Abstract. The generating series of a radix-rational sequence is a rational formal power series from formal language theory viewed through a fixed radix numeration system. For each radix-rational sequence with complex values we provide an asymptotic expansion for the sequence of its Cesàro means. The precision of the asymptotic expansion depends on the joint spectral radius of the linear representation of the sequence; the coefficients are obtained through some dilation equations. The proofs are based on elementary linear algebra. Content
THE aim of the present paper is to investigate the ergodic properties of the denominators dn in the ...
AbstractWe give algorithms to compute the asymptotic expansion of solutions of linear recurrences wi...
We prove that the sum-of-digits function with respect to certain digital expansions (which are relat...
International audienceAmong all sequences that satisfy a divide-and-conquer recurrence, those which ...
We study the random variable Yn representing the number of occurrences of a symbol a in a word of l...
We study the random variable Yn representing the number of occurrences of a symbol a in a word of le...
AbstractWe study the random variable Yn representing the number of occurrences of a symbol a in a wo...
Analysis of AlgorithmsWe analyse the asymptotic behaviour in the mean of a non-commutative rational ...
Abstract. We investigate some properties connected with the alternating Lüroth-type se-ries represen...
We study the connections between rational series with coefficients in a semiring and their languages...
We deepen here the insight on formal power series. We temporarily abandon formality and consider the...
Abstract. Motivated by problems of pattern statistics, we study the limit distribu-tion of the rando...
Motivated by problems of pattern statistics, we study the limit distribu- tion of the random variabl...
The convergence properties and limiting behavior of several real sequences are studied by analytical...
International audienceOver the last several decades, improvements in the fields of analytic combinat...
THE aim of the present paper is to investigate the ergodic properties of the denominators dn in the ...
AbstractWe give algorithms to compute the asymptotic expansion of solutions of linear recurrences wi...
We prove that the sum-of-digits function with respect to certain digital expansions (which are relat...
International audienceAmong all sequences that satisfy a divide-and-conquer recurrence, those which ...
We study the random variable Yn representing the number of occurrences of a symbol a in a word of l...
We study the random variable Yn representing the number of occurrences of a symbol a in a word of le...
AbstractWe study the random variable Yn representing the number of occurrences of a symbol a in a wo...
Analysis of AlgorithmsWe analyse the asymptotic behaviour in the mean of a non-commutative rational ...
Abstract. We investigate some properties connected with the alternating Lüroth-type se-ries represen...
We study the connections between rational series with coefficients in a semiring and their languages...
We deepen here the insight on formal power series. We temporarily abandon formality and consider the...
Abstract. Motivated by problems of pattern statistics, we study the limit distribu-tion of the rando...
Motivated by problems of pattern statistics, we study the limit distribu- tion of the random variabl...
The convergence properties and limiting behavior of several real sequences are studied by analytical...
International audienceOver the last several decades, improvements in the fields of analytic combinat...
THE aim of the present paper is to investigate the ergodic properties of the denominators dn in the ...
AbstractWe give algorithms to compute the asymptotic expansion of solutions of linear recurrences wi...
We prove that the sum-of-digits function with respect to certain digital expansions (which are relat...