear Volterra integral equations with explicit\ud weakly singular kernels. The derivation in this case makes crucial use of analyticity and certain invariance properties in the complex spectral plane.\ud The above Volterra equations are shown to admit a unique solution.

Published
2012

23. The Dirichlet-to-Neumann map for the elliptic sine Gordon

Author

Fokas, A. S. and Pelloni, Beatrice

Abstract

We analyse the Dirichlet problem for the elliptic sine Gordon equation in the upper half plane. We express the solution $q(x,y)$ in terms of a Riemann-Hilbert problem whose jump matrix is uniquely defined by a certain function $b(\la)$, $\la\in\R$, explicitly expressed in terms of the given Dirichlet data $g_0(x)=q(x,0)$ and the unknown Neumann boundary value $g_1(x)=q_y(x,0)$, where $g_0(x)$ and $g_1(x)$ are related via the global relation $\{b(\la)=0$, $\la\geq 0\}$. Furthermore, we show that the latter relation can be used to characterise the Dirichlet to Neumann map, i.e. to express $g_1(x)$ in terms of $g_0(x)$. It appears that this provides the first case that such a map is explicitly characterised for a nonlinear integrable {\em elliptic} PDE, as opposed to an {\em evolution} PDE.

Published
2012

24. Mathematical analysis of partial differential equations in the semi-geostrophic theory

Author

Lisai, Stefania, Pelloni, Beatrice, Wilkinson, Mark, and Vanneste, Jacques

Abstract

The semi-geostrophic equations constitute a mathematical model used to study the evolution of rotation-dominated atmospheric and oceanic flows on large horizontal scales. Although it was introduced in the late 1950s, the system attracted the attention of the mathematical community only in the late 1990s, when its connection with optimal transport theory was discovered. In this thesis, we present an overview of the main formulations and the main results in the literature of the analysis of the semi-geostrophic equations. It follows an account of the author's contribution to this theory. Firstly, we discuss the analysis of the surface semi-geostrophic equations, which model a semi-geostrophic flow in regime of constant potential vorticity. The system consists of an active scalar equation, whose activity is determined by way of a Neumann-to-Dirichlet map associated to a fully nonlinear second-order Neumann boundary value problem on the infinite strip R 2 × (0, 1). We present the results on the local-in-time existence and uniqueness of classical solutions of this active scalar equation in Holder spaces. Secondly, we consider a class of steady solutions of the semi-geostrophic equations on the whole space and derive the linearised dynamics around such solutions. The linearised equation consists of a transport equation featuring a pseudo-differential operator of order 0. We study well-posedness of this equation in L 2 (R 3 , R 3 ) introducing a representation formula for the solutions, and extend the result to the space of tempered distributions on R 3 . We investigate stability of the steady solutions of the semi-geostrophic equations by looking at plane-wave solutions of the associ ated linearised problem, and discuss differences in the case of the quasi-geostrophic equations. We conclude with an overview of the main open questions that arise from the theory presented in this thesis.

Published
2021

25. Acoustic scattering : high frequency boundary\ud element methods and unified transform methods

Author

Chandler-Wilde, S.N., Langdon, S., Fokas, A.S., and Pelloni, Beatrice

Abstract

We describe some recent advances in the numerical solution of acoustic scattering problems. A major focus of the paper is the efficient solution of high frequency scattering problems via hybrid numerical-asymptotic boundary element methods. We also make connections to the unified transform method due to A. S. Fokas and co-authors, analysing particular instances of this method, proposed by J. A. De-Santo and co-authors, for problems of acoustic scattering by diffraction\ud gratings.

Published
2015

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