International audienceIn the present paper, we introduce a new approach, relying on the Galois theory of difference equations, to study the nature of the generating series of walks in the quarter plane. Using this approach, we are not only able to recover many of the recent results about these series, but also to go beyond them. For instance, we give for the first time hypertranscendency results, i.e., we prove that certain of these generating series do not satisfy any nontrivial nonlinear algebraic differential equation with rational coefficients
International audienceWe address the enumeration of walks with weighted small steps avoiding a quadr...
54 pages, 10 figures, 10 tablesIn the 1970s, William Tutte developed a clever algebraic approach, ba...
This paper is the first application of the compensation approach to counting problems. We discuss ho...
International audienceIn the present paper, we introduce a new approach, relying on the Galois theor...
International audienceWe use Galois theory of difference equations to study the nature of the genera...
In the recent years, the nature of the generating series of the walks in the quarter plane has attra...
International audienceWe refine necessary and sufficient conditions for the generating series of a w...
Abstract. In this article we present a new approach for finding the generating function counting (no...
36 pages, 9 figuresInternational audienceWe consider weighted small step walks in the positive quadr...
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...
International audienceWe study nearest-neighbors walks on the two-dimensional square lattice, that i...
AbstractThis work considers the nature of generating functions of random lattice walks restricted to...
International audienceThe kernel method is an essential tool for the study of generating series of w...
International audienceWe address the enumeration of walks with weighted small steps avoiding a quadr...
54 pages, 10 figures, 10 tablesIn the 1970s, William Tutte developed a clever algebraic approach, ba...
This paper is the first application of the compensation approach to counting problems. We discuss ho...
International audienceIn the present paper, we introduce a new approach, relying on the Galois theor...
International audienceWe use Galois theory of difference equations to study the nature of the genera...
In the recent years, the nature of the generating series of the walks in the quarter plane has attra...
International audienceWe refine necessary and sufficient conditions for the generating series of a w...
Abstract. In this article we present a new approach for finding the generating function counting (no...
36 pages, 9 figuresInternational audienceWe consider weighted small step walks in the positive quadr...
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...
International audienceWe study nearest-neighbors walks on the two-dimensional square lattice, that i...
AbstractThis work considers the nature of generating functions of random lattice walks restricted to...
International audienceThe kernel method is an essential tool for the study of generating series of w...
International audienceWe address the enumeration of walks with weighted small steps avoiding a quadr...
54 pages, 10 figures, 10 tablesIn the 1970s, William Tutte developed a clever algebraic approach, ba...
This paper is the first application of the compensation approach to counting problems. We discuss ho...