International audienceThe kernel method is an essential tool for the study of generating series of walks in the quarter plane. This method involves equating to zero a certain polynomial-the kernel polynomial-and using properties of the curve-the kernel curve-this defines. In the present paper, we investigate the basic properties of the kernel curve (irreducibility, singularities, genus, uniformization, etc)
AbstractThis work considers the nature of generating functions of random lattice walks restricted to...
We present two classes of random walks restricted to the quarter plane whose gen-erating function is...
An algorithm is described which gives a base of the kernel of the Kodaira-Spencer map of the versal ...
International audienceThe kernel method is an essential tool for the study of generating series of w...
International audienceWe use Galois theory of difference equations to study the nature of the genera...
Abstract. In this article we present a new approach for finding the generating function counting (no...
International audienceIn the book [FIM], original methods were proposed to determine the invariant ...
International audienceIn the present paper, we introduce a new approach, relying on the Galois theor...
The kernel method has proved to be an extremely versatile tool for exact and asymptotic enumeration....
In this survey we present an analytic approach to solve problems concerning (deterministic...
Abstract. In this survey we present an analytic approach to solve problems concerning (deterministic...
AbstractWe present two classes of random walks restricted to the quarter plane with non-holonomic ge...
We compute the singular points of a plane rational curve, parametrically given, using the implicitiz...
In the recent years, the nature of the generating series of the walks in the quarter plane has attra...
AbstractWe compute the singular points of a plane rational curve, parametrically given, using the im...
AbstractThis work considers the nature of generating functions of random lattice walks restricted to...
We present two classes of random walks restricted to the quarter plane whose gen-erating function is...
An algorithm is described which gives a base of the kernel of the Kodaira-Spencer map of the versal ...
International audienceThe kernel method is an essential tool for the study of generating series of w...
International audienceWe use Galois theory of difference equations to study the nature of the genera...
Abstract. In this article we present a new approach for finding the generating function counting (no...
International audienceIn the book [FIM], original methods were proposed to determine the invariant ...
International audienceIn the present paper, we introduce a new approach, relying on the Galois theor...
The kernel method has proved to be an extremely versatile tool for exact and asymptotic enumeration....
In this survey we present an analytic approach to solve problems concerning (deterministic...
Abstract. In this survey we present an analytic approach to solve problems concerning (deterministic...
AbstractWe present two classes of random walks restricted to the quarter plane with non-holonomic ge...
We compute the singular points of a plane rational curve, parametrically given, using the implicitiz...
In the recent years, the nature of the generating series of the walks in the quarter plane has attra...
AbstractWe compute the singular points of a plane rational curve, parametrically given, using the im...
AbstractThis work considers the nature of generating functions of random lattice walks restricted to...
We present two classes of random walks restricted to the quarter plane whose gen-erating function is...
An algorithm is described which gives a base of the kernel of the Kodaira-Spencer map of the versal ...