AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II discusses the various multivariable Lagrange inversion formulas of Jacobi, Stieltjes, Good, Joni, and Abhyankar and shows how they can be derived from each other
AbstractA new form of multivariable Lagrange inversion is given, with determinants occurring on both...
Faà di Bruno's formula gives an expression for the derivatives of the composition of two real-valued...
AbstractA pair of general reciprocal formulas is established which is the multifold analog of Gould-...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
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...
International audienceWe give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 194...
We prove a multivariate Lagrange-Good formula for functionals of uncountably many variables and inve...
Abstract. We give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 1947). This all...
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...
AbstractA new proof of Good's generalization to several variables of the Lagrange inversion formula ...
AbstractWe give a simple combinatorial proof a Langrange inversion theorem for species and derive fr...
AbstractSuppose β(t) and γ(t) are a pair of compositional inverse formal powerseries. Lagrange inver...
The following outlines my Ph.D thesis on Lagrange Inversion, Rogers-Ramanujan identities, and orthog...
AbstractA new form of multivariable Lagrange inversion is given, with determinants occurring on both...
Faà di Bruno's formula gives an expression for the derivatives of the composition of two real-valued...
AbstractA pair of general reciprocal formulas is established which is the multifold analog of Gould-...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
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...
International audienceWe give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 194...
We prove a multivariate Lagrange-Good formula for functionals of uncountably many variables and inve...
Abstract. We give a multitype extension of the cycle lemma of (Dvoretzky and Motzkin 1947). This all...
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...
AbstractA new proof of Good's generalization to several variables of the Lagrange inversion formula ...
AbstractWe give a simple combinatorial proof a Langrange inversion theorem for species and derive fr...
AbstractSuppose β(t) and γ(t) are a pair of compositional inverse formal powerseries. Lagrange inver...
The following outlines my Ph.D thesis on Lagrange Inversion, Rogers-Ramanujan identities, and orthog...
AbstractA new form of multivariable Lagrange inversion is given, with determinants occurring on both...
Faà di Bruno's formula gives an expression for the derivatives of the composition of two real-valued...
AbstractA pair of general reciprocal formulas is established which is the multifold analog of Gould-...
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