Improvements on the distribution of maximal segmental scores in a Markovian sequence

Abstract

Let (Ai)i ≥ 0 be a finite state irreducible aperiodic Markov chain and f a lattice score function such that the average score is negative and positive scores are possible. Define S0:=0 and Sk:=Σi=1k f(Ai) the successive partial sums, S+ the maximal non-negative partial sum, Q1 the maximal segmental score of the first non-negative excursion and Mn:=0≤ k≤≤ n (S-Sk) the local score first defined by Karlin and Altschul (1990). We establish recursive formulae for the exact distribution of S+ and derive new approximations for the distributions of Q1 and Mn. Computational methods are presented in a simple application case and comparison is performed between these new approximations and the ones proposed by Karlin and Dembo (1992) in order to evaluate improvements.