This paper is about counting lattice paths. Examples are the paths counted by Catalan, Motzkin or Schröder numbers. We identify lattice paths with walks on some path-like graph. The entries of the nth power of the adjacency matrix are the number of paths of length nwith prescribed start and end position. The adjacency matrices turn out to be Toeplitz matrices. Explicit expressions for eigenvalues and eigenvectors of these matrices are known. This yields expressions for the numbers of paths in the form of trigonometric sums. We give many examples of known sequences that have such expressions. We also deal with cases where no explicit expressions for eigenvalues and eigen-vectors of the relevant matrices are known. In some of these cases it ...
Many famous families of integers can be represented by the number of paths through a lattice given v...
AbstractWe count lattice paths that are confined to the first quadrant by the nature of their step v...
This talk focusses on the interaction between the kernel method, a powerful collection of techniques...
In this bachelor thesis, we introduce the Catalan, Schröder, Motzkin, Narayana and Delannoy numbers....
A lattice path from (a b) to (c d) on the grid Z Z with step set S is a nite sequence of ordered pai...
AbstractLet D0(n) denote the set of lattice paths in the xy-plane that begin at (0,0), terminate at ...
© 2012 Dr. Paul W. T. FijnThis thesis primarily examines several problems in enumerative combinatori...
International audienceThis article deals with the enumeration of directed lattice walks on the integ...
Abstract. We count a large class of lattice paths by using factorizations of free monoids. Besides t...
We enumerate the edges in the Hasse diagram of several lattices arising in the combinatorial context...
AMS Subject Classication: 05A, 33F10 Abstract. Many combinatorial quantities belong to the holonomic...
We enumerate the edges in the Hasse diagram of several lattices arising in the combinatorial context...
Abstract. n-dimensional lattice paths which do not touch the hyperplanes xi−xi+1 = −1, i = 1, 2,...,...
Osculating lattice paths are sets of directed lattice paths which are not allowed to cross or have c...
We give bijective proofs that, when combined with one of the combinatorial proofs of the general bal...
Many famous families of integers can be represented by the number of paths through a lattice given v...
AbstractWe count lattice paths that are confined to the first quadrant by the nature of their step v...
This talk focusses on the interaction between the kernel method, a powerful collection of techniques...
In this bachelor thesis, we introduce the Catalan, Schröder, Motzkin, Narayana and Delannoy numbers....
A lattice path from (a b) to (c d) on the grid Z Z with step set S is a nite sequence of ordered pai...
AbstractLet D0(n) denote the set of lattice paths in the xy-plane that begin at (0,0), terminate at ...
© 2012 Dr. Paul W. T. FijnThis thesis primarily examines several problems in enumerative combinatori...
International audienceThis article deals with the enumeration of directed lattice walks on the integ...
Abstract. We count a large class of lattice paths by using factorizations of free monoids. Besides t...
We enumerate the edges in the Hasse diagram of several lattices arising in the combinatorial context...
AMS Subject Classication: 05A, 33F10 Abstract. Many combinatorial quantities belong to the holonomic...
We enumerate the edges in the Hasse diagram of several lattices arising in the combinatorial context...
Abstract. n-dimensional lattice paths which do not touch the hyperplanes xi−xi+1 = −1, i = 1, 2,...,...
Osculating lattice paths are sets of directed lattice paths which are not allowed to cross or have c...
We give bijective proofs that, when combined with one of the combinatorial proofs of the general bal...
Many famous families of integers can be represented by the number of paths through a lattice given v...
AbstractWe count lattice paths that are confined to the first quadrant by the nature of their step v...
This talk focusses on the interaction between the kernel method, a powerful collection of techniques...