PhD thesisThis thesis is about the enumeration of two models of directed lattice paths in a strip. The first problem considered is of path diagrams formed by Dyck paths and columns underneath it, counted with respect to the length of the paths and the sum of the heights of the columns. The enumeration of these path diagrams is related to q-deformed tangent and secant numbers. Generating functions of height-restricted path diagrams are given by convergents of continued fractions. We derive expressions for these convergents in terms of basic hypergeometric functions, leading to a hierarchy of novel identities for basic hypergeometric functions. From these expressions, we also find novel expressions for the infinite continued fractions, leadin...
AbstractWe count lattice paths that are confined to the first quadrant by the nature of their step v...
International audienceThis paper tackles the enumeration and asymptotics of the area below directed ...
We study various aspects of lattice path combinatorics. A new object, which has Dyck paths as its su...
A dissertation submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, i...
19 pages, 5 figures, accepted version (Journal of Combinatorics)19 pages, 5 figures, accepted versio...
AbstractThis paper develops a unified enumerative and asymptotic theory of directed two-dimensional ...
International audienceThis article deals with the enumeration of directed lattice walks on the integ...
PhDThis thesis concerns the enumeration and structural properties of lattice paths. The study of D...
International audienceWe analyze some enumerative and asymptotic properties of Dyck paths under a li...
A dissertation submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg in...
AbstractThis paper extends Flajolet's (Discrete Math. 32 (1980), 125–161) combinatorial theory of co...
This bachelor s degree thesis studies two type of combinatorial objects. The first ones are exact mo...
In this article, we revisit and extend a list of formulas based on lattice path surgery: cut-and-pas...
© 2012 Dr. Paul W. T. FijnThis thesis primarily examines several problems in enumerative combinatori...
This talk focusses on the interaction between the kernel method, a powerful collection of techniques...
AbstractWe count lattice paths that are confined to the first quadrant by the nature of their step v...
International audienceThis paper tackles the enumeration and asymptotics of the area below directed ...
We study various aspects of lattice path combinatorics. A new object, which has Dyck paths as its su...
A dissertation submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, i...
19 pages, 5 figures, accepted version (Journal of Combinatorics)19 pages, 5 figures, accepted versio...
AbstractThis paper develops a unified enumerative and asymptotic theory of directed two-dimensional ...
International audienceThis article deals with the enumeration of directed lattice walks on the integ...
PhDThis thesis concerns the enumeration and structural properties of lattice paths. The study of D...
International audienceWe analyze some enumerative and asymptotic properties of Dyck paths under a li...
A dissertation submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg in...
AbstractThis paper extends Flajolet's (Discrete Math. 32 (1980), 125–161) combinatorial theory of co...
This bachelor s degree thesis studies two type of combinatorial objects. The first ones are exact mo...
In this article, we revisit and extend a list of formulas based on lattice path surgery: cut-and-pas...
© 2012 Dr. Paul W. T. FijnThis thesis primarily examines several problems in enumerative combinatori...
This talk focusses on the interaction between the kernel method, a powerful collection of techniques...
AbstractWe count lattice paths that are confined to the first quadrant by the nature of their step v...
International audienceThis paper tackles the enumeration and asymptotics of the area below directed ...
We study various aspects of lattice path combinatorics. A new object, which has Dyck paths as its su...