DOIAbstract
AbstractWe show that the cyclic derivative of any algebraic formal power series in noncommuting variables is again algebraic
AbstractWe show that the cyclic derivative of any algebraic formal power series in noncommuting variables is again algebraic
AbstractWith x and y noncommutative indeterminates, a natural presentation of z = log(exey) as a sum...
In this paper, we will present several algorithms for computing with D-algebraic power series. Such ...
International audienceIn this paper we present a coinductive definition of context free power series...
AbstractWe show that the cyclic derivative of any algebraic formal power series in noncommuting vari...
AbstractWe extend some results of Christol and Furstenberg to the case of several variables: (1) A p...
AbstractSequences of numbers abound in combinatorics the generating functions of which are algebraic...
Summary. In this paper we define the algebra of formal power series and the algebra of polynomials o...
1. Introiluction and preliminaries. The theory of formal power series in non-commuting variables was...
AbstractWe show that each formal power series in noncommuting variables may be obtained by an infini...
"The algebraic theory of automata was created by Schützenberger and Chomsky over 50 years ago and t...
Contains fulltext : mmubn000001_251959449.pdf (publisher's version ) (Open Access)...
AbstractWe study algebraic generalized zeta functions of formal power series. We show that the gener...
In nonlinear control, it is helpful to choose a formalism well suited to computations involving solu...
Abstract. Consider the algebra Q〈〈x1, x2,...〉 〉 of formal power series in countably many noncommutin...
In 1986, in order to study the linear representations of the braid group $B_n$coming from the monodr...
AbstractWith x and y noncommutative indeterminates, a natural presentation of z = log(exey) as a sum...
In this paper, we will present several algorithms for computing with D-algebraic power series. Such ...
International audienceIn this paper we present a coinductive definition of context free power series...
AbstractWe show that the cyclic derivative of any algebraic formal power series in noncommuting vari...
AbstractWe extend some results of Christol and Furstenberg to the case of several variables: (1) A p...
AbstractSequences of numbers abound in combinatorics the generating functions of which are algebraic...
Summary. In this paper we define the algebra of formal power series and the algebra of polynomials o...
1. Introiluction and preliminaries. The theory of formal power series in non-commuting variables was...
AbstractWe show that each formal power series in noncommuting variables may be obtained by an infini...
"The algebraic theory of automata was created by Schützenberger and Chomsky over 50 years ago and t...
Contains fulltext : mmubn000001_251959449.pdf (publisher's version ) (Open Access)...
AbstractWe study algebraic generalized zeta functions of formal power series. We show that the gener...
In nonlinear control, it is helpful to choose a formalism well suited to computations involving solu...
Abstract. Consider the algebra Q〈〈x1, x2,...〉 〉 of formal power series in countably many noncommutin...
In 1986, in order to study the linear representations of the braid group $B_n$coming from the monodr...
AbstractWith x and y noncommutative indeterminates, a natural presentation of z = log(exey) as a sum...
In this paper, we will present several algorithms for computing with D-algebraic power series. Such ...
International audienceIn this paper we present a coinductive definition of context free power series...
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