Chemistry Reference
In-Depth Information
5. D. Bitko, T. F. Rosenbaum, and G. Aeppli,
Phys. Rev. Lett.
,
77
, 940 (1996). QuantumCritical
Behavior for a Model Magnet.
6. S. L. Sondhi, S. M. Girvin, J. P. Carini, and D. Shahar,
Rev. Mod. Phys.
,
69
, 315 (1997).
Continuous Quantum Phase Transitions.
7. T. Vojta,
Ann. Phys. (Leipzig)
,
9
, 403 (2000). Quantum Phase Transitions in Electronic
Systems.
8. M. Vojta,
Rep. Prog. Phys.
,
66
, 2069 (2003). Quantum Phase Transitions.
9. D. Belitz, T. R. Kirkpatrick, and T. Vojta,
Rev. Mod. Phys.
,
77
, 579 (2005). How Generic
Scale Invariance Influences Classical and Quantum Phase Transitions.
10. S. Sachdev,
Quantum Phase Transitions
, Cambridge University Press, Cambridge, UK, 2000.
11. N. Goldenfeld,
Lectures on Phase Transitions and the Renormalization Group
, Westview
Press, Boulder, CO, 1992.
12. D. Ter Haar, Ed.,
Collected Papers of L. D. Landau
, Pergamon, Oxford, 1965.
13. P. Weiss,
J. Phys. (Paris)
,
6
, 661 (1907). L'Hypoth`se du Champ Mol´culaire et la Propri´ t´
Ferromagn´ tique.
14. B. Widom,
J. Chem. Phys.
,
43
, 3892 (1965). Surface Tension andMolecular Correlations near
the Critical Point.
15. M. E. Fisher and M. N. Barber,
Phys. Rev. Lett.
,
28
, 1516 (1972). Scaling Theory for Finite-
Size Effects in the Critical Region.
16. M. N. Barber, in
Phase Transitions and Critical Phenomena
, Vol. 8, C. Domb and J. L.
Lebowitz, Eds., Academic, New York, 1983, pp. 145-266. Finite-Size Scaling.
17. J. Cardy, Ed.,
Finite-Size Scaling
, North Holland, Amsterdam, 1988.
18. A. B. Harris,
J. Phys. C
,
7
, 1671 (1974). Effect of RandomDefects on the Critical Behaviour of
Ising Models.
19. O. Motrunich, S. C. Mau, D. A. Huse, and D. S. Fisher,
Phys. Rev. B
,
61
, 1160 (2000).
Infinite-Randomness Quantum Ising Critical Fixed Points.
20. A. Aharony and A. B. Harris,
Phys. Rev. Lett.
,
77
, 3700 (1996). Absence of Self-Averaging and
Universal Fluctuations in Random Systems near Critical Points.
21. S. Wiseman and E. Domany,
Phys. Rev. Lett.
,
81
, 22 (1998). Finite-Size Scaling and Lack of
Self-Averaging in Critical Disordered Systems.
22. D. S. Fisher,
Phys. Rev. Lett.
,
69
, 534 (1992). Random Transverse-Field Ising Spin Chains.
23. D. S. Fisher,
Phys. Rev. B
,
51
, 6411 (1995). Critical Behavior of Random Transverse-Field
Ising Spin Chains.
24. S. K. Ma, C. Dasgupta, and C. K. Hu,
Phys. Rev. Lett.
,
43
, 1434 (1979). Random
Antiferromagnetic Chain.
25. R. B. Griffiths,
Phys. Rev. Lett.
,
23
, 17 (1969). Nonanalytic Behavior above the Critical Point
in a Random Ising Ferromagnet.
26. M. Randeria, J. Sethna, and R. G. Palmer,
Phys. Rev. Lett.
,
54
, 1321 (1985). Low-Frequency
Relaxation in Ising Spin-Glasses.
27. A. J. Bray and D. Huifang,
Phys. Rev. B
,
40
, 6980 (1989). Griffiths Singularities in Random
Magnets: Results for a Soluble Model.
28. M. Thill and D. Huse,
Physica A
,
214
, 321 (1995). Equilibrium Behaviour of Quantum Ising
Spin Glass.
29. H. Rieger and A. P. Young,
Phys. Rev.
,
B 54
, 3328 (1996). Griffiths Singularities in the
Disordered Phase of a Quantum Ising Spin Glass.
30. T. Vojta,
Phys. Rev. Lett.
,
90
, 107202 (2003). Disorder Induced Rounding of Certain
Quantum Phase Transitions.
31. T. Vojta,
J. Phys. A
,
39
, R143 (2006). Rare Region Effects at Classical, Quantum and
Nonequilibrium Phase Transitions.