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Bibliografías temáticas / Non-linear geometry / Libros

Libros sobre el tema "Non-linear geometry"

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Autor: Grafiati

Publicado: 8 de junio de 2024

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1

Teunissen, P. J. G. The geometry of geodetic inverse linear mapping and non-linear adjustment. Delft, The Netherlands: Rijkscommissie voor geodesie, 1985.

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2

1942-, Corneil D. G. y Mathon R. A, eds. Geometry and combinatorics: Selected works of J.J. Seidel. Boston: Academic Press, 1991.

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3

Artin, Emil. Algèbre géométrique. Paris: Editions Jacques Gabay, 1996.

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4

The role of nonassociative algebra in projective geometry. Providence, Rhode Island: American Mathematical Society, 2014.

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5

1962-, Sturmfels Bernd, ed. Introduction to tropical geometry. Providence, Rhode Island: American Mathematical Society, 2015.

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6

Gaven, Martin, ed. Geometric function theory and non-linear analysis. Oxford: Clarendon, 2001.

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7

1944-, Morozov Albert D., ed. Invariant sets for Windows. Singapore: World Scientific, 1999.

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8

Workshop, in Astronomy and Astrophysics of Chamonix (3rd 1993 Chamonix France). An introduction to methods of complex analysis and geometry for classical mechanics and non-linear waves: Proceedings of the third Workshop in Astronomy and Astrophysics of Chamonix (France), 1st-06 February 1993. Gif-sur-Yvette, France: Editions Frontières, 1994.

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9

Ivanova, Jordanka y Franco Pastrone. Geometric Method for Stability of Non-Linear Elastic Thin Shells. Boston, MA: Springer US, 2002. http://dx.doi.org/10.1007/978-1-4615-1511-1.

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10

Ivanova, Jordanka. Geometric method for stability of non-linear elastic thin shells. Boston: Kluwer Academic Publishers, 2002.

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11

Franco, Pastrone, ed. Geometric method for stability of non-linear elastic thin shells. Boston: Kluwer Academic Publishers, 2002.

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12

Holden, Helge. Soliton Equations and Their Algebro-Geometric Solutions: Volume I: (1+1)-Dimensional Continuous Models. Cambridge: Cambridge University Press, 2003.

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13

Liana, Lupșa, ed. Non-connected convexities and applications. Dordrecht: Kluwer Academic Publishers, 2002.

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14

Górski, Jarosław. Non-linear models of structures with random geometric and material imperfactions [sic] simulation-based approach. Gdańsk: Wydawn. Politechniki Gdańskiej, 2006.

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15

Ninul, Anatolij Sergeevič. Tenzornaja trigonometrija: Teorija i prilozenija / Theory and Applications /. Moscow, Russia: Mir Publisher, 2004.

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16

Ninul, Anatolij Sergeevič. Tensor Trigonometry. Moscow, Russia: Fizmatlit Publisher, 2021.

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17

Pomeau, Yves y Basile Audoly. Elasticity and Geometry: From Hair Curls to the Non-Linear Response of Shells. Oxford University Press, 2018.

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18

Elasticity and Geometry: From Hair Curls to the Non-Linear Response of Shells. Oxford University Press, Incorporated, 2010.

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19

Elasticity anf geometry: From hair curls to the non-linear response of shells. Oxford University Press, 2010.

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20

Non-Linear Elliptic Equations in Conformal Geometry (Zurich Lectures in Advanced Mathematics). European Mathematical Society, 2004.

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21

Artin, Emil. Geometric Algebra. Wiley-Interscience, 1988.

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22

Chowdhury, Sujaul, Ponkog Kumar Das y Syed Badiuzzaman Faruque. Numerical Solutions of Boundary Value Problems of Non-Linear Differential Equations. Taylor & Francis Group, 2021.

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23

Thomas, Sabu y Deepalekshmi Ponnamma. Non-Linear Viscoelasticity of Rubber Composites and Nanocomposites: Influence of Filler Geometry and Size in Different Length Scales. Springer, 2014.

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24

Thomas, Sabu, Deepalekshmi Ponnamma y P. Deepalekshmi. Non-Linear Viscoelasticity of Rubber Composites and Nanocomposites: Influence of Filler Geometry and Size in Different Length Scales. Springer, 2014.

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25

Thomas, Sabu y Deepalekshmi Ponnamma. Non-Linear Viscoelasticity of Rubber Composites and Nanocomposites: Influence of Filler Geometry and Size in Different Length Scales. Springer, 2016.

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26

Noncommutative Geometry and Cayley-smooth Orders (Pure and Applied Mathematics). Chapman & Hall/CRC, 2007.

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27

Doebner, H. D. y T. D. Palev. Twistor Geometry and Non-Linear Systems: Review Lectures Given at the 4th Bulgarian Summer School on Mathematical Problems of Quantum Field Theory, Held at Primorsko, Bulgaria, September 1980. Springer London, Limited, 2006.

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28

Iwaniec, Tadeusz y Gaven Martin. Geometric Function Theory and Non-linear Analysis. Oxford University Press, USA, 2002.

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29

Dragunov, Timothy N., Svetlana A. Boykova y Olga V. Malysheva. Invariant Sets for Windows: Resonance Structures, Attractors, Fractals, and Patterns (World Scientific Series on Nonlinear Science. Series a, Monographs and Treatises, V. 37.). World Scientific Publishing Company, 1999.

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30

Ivanova, Jordanka y Franco Pastrone. Geometric Method for Stability of Non-Linear Elastic Thin Shells. Springer London, Limited, 2013.

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31

Ivanova, Jordanka y Franco Pastrone. Geometric Method for Stability of Non-Linear Elastic Thin Shells. Springer, 2014.

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32

Holden, Helge y Fritz Gesztesy. Soliton Equations and their Algebro-Geometric Solutions (Cambridge Studies in Advanced Mathematics). Cambridge University Press, 2003.

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33

Cristescu, G. y L. Lupsa. Non-Connected Convexities and Applications. Springer, 2014.

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34

Cristescu, G. y L. Lupsa. Non-Connected Convexities and Applications. Springer, 2014.

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35

Cristescu, G. y L. Lupsa. Non-Connected Convexities and Applications. Springer London, Limited, 2013.

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36

Invariant geometric structures: A non-linear extension of the Borel density theorem. 1989.

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37

Cristescu, G. y L. Lupsa. Non-Connected Convexities and Applications (Applied Optimization). Springer, 2002.

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38

Edmunds, D. E. y W. D. Evans. Entropy Numbers, s-Numbers, and Eigenvalues. Oxford University Press, 2018. http://dx.doi.org/10.1093/oso/9780198812050.003.0002.

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Resumen

The geometric quantities entropy numbers, approximation numbers and n-widths are defined for compact linear maps, and connections with the analytic entities eigenvalues and essential spectra discussed. The celebrated inequality of Weyl between the approximation numbers and eigenvalues is established in the general context of Lorentz sequence spaces. Also included are an axiomatic approach to s-numbers, a discussion of non-compact maps, and the Schmidt decomposition theory for compact linear operators in Hilbert spaces.

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