Random Walk conditioned to stay above a non-flat floor: curvature effects
Abstract
Let h:[0,1] be C2 and such that [0,1] h''<0. For a (large) positive integer n, set hn(k) = n h(k/n) for any k∈\0,…,n\. We consider a random walk (Sk)k≥ 0 with i.i.d.\ centred increments having some finite exponential moments. We are interested in the event \S≥ hn\ = \Sk≥ hn(k)\;∀ k∈\0,…,n\\. It is well known that P(S≥ hn \,|\, S0=0,\, Sn= hn(n) ) = en∫01 I(h'(s)) \,ds + o(n), where I is the Legendre-Fenchel transform of the log-moment generating function associated to the increments. We first prove that the leading correction is of order e-(n1/3). We then turn our attention to the conditional random walk measure Phn = P(· \,|\, S≥ hn, S0=0, Sn= hn(n) ). We prove that the one-point tails are of the form Pnh (Sk ≥ hn(k) + t n1/3 ) = e-(t3/2) for all t<nβ for any β∈ (0,1/6). Moreover, we prove that, for any r≥ 1, Enh((Sk-hn(k))r) = (nr/3) and VarPnh(Sk) = (n2/3), for all k far enough from 0 and n. In addition, we show that CovPnh(Sk,S) ≤ e-O(|-k|/n2/3) for all k, not too close to 0 and n.
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