Livros sobre o tema "Ising mode"

Chakrabarti, B. K. Quantum ising phases and transitions in transverse ising models. New York: Springer, 1996.

Liebmann, R. Statistical mechanics of periodic frustrated Ising systems. Berlin: Springer-Verlag, 1986.

Kremer, Sebastian. Oberflächendynamik im Q2R-Ising-Modell. Aachen: Verlag Shaker, 1992.

MacFarland, T. Parallel simulation of the Ising model. Ithaca, N.Y: Cornell Theory Center, Cornell University, 1994.

Baxter, Rodney J. Exactly solved models in statistical mechanics. London: Academic, 1989.

Rychkov, Slava. Lectures on the Random Field Ising Model. Cham: Springer Nature Switzerland, 2023. http://dx.doi.org/10.1007/978-3-031-42000-9.

Handrick, Klaus. Modelle zur Beschreibung magnetischer Wechselwirkungen zwischen paramagnetischen Zentren in niedrigdimensionalen Systemen. Aachen [Germany]: Shaker, 1992.

Cerf, Raphaël. The Wulff crystal in Ising and percolation models: Ecole d'Ete de Probabilites de Saint-Flour XXXIV, 2004. Editado por Picard Jean. Berlin: Springer, 2006.

Jerrum, Mark. Polynomial-time approximation algorithms for the Ising model. Edinburgh: University of Edinburgh Department of Computer Science, 1990.

A, Jackson Kenneth. Monte Carlo simulation of the rapid crystallization of bismuth-doped silicon. [Washington, D.C: National Aeronautics and Space Administration, 1997.

Newman, M. E. J. Monte Carlo study of the random-field Ising model. Ithaca, N.Y: Cornell Theory Center, Cornell University, 1995.

1930-, Lebowitz Joel Louis, ed. Simple models of equilibrium and nonequilibrium phenomena. Amsterdam: North-Holland, 1987.

A, Jackson K., e United States. National Aeronautics and Space Administration., eds. Orientation and velocity dependence of the nonequilibrium partition coefficient. [Washington, DC: National Aeronautics and Space Administration, 1995.

Prum, Bernard. Stochastic processes on a lattice and Gibbs measures. Dordrecht: Kluwer Academic Publishers, 1991.

Barkema, G. T. Transient and asymptotic domain growth in the 3D Ising model with conserved spin. Ithaca, N.Y: Cornell Theory Center, Cornell University, 1994.

Luijten, Erik. Interaction range, universality and the upper critical dimension. Delft, Netherlands: Delft University Press, 1997.

W, Lovesey S., Rutherford Appleton Laboratory e Council For The Central Laboratory of The Research Councils., eds. A theory of spin correlations and neutron scattering from paramagnetic materials based on the Ising-Heisenberg model in one, two and three space dimensions. Chilton: Rutherford Appleton Laboratory, 1996.

Ecole d'été de probabilités de Saint-Flour (27th 1997). Lectures on probability theory and statistics: Ecole d'été de probabilités de Saint-Flour XXVII, 1997. Editado por Bertoin Jean, Martinelli F, Peres Y, Bernard P. 1944-, Bertoin Jean, Martinelli F e Peres Y. Berlin: Springer, 2000.

Ecole d'été de probabilités de Saint-Flour (27th 1997). Lectures on probability theory and statistics: Ecole d'eté de probabilités de Saint-Flour XXVII, 1997. Editado por Bertoin Jean, Martinelli F, Peres Y e Bernard P. 1944-. Berlin: Springer, 1999.

McCoy, Barry M., e Tai Tsun Wu. Two-Dimensional Ising Model. Dover Publications, Incorporated, 2014.

McKenzie, Donna G. Magnetic ordering in thin Ising bilayer systems. 1989.

McCoy, Barry M., e Tai Tsun Wu. Two-Dimensional Ising Model: Second Edition. Dover Publications, Incorporated, 2014.

Quantum Ising Phases and Transitions in Transverse Ising Models Lecture Notes in Physics. Springer, 2012.

McCoy, Barry M. The two-dimensional Ising model. 2014.

Shehadeh, Hayel. Monte Carlo studies of phase diagram and phase transitions of random, binary, SC, 3-D Ising model in magnetic field. 1989.

Wu, Tai Tsun, e Barry McCoy. Two-Dimensional Ising Model. Harvard University Press, 2013.

Wu, Wenhao. From classical to quantum glass. 1993.

Luoma, Samuli. Introduction to the Ising Model. Nova Science Publishers, Incorporated, 2020.

Cobbina, Francis. Monte Carlo study of a 3-D random binary magnetic Ising system possessing nearest- and next-nearest-neighbor interactions with no external field. 1989.

Sikakana, Ike Qhubekani. Monte Carlo studies of a two-dimensional, binary, magnetic ising model with nearest-neighbor interactions. 1988.

Cobbina, Francis. Monte Carlo study of a 3-D random binary magnetic Ising system possessing nearest- and next-nearest-neighbor interactions with no external field. 1989.

Binek, Christian. Ising-Type Antiferromagnets: Model Systems in Statistical Physics and in the Magnetism of Exchange Bias. Springer Berlin / Heidelberg, 2010.

Binek, Christian. Ising-type Antiferromagnets: Model Systems in Statistical Physics and in the Magnetism of Exchange Bias (Springer Tracts in Modern Physics). Springer, 2003.

Palmer, John. Planar Ising Correlations (Progress in Mathematical Physics). Birkhäuser Boston, 2007.

Baxter, Rodney J. Exactly Solved Models in Statistical Mechanics. Dover Publications, Incorporated, 2013.

Baxter, Rodney J. Exactly Solved Models in Statistical Mechanics. Dover Publications, 2007.

Baxter, Rodney J. Exactly Solved Models in Statistical Mechanics. Dover Publications, Incorporated, 2013.

Baxter, Rodney J. Exactly Solved Models in Statistical Mechanics. Elsevier Science & Technology Books, 2016.

King, David R. Monte Carlo study of the phase transitions for the 3-dimensional 4- and 6-state chiral clock models. 1993.

Boudreau, Joseph F., e Eric S. Swanson. Classical spin systems. Oxford University Press, 2018. http://dx.doi.org/10.1093/oso/9780198708636.003.0020.

Chekhov, Leonid. Two-dimensional quantum gravity. Editado por Gernot Akemann, Jinho Baik e Philippe Di Francesco. Oxford University Press, 2018. http://dx.doi.org/10.1093/oxfordhb/9780198744191.013.30.

Bertoin, J., F. Martinelli e Y. Peres. Lectures on Probability Theory and Statistics: Ecole d'Ete de Probabilites de Saint-Flour XXVII - 1997 (Lecture Notes in Mathematics). Springer, 2000.

Rau, Jochen. Phase Transitions. Oxford University Press, 2017. http://dx.doi.org/10.1093/oso/9780199595068.003.0008.

Rajeev, S. G. Fluid Mechanics. Oxford University Press, 2018. http://dx.doi.org/10.1093/oso/9780198805021.001.0001.