280,701 research outputs found

    Absolutely Continuous Spectrum for Random Schroedinger Operators on the Bethe Strip

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    The Bethe Strip of width mm is the cartesian product \B\times\{1,...,m\}, where \B is the Bethe lattice (Cayley tree). We prove that Anderson models on the Bethe strip have "extended states" for small disorder. More precisely, we consider Anderson-like Hamiltonians \;H_\lambda=\frac12 \Delta \otimes 1 + 1 \otimes A + \lambda \Vv on a Bethe strip with connectivity K2K \geq 2, where AA is an m×mm\times m symmetric matrix, \Vv is a random matrix potential, and λ\lambda is the disorder parameter. Given any closed interval I(K+amax,K+amin)I\subset (-\sqrt{K}+a_{\mathrm{max}},\sqrt{K}+a_{\mathrm{min}}), where amina_{\mathrm{min}} and amaxa_{\mathrm{max}} are the smallest and largest eigenvalues of the matrix AA, we prove that for λ\lambda small the random Schr\"odinger operator   Hλ\;H_\lambda has purely absolutely continuous spectrum in II with probability one and its integrated density of states is continuously differentiable on the interval II

    Poincare submersions

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    We prove two kinds of fibering theorems for maps X --> P, where X and P are Poincare spaces. The special case of P = S^1 yields a Poincare duality analogue of the fibering theorem of Browder and Levine.Comment: Published by Algebraic and Geometric Topology at http://www.maths.warwick.ac.uk/agt/AGTVol5/agt-5-2.abs.html Version 5: Statement of Theorem B corrected, see footnote p2

    Agmon-type estimates for a class of jump processes

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    In the limit epsilon to 0 we analyze the generators H_epsilon of families of reversible jump processes in R^d associated with a class of symmetric non-local Dirichlet-forms and show exponential decay of the eigenfunctions. The exponential rate function is a Finsler distance, given as solution of a certain eikonal equation. Fine results are sensitive to the rate function being C^2 or just Lipschitz. Our estimates are analog to the semi-classical Agmon estimates for differential operators of second order. They generalize and strengthen previous results on the lattice epsilon Z^d. Although our final interest is in the (sub)stochastic jump process, technically this is a pure analysis paper, inspired by PDE techniques

    Solvable and/or integrable and/or linearizable N-body problems in ordinary (three-dimensional) space. I

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    Several N-body problems in ordinary (3-dimensional) space are introduced which are characterized by Newtonian equations of motion (``acceleration equal force;'' in most cases, the forces are velocity-dependent) and are amenable to exact treatment (``solvable'' and/or ``integrable'' and/or ``linearizable''). These equations of motion are always rotation-invariant, and sometimes translation-invariant as well. In many cases they are Hamiltonian, but the discussion of this aspect is postponed to a subsequent paper. We consider ``few-body problems'' (with, say, \textit{N}=1,2,3,4,6,8,12,16,...) as well as ``many-body problems'' (N an arbitrary positive integer). The main focus of this paper is on various techniques to uncover such N-body problems. We do not discuss the detailed behavior of the solutions of all these problems, but we do identify several models whose motions are completely periodic or multiply periodic, and we exhibit in rather explicit form the solutions in some cases

    The Dualizing Spectrum, II

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    To an inclusion topological groups H->G, we associate a naive G-spectrum. The special case when H=G gives the dualizing spectrum D_G introduced by the author in the first paper of this series. The main application will be to give a purely homotopy theoretic construction of Poincare embeddings in stable codimension.Comment: Fixed an array of typo

    A psychoanalytic concept illustrated: Will, must, may, can — revisiting the survival function of primitive omnipotence

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    The author explores the linear thread connecting the theory of Freud and Klein, in terms of the central significance of the duality of the life and death instinct and the capacity of the ego to tolerate contact with internal and external reality. Theoretical questions raised by later authors, informed by clinical work with children who have suffered deprivation and trauma in infancy, are then considered. Theoretical ideas are illustrated with reference to observational material of a little boy who suffered deprivation and trauma in infancy. He was first observed in the middle of his first year of life while he was living in foster care, and then later at the age of two years and three months, when he had been living with his adoptive parents for more than a year

    Muon Production in Relativistic Cosmic-Ray Interactions

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    Cosmic-rays with energies up to 3×10203\times10^{20} eV have been observed. The nuclear composition of these cosmic rays is unknown but if the incident nuclei are protons then the corresponding center of mass energy is snn=700\sqrt{s_{nn}} = 700 TeV. High energy muons can be used to probe the composition of these incident nuclei. The energy spectra of high-energy (>> 1 TeV) cosmic ray induced muons have been measured with deep underground or under-ice detectors. These muons come from pion and kaon decays and from charm production in the atmosphere. Terrestrial experiments are most sensitive to far-forward muons so the production rates are sensitive to high-xx partons in the incident nucleus and low-xx partons in the nitrogen/oxygen targets. Muon measurements can complement the central-particle data collected at colliders. This paper will review muon production data and discuss some non-perturbative (soft) models that have been used to interpret the data. I will show measurements of TeV muon transverse momentum (pTp_T) spectra in cosmic-ray air showers from MACRO, and describe how the IceCube neutrino observatory and the proposed Km3Net detector will extend these measurements to a higher pTp_T region where perturbative QCD should apply. With a 1 km2^2 surface area, the full IceCube detector should observe hundreds of muons/year with pTp_T in the pQCD regime.Comment: 4 pages, 2 figures - To appear in the conference proceedings for Quark Matter 2009, March 30 - April 4, Knoxville, Tennessee. Tweaked formatting at organizers reques

    Did children’s education matter? : family migration as a mechanism of human capital investment : evidence from nineteenth century Bohemia

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    This paper analyzes the rural-urban migration of families in the Bohemian region of Pilsen in 1900. Using a new 1300-family dataset from the 1900 population census I examine the role of children‘s education in rural-urban migration. I find that families migrated to the city such that the educational attainment of their children would be maximized and that there is a positive correlation between family migration and children being apprentices in urban areas. The results suggest that rural-urban migration was powered not only by the exploitation of rural-urban wage gaps but also by aspirations to engage in human capital investment

    Localization for quasiperiodic Schrodinger operators with multivariable Gevrey potential functions

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    We consider an integer lattice quasiperiodic Schrodinger operator. The underlying dynamics is either the skew-shift or the multi-frequency shift by a Diophantine frequency. We assume that the potential function belongs to a Gevrey class on the multi-dimensional torus. Moreover, we assume that the potential function satisfies a generic transversality condition, which we show to imply a Lojasiewicz type inequality for smooth functions of several variables. Under these assumptions and for large coupling constant, we prove that the associated Lyapunov exponent is positive for all energies, and continuous as a function of energy, with a certain modulus of continuity. Moreover, in the large coupling constant regime and for an asymptotically large frequency - phase set, we prove that the operator satisfies Anderson localization.Comment: 42 pages, 3 figure

    Filtered ends of infinite covers and groups

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    Let f:A-->B be a covering map. We say A has e filtered ends with respect to f (or B) if for some filtration {K_n} of B by compact subsets, A - f^{-1}(K_n) "eventually" has e components. The main theorem states that if Y is a (suitable) free H-space, if K < H has infinite index, and if Y has a positive finite number of filtered ends with respect to H\Y, then Y has one filtered end with respect to K\Y. This implies that if G is a finitely generated group and K < H < G are subgroups each having infinite index in the next, then 0 < {\tilde e}(G)(H) < \infty implies {\tilde e}(G)(K) = 1, where {\tilde e}(.)(.) is the number of filtered ends of a pair of groups in the sense of Kropholler and Roller.Comment: 6 pages, to appear in Journal of Pure and Applied Algebr
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