Area distribution and the average shape of a L\'evy bridge

Abstract

We consider a one dimensional L\'evy bridge xB of length n and index 0 < α < 2, i.e. a L\'evy random walk constrained to start and end at the origin after n time steps, xB(0) = xB(n)=0. We compute the distribution PB(A,n) of the area A = Σm=1n xB(m) under such a L\'evy bridge and show that, for large n, it has the scaling form PB(A,n) n-1-1/α Fα(A/n1+1/α), with the asymptotic behavior Fα(Y) Y-2(1+α) for large Y. For α=1, we obtain an explicit expression of F1(Y) in terms of elementary functions. We also compute the average profile < xB (m) > at time m of a L\'evy bridge with fixed area A. For large n and large m and A, one finds the scaling form < xB(m) > = n1/α Hα(m/n,A/n1+1/α), where at variance with Brownian bridge, Hα(X,Y) is a non trivial function of the rescaled time m/n and rescaled area Y = A/n1+1/α. Our analytical results are verified by numerical simulations.