1,364,308 research outputs found

    P. Aubry (illustrateur 18..-19..) : signature “P. Aubry” [1896]

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    P. Aubry (illustrateur 18..-19..) : signature “P. Aubry” [1896

    P. Aubry (illustrateur 18..-19..) : signature “Aubry” [1901]

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    P. Aubry (illustrateur 18..-19..) : signature “Aubry” [1901

    Feuille de correspondance du libraire. Année 1792. A Paris, au Cabinet bibliographique, rue de la Monnoie, n° 5, près celle de Béthisi.

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    [Catalogue de libraire. Paris. Aubry, Charles-Louis. 1792][Prospectus. Livres. Paris. Aubry, Charles-Louis. 1792]Avec mode text

    Gregorius de Arimino In primû sententiarû nuperrime impressus / et ... sue integritati restitutus per ... Petrum Garamanta...

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    Fecha probable de imp.Port. con orla tip. arquitectónica a dos tintas con la marca de Chevallon en el centroLas iniciales de Bernard Aubry aparecen en la parte inferior de la orla de port.Claude Chevallon ejerció entre los años 1506-1537 y Bernard Aubry entre 1517-1530Texto a dos col.Apostillas marginalesLetra góticaInic. grab.Anotaciones ms. en el textoEnc. Perg.Sign.: a-z8, [et]6, [cum]

    Letter from Pierre Aubry to Michel-Dmitri Calvocoressi, July 1910

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    A letter, dated July 1910., from French music scholar Pierre Aubry to music critic and musicologist Michel-Dmitri Calvocoressi

    Multivariate Polarimetric Bistatic Clutter Statistical Analysis

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    This paper deals with the analysis of simultaneously collected co- and cross-polarized bistatic sea-clutter returns with special emphasis on their representation as a Spherically Invari-ant Random Process (SIRP). The study is conducted by using appropriate testing procedures involving the complex envelope of the measured data that provide both first- and higher-order compatibility conditions. The results highlight that the SIRP model is a good candidate for the representation of bistatic coherent clutter, and usually the coherence time of the SIRP texture is longer than that in the monostatic case.Green Open Access added to TU Delft Institutional Repository 'You share, we take care!' - Taverne project https://www.openaccess.nl/en/you-share-we-take-care Otherwise as indicated in the copyright section: the publisher is the copyright holder of this work and the author uses the Dutch legislation to make this work public.Microwave Sensing, Signals & System

    In Franckfurt, Bey Abrahm Aubry. Zu fienden.

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    A mellkép Elias Wideman 1651-es metszetének (vö. OSzK App. H. 848) ellentétes beállítású változata.Hatsoros vers lentCímfelirat lentA megjelenés ideje annak alapján, hogy a felirat említi az Érsekújvári vár feladását, ami 1663-ban történt

    Aubry–Mather Measures in the Nonconvex Setting

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    The adjoint method, introduced in [L. C. Evans, Arch. Ration. Mech. Anal., 197 (2010), pp. 1053–1088] and [H. V. Tran, Calc. Var. Partial Differential Equations, 41 (2011), pp. 301–319], is used to construct analogues to the Aubry–Mather measures for nonconvex Hamiltonians. More precisely, a general construction of probability measures, which in the convex setting agree with Mather measures, is provided. These measures may fail to be invariant under the Hamiltonian flow and a dissipation arises, which is described by a positive semidefinite matrix of Borel measures. However, in the case of uniformly quasiconvex Hamiltonians the dissipation vanishes, and as a consequence the invariance is guaranteed. Copyright © 2011 Society for Industrial and Applied Mathematic

    Aubry-Mather theory for conformally symplectic systems

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    In this article we develop an analogue of Aubry-Mather theory for a class of dissipative systems, namely conformally symplectic systems, and prove the existence of interesting invariant sets, which, in analogy to the conservative case, will be called the Aubry and the Mather sets. Besides describ- ing their structure and their dynamical significance, we shall analyze their attracting/repelling properties, as well as their noteworthy role in driving the asymptotic dynamics of the system
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