Abstract
Abstract
We study the tail of p(U), the probability distribution of
U
=
|
ψ
(
0
,
L
)
|
2
, for
ln
U
≫
1
,
ψ
(
x
,
z
)
being the solution to
∂
z
ψ
−
i
2
m
∇
⊥
2
ψ
=
g
|
S
|
2
ψ
, where
S
(
x
,
z
)
is a complex Gaussian random field, z and x respectively are the axial and transverse coordinates, with
0
⩽
z
⩽
L
, and both
m
≠
0
and g > 0 are real parameters. We perform the first instanton analysis of the corresponding Martin-Siggia-Rose action, from which it is found that the realizations of S concentrate onto long filamentary instantons, as
ln
U
→
+
∞
. The tail of p(U) is deduced from the statistics of the instantons. The value of g above which
⟨
U
⟩
diverges coincides with the one obtained by the completely different approach developed in Mounaix et al (2006 Commun. Math. Phys.
264 741). Numerical simulations clearly show a statistical bias of S towards the instanton for the largest sampled values of
ln
U
. The high maxima—or ‘hot spots’—of
|
S
(
x
,
z
)
|
2
for the biased realizations of S tend to cluster in the instanton region.
Subject
General Physics and Astronomy,Mathematical Physics,Modeling and Simulation,Statistics and Probability,Statistical and Nonlinear Physics