Add to ORKGInternational audienceWe give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 1947). This allows us to obtain a combinatorial proof of the multivariate Lagrange inversion formula that generalizes the celebrated proof of (Raney 1963) in the univariate case, and its extension in (Chottin 1981) to the two variable case. Until now, only the alternative approach of (Joyal 1981) and (Labelle 1981) via labelled arborescences and endofunctions had been successfully extended to the multivariate case in (Gessel 1983), (Goulden and Kulkarni 1996), (Bousquet et al. 2003), and the extension of the cycle lemma to more than 2 variables was elusive. The cycle lemma has found a lot of applications in combinatorics, so we expect our multiv...
AbstractThis paper presents a combinatorial theory of formal power series. The combinatorial interpr...
AbstractA new form of multivariable Lagrange inversion is given, with determinants occurring on both...
AbstractSuppose β(t) and γ(t) are a pair of compositional inverse formal powerseries. Lagrange inver...
International audienceWe give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 194...
International audienceWe give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 194...
Abstract. We give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 1947). This all...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
We prove a multivariate Lagrange-Good formula for functionals of uncountably many variables and inve...
AbstractWe give a simple combinatorial proof a Langrange inversion theorem for species and derive fr...
AbstractGoulden and Kulkarni (J. Combin. Theory Ser. A 80 (2) (1997) 295) give a bijective proof of ...
AbstractA new form of multivariable Lagrange inversion is given, with determinants occurring on both...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
G. N. Raney a donné en 1960 une preuve combinatiore de la formule d'inversion de Lagrange. Nous éten...
AbstractA new proof of Good's generalization to several variables of the Lagrange inversion formula ...
International audienceA result of Foata and Schützenberger states that two statistics on permutation...
AbstractThis paper presents a combinatorial theory of formal power series. The combinatorial interpr...
AbstractA new form of multivariable Lagrange inversion is given, with determinants occurring on both...
AbstractSuppose β(t) and γ(t) are a pair of compositional inverse formal powerseries. Lagrange inver...
International audienceWe give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 194...
International audienceWe give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 194...
Abstract. We give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 1947). This all...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
We prove a multivariate Lagrange-Good formula for functionals of uncountably many variables and inve...
AbstractWe give a simple combinatorial proof a Langrange inversion theorem for species and derive fr...
AbstractGoulden and Kulkarni (J. Combin. Theory Ser. A 80 (2) (1997) 295) give a bijective proof of ...
AbstractA new form of multivariable Lagrange inversion is given, with determinants occurring on both...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
G. N. Raney a donné en 1960 une preuve combinatiore de la formule d'inversion de Lagrange. Nous éten...
AbstractA new proof of Good's generalization to several variables of the Lagrange inversion formula ...
International audienceA result of Foata and Schützenberger states that two statistics on permutation...
AbstractThis paper presents a combinatorial theory of formal power series. The combinatorial interpr...
AbstractA new form of multivariable Lagrange inversion is given, with determinants occurring on both...
AbstractSuppose β(t) and γ(t) are a pair of compositional inverse formal powerseries. Lagrange inver...