Published Papers
Nicoletta Cancrini
(click here to see a list of preprints available on line)


  1. N. Cancrini, S. Caprara, C. Castellani, C. Di Castro, M. Grilli, R. Raimondi: Phase Separation and Superconductivity in the Kondo-like spin-hole coupled model , Europhys. Lett. 14, 597 (1991) .
  2. L. Bertini, N. Cancrini and G. Jona-Lasinio: The Stochastic Burgers Equation, Commun. Math. Phys. 165, 211-232 (1994).
  3. L. Bertini, N. Cancrini and G. Jona-Lasinio: Stochastically Forced Burgers Equation, On Three Levels. Micro-, Meso-, and Macro Approaches in Physics, M. Fannes,\par C. Maes, A. Verbeure eds NATO ASI Series Vol. B 324 pp. 265-269. \par New York : Plenum Press 1994.
  4. L. Bertini, N. Cancrini and G. Jona-Lasinio: Burgers equation forced by conservative or nonconservative noise, Stochastic Analysis and Applications in Physics, A.I. Cardoso et. al., eds. NATO ASI Series Vol. C 449, pp. 35--44. Dordrecht: Kluwer Academic Publishers 1994.
  5. L. Bertini and N. Cancrini: The stochastic heat equation: Feynman-Kac formula and intermittence, J. Stat. Phys. 78, 1377-1401 (1995).
  6. N. Cancrini and A. Galves: Approach to equilibrium in the symmetric simple exclusion process, Markov Proc. Relat. Fields 1, 175-174 (1995).
  7. L. Bertini and N. Cancrini: Reduction Formula for Moments of Stochastic Integrals, J. Math. Phys. 38, 4763-4770 (1997).
  8. L. Bertini and N. Cancrini: The two--dimensional stochastic heat equation: renormalizing a multiplicative noise, J. Phys. A: Math. Gen. 31, 615-622 (1998).
  9. N. Cancrini, F. Cesi and F. Martinelli: The spectral gap for the Kawasaki dynamics at low temperature, J. Stat. Phys. 95, Nos 1/2, 219-175 (1999).
  10. N. Cancrini and F. Martinelli: Comparison of finite volume canonical and grand canonical Gibbs measures under a mixing condition, Markov Proc. Rel. Fields 6, 1-49 (2000).
  11. N. Cancrini and F. Martinelli: On the spectral gap of Kawasaki dynamics under a mixing condition revisited, J. Math. Phys. 41, N.3 1391-1423 (2000),
  12. N. Cancrini and F. Martinelli: Diffusive scaling of the spectral gap for the dilute Ising lattice gar dynamics below the percolation threshold, Probab. Theory and Relat. Fields 120 4, 497-534 (2001).
  13. N. Cancrini and F. Martinelli: Stochastic dynamics for the dilute Ising lattice gas: results and open problems, Markov. Proc. Rel. Fields 7, 39-50 (2001).
  14. N. Cancrini, F. Martinelli and C. Roberto: The logarithmic Sobolev constant of Kawasaki dynamics under a mixing condition revisited, Ann. I. H. Poincare -- Probab. Stat. PR 38 4, 385-436 (2002).
  15. L. Bertini, N. Cancrini and F. Cesi: The spectral gap for a Glauber--type dynamics in a continuous gas, Ann. I. H. Poincare -- Probab. Stat. PR 38 1, 91-108 (2002).
  16. N. Cancrini, F. Martinelli and C. Roberto: Spectral gap and logarithmic Sobolev constant of Kawasaki dynamics under a mixing condition revisited, In and Out of Equilibrium: Probability with a Physics Flavor editor Vladas Sidoravicius, Birkhauser Boston (2002).
  17. N. Cancrini: Relaxation to equilibrium of spin exchange dynamics for lattice gases, Markov. Proc. Rel. Fields 8, 251-270 (2002).
  18. N. Cancrini and C. Roberto: Logarithmic Sobolev constant for the dilute Ising lattice gas dynamics below the percolation threshold, Stochastic Process. Appl. 102, 159-205 (2002) .
  19. N. Cancrini and C. Tremoulet: Comparison of finite volume canonical and grand canonical Gibbs measures: the continuous case, J. Stat. Phys. 117, 1023-1046 (2004) .
  20. N. Cancrini, F. Cesi, C. Roberto: Diffusive long time behavior of Kawasaki dynamics, Electron. J. Probab. 10 , n.7, 216-249 (2005) (electronic) .
  21. N. Cancrini, P. Caputo and F. Martinelli: Relaxation time of L-Reversal chains and other chromosome shuffles, Ann. Appl. Probab. 16, n.3, 1506-1527 (2006) .
  22. N. Cancrini, F. Martinelli, C. Roberto and C. Toninelli: Relaxation times of kinetically constrained spin models with glassy dynamics, J. Stat. Mech. (letter) (2007).
  23. N. Cancrini, F. Martinelli, C. Roberto and C. Toninelli: Kinetically constrained spin models, Probab. Theory. Relat. Fields 140, n.3-4, 459-504 (2008).
  24. N. Cancrini, F. Martinelli, C. Roberto and C. Toninelli: Facilitated spin models: recent and new results, in Methods of Contemporary Mathematical Statistical Physics , Biskup, M., Bovier, A. (et al) Kotecky, R. (Ed.), Lecture Notes in Mathematics , Springer Vol. 1970, (2009).
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