171 research outputs found

    Mario Manno, Metafisica e educazione

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    Decerf Paul. Mario Manno, Metafisica e educazione. In: Revue Philosophique de Louvain. Quatrième série, tome 70, n°7, 1972. p. 500

    Mario Manno, Il conoscere e la filosofia, 1957

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    Toulemont René. Mario Manno, Il conoscere e la filosofia, 1957. In: Revue des Sciences Religieuses, tome 35, fascicule 1, 1961. p. 96

    Mario Manno, Il conoscere e la filosofia, 1957

    No full text
    Toulemont René. Mario Manno, Il conoscere e la filosofia, 1957. In: Revue des Sciences Religieuses, tome 35, fascicule 1, 1961. p. 96

    Revalorización energética de residuos orgánicos para la producción de biocombustibles y fertilizantes

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    Fil: Manno, Roberto Horacio. Universidad Nacional de Villa María; Argentina.Fil: Galván, María José, . Universidad Nacional de Villa María; Argentina.Fil: Juan, Ricardo Daniel. Universidad Nacional de Villa María; Argentina.Fil: Dantur, Mario A., . Universidad Nacional de Villa María; Argentina.Fil: Vargas Soria, José Miguel. Universidad Nacional de Villa María; Argentina.Fil: Barufaldi, Gastón. Universidad Nacional de Villa María; Argentina.Fil: Molina, Matías. Universidad Nacional de Villa María; Argentina.Fil: Coniglio, María Sonia. Universidad Nacional de Villa María; Argentina

    Meta-symplectic geometry of 3rd order Monge-Ampère equations and their characteristics

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    This paper is a natural companion of [Alekseevsky D.V., Alonso Blanco R., Manno G., Pugliese F., Ann. Inst. Fourier (Grenoble) 62 (2012), 497-524, arXiv:1003.5177], generalising its perspectives and results to the context of third-order (2D) Monge-Ampère equations, by using the so-called ''meta-symplectic structure'' associated with the 8D prolongation M⁽¹⁾ of a 5D contact manifold M. We write down a geometric definition of a third-order Monge-Ampère equation in terms of a (class of) differential two-form on M⁽¹⁾. In particular, the equations corresponding to decomposable forms admit a simple description in terms of certain three-dimensional distributions, which are made from the characteristics of the original equations. We conclude the paper with a study of the intermediate integrals of these special Monge-Ampère equations, herewith called of Goursat type.This paper is a contribution to the Special Issue on Analytical Mechanics and Dif ferential Geometry in honour of Sergio Benenti. The full collection is available at http://www.emis.de/journals/SIGMA/Benenti.html. The authors wish to express their gratitude towards the anonymous referees whose comments contributed to shape the paper into its final form. The authors thank C. Ciliberto, E. Ferapontov and F. Russo for stimulating discussions. The research of the first author has been partially supported by the project “Finanziamento giovani studiosi – Metriche proiettivamente equivalenti, equazioni di Monge–Amp`ere e sistemi integrabili”, University of Padova 2013–2015, by the project “FIR (Futuro in Ricerca) 2013 – Geometria delle equazioni dif ferenziali”. The research of the second author has been partially supported by the Marie Sk lodowska–Curie Action No 654721 “GEOGRAL”, by the University of Salerno, and by the project P201/12/G028 of the Czech Republic Grant Agency (GA CR). Both the authors are members of G.N.S.A.G.A. ˇ of I.N.d.A.M

    Particolarismo identitario vs. Deterritorializzazione. In ricordo di Mario Manno

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    Prima di lasciarci, Manno stava lavorando sull’oscuro rapporto tra Heidegger e gli ebrei e, lungo questa strada, non solo era impegnato nella rilettura del filosofo di Meßkirch, ma stava rinnovando i suoi studi sulla cultura ebraica. Con l’energia di chi è nel pieno delle forze, s’era gettato in un’impresa tanto stimolante quanto densa di risvolti inquietanti
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