Moderate deviations for one-dimensional random walk in random scenery

[1] A. Asselah and F. Castell., Large deviations for Brownian motion in a random scenery. Probab. Theory Related Fields. 126, 497-527 (2003).
[2] A. Asselah and F. Castell., A note on random walk in random scenery.
Preprint, (2005).
[3] A. Asselah and F. Castell., Self-intersection times for random walk and random walk in random scenery in dimensions d > 5. Preprint,(2006).
[4] E. Bolthausen., A central limit theorem for two-dimensional random walk in random sceneries. Ann. Probab. 17, 108-115 (1989).
[5] A. N. Borodin., Limit theorems for sums of independent random variables defined on a transient random walk. (In Russian). Zap. Nauchn. Sem. Leningrad. Otdel. Mat. Inst. Steklov (LOMI). 85, 17-29 (1979).
[6] F. Castell and F. Pradeilles., Annealed large deviations for diffusions in a random Gaussian shear flow drift. Stoch. Proc. Appl. 94, 171-197 (2001).
[7] X. Chen., Limits laws for the energy of a charged polymer. Annales de
lInstitut Henri Poincare.44, 638-672 (2008).
[8] X. Chen. and W. Li., Large and moderate deviations for intersection local
times., Probab. Theor. Rel. Fields. 128, 213-254 (2004).
[9] K. Fleischmann., V. Wachtel., P. Mörters., Moderate deviations of random walk in random scenery. Stoch. Proc. Appl. (to appear)
[10] N. Gantert, R. van der Hofstad and W. Konig., Deviations of a random walk in a random scenery with stretched exponential tails. Stoch. Proc.
Appl. 116, 480-492 (2006).
[11] N. Gantert, W. König and Z. Shi., Annealed deviations of random walk in random scenery. Ann. Inst. H. Poincare: Probab. Stat. (to appear) (2005).
[12] H. Kesten and F. Spitzer., A limit theorem related to a new class of self-similar processes. Z. Wahrsch. verw. Gebiete. textbf50, 5-25 (1979).
[13] N. C. Jain., and W. E. Pruitt., Asymptotic behavior of the local time of a recurrent random walk. Ann. Probab. 11 64-85 (1984).