Fonction de Wannier (French Wikipedia)

Analysis of information sources in references of the Wikipedia article "Fonction de Wannier" in French language version.

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2books.google.com

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aps.org

prb.aps.org

(en) M.P. Geller and W. Kohn, « Theory of generalized Wannier functions for nearly periodic potentials », Phys. Rev. B, vol. 48,‎ 1993, p. 14085 (DOI 10.1103/PhysRevB.48.14085, lire en ligne) [1]
(en) G. Berghold, C. J. Mundy, A. H. Romero, J. Hutter, and M. Parrinello, « General and efficient algorithms for obtaining maximally localized Wannier functions », Phys. Rev. B, vol. 61,‎ 2000, p. 10040 (DOI 10.1103/PhysRevB.61.10040, lire en ligne)

prola.aps.org

(en) G.H. Wannier, « The structure of electronic excitation levels in insulating crystals », Phys. Rev., vol. 52,‎ 1937, p. 191 (DOI 10.1103/PhysRev.52.191, lire en ligne)

prl.aps.org

(en) C. Brouder, G. Panati, M. Calandra, C. Mourougane, and N. Marzari, « Exponential Localization of Wannier Functions in Insulators », Phys. Rev. Lett., vol. 98,‎ 2007, p. 046402 (DOI 10.1103/PhysRevLett.98.046402, lire en ligne)

arxiv.org

SM Nakhmanson et al. Spontaneous polarization and piezoelectricity in boron nitride nanotubes, 2008

books.google.com

(en) A Bohm, A Mostafazadeh, H Koizumi, Q Niu and J Zqanziger, The Geometric Phase in Quantum Systems : foundations, mathematical concepts, and applications in molecular and condensed matter physics, Berlin/New York, Springer, 2003, §12.5, p. 292 ff (ISBN 3-540-00031-3, lire en ligne)
(en) C. Pisani, Quantum-mechanical Ab-initio Calculation of the Properties of Crystalline Materials, Springer, coll. « Proceedings of the IV School of Computational Chemistry of the Italian Chemical Society », 1994 (ISBN 3-540-61645-4, lire en ligne), p. 282

doi.org

dx.doi.org

(en) G.H. Wannier, « The structure of electronic excitation levels in insulating crystals », Phys. Rev., vol. 52,‎ 1937, p. 191 (DOI 10.1103/PhysRev.52.191, lire en ligne)
(en) C. Brouder, G. Panati, M. Calandra, C. Mourougane, and N. Marzari, « Exponential Localization of Wannier Functions in Insulators », Phys. Rev. Lett., vol. 98,‎ 2007, p. 046402 (DOI 10.1103/PhysRevLett.98.046402, lire en ligne)
(en) M.P. Geller and W. Kohn, « Theory of generalized Wannier functions for nearly periodic potentials », Phys. Rev. B, vol. 48,‎ 1993, p. 14085 (DOI 10.1103/PhysRevB.48.14085, lire en ligne) [1]
(en) G. Berghold, C. J. Mundy, A. H. Romero, J. Hutter, and M. Parrinello, « General and efficient algorithms for obtaining maximally localized Wannier functions », Phys. Rev. B, vol. 61,‎ 2000, p. 10040 (DOI 10.1103/PhysRevB.61.10040, lire en ligne)

psi-k.org

(en) (en) N. Marzari and D. Vanderbilt, « An Introduction to Maximally-Localized Wannier Functions » (consulté le 17 février 2010)

rutgers.edu

physics.rutgers.edu

D Vanderbilt Berry phases and Curvatures in Electronic Structure Theory.

uga.edu

physast.uga.edu

(en) M.P. Geller and W. Kohn, « Theory of generalized Wannier functions for nearly periodic potentials », Phys. Rev. B, vol. 48,‎ 1993, p. 14085 (DOI 10.1103/PhysRevB.48.14085, lire en ligne) [1]