In this paper, we present a general methodology to solve a wide variety of classical lattice path counting problems in a uniform way. These counting problems are related to Dyck paths, Motzkin paths and some generalizations. The methodology uses weighted automata, equations of ordinary generating functions and continued fractions. This new methodology is called Counting Automata Methodology. It is a variation of the technique proposed by Rutten, which is called Coinductive Counting
PhDThis thesis concerns the enumeration and structural properties of lattice paths. The study of D...
This talk focusses on the interaction between the kernel method, a powerful collection of techniques...
International audienceWe consider the enumeration of walks on the two-dimensional non-negative integ...
En este trabajo presentamos una metodología general para resolver una gran variedad de problemas clá...
This bachelor s degree thesis studies two type of combinatorial objects. The first ones are exact mo...
Recent methods used in lattice path combinatorics and various related branches of enumerative combin...
© 2012 Dr. Paul W. T. FijnThis thesis primarily examines several problems in enumerative combinatori...
A general methodology is developed to compute the solution of a wide variety of basic counting probl...
International audienceThis article deals with the enumeration of directed lattice walks on the integ...
The recently developed coinductive calculus of streams finds here a further application in enumerati...
AbstractThis paper develops a unified enumerative and asymptotic theory of directed two-dimensional ...
AbstractThe recently developed coinductive calculus of streams finds here a further application in e...
AbstractThis paper extends Flajolet's (Discrete Math. 32 (1980), 125–161) combinatorial theory of co...
This booklet develops in nearly 200 pages the basics of combinatorial enumeration through an approac...
Lattice paths are very classic objects in both probability theory and enumerative combinatorics. In ...
PhDThis thesis concerns the enumeration and structural properties of lattice paths. The study of D...
This talk focusses on the interaction between the kernel method, a powerful collection of techniques...
International audienceWe consider the enumeration of walks on the two-dimensional non-negative integ...
En este trabajo presentamos una metodología general para resolver una gran variedad de problemas clá...
This bachelor s degree thesis studies two type of combinatorial objects. The first ones are exact mo...
Recent methods used in lattice path combinatorics and various related branches of enumerative combin...
© 2012 Dr. Paul W. T. FijnThis thesis primarily examines several problems in enumerative combinatori...
A general methodology is developed to compute the solution of a wide variety of basic counting probl...
International audienceThis article deals with the enumeration of directed lattice walks on the integ...
The recently developed coinductive calculus of streams finds here a further application in enumerati...
AbstractThis paper develops a unified enumerative and asymptotic theory of directed two-dimensional ...
AbstractThe recently developed coinductive calculus of streams finds here a further application in e...
AbstractThis paper extends Flajolet's (Discrete Math. 32 (1980), 125–161) combinatorial theory of co...
This booklet develops in nearly 200 pages the basics of combinatorial enumeration through an approac...
Lattice paths are very classic objects in both probability theory and enumerative combinatorics. In ...
PhDThis thesis concerns the enumeration and structural properties of lattice paths. The study of D...
This talk focusses on the interaction between the kernel method, a powerful collection of techniques...
International audienceWe consider the enumeration of walks on the two-dimensional non-negative integ...