Add to ORKGParking functions have been a focus of mathematical research since the mid-1970s. Various generalizations have been introduced since the mid-1990s and deep relationships between these and other areas of mathematics have been discovered. Here, we introduced a new generalization, the G-multiparking function, where G is a simple graph on a totally ordered vertex set {1, 2, . . . , n}. We give an algorithm that converts a G-multiparking function into a rooted spanning forest of G by using a graph searching technique to build a sequence F1, F2, . . . , Fn, where each Fi is a subforest of G and Fn is a spanning forest of G. We also give another algorithm that converts a rooted spanning forest of G to a G-multiparking function and prove that the r...
AbstractKreweras studied a polynomialPn(q) which enumerates (labeled) rooted forests by number of in...
AbstractIn this paper, we give a new expression for the Tutte polynomial of a general connected grap...
A parking function can be thought of as a sequence of n drivers, each with a preferred parking space...
AbstractFor a directed graph G on vertices {0,1,…,n}, a G-parking function is an n-tuple (b1,…,bn) o...
AbstractIn this paper, we give a new expression for the Tutte polynomial of a general connected grap...
Doctor of PhilosophyDepartment of MathematicsIlia ZharkovWe introduce an object called a tree growin...
AbstractA generalized x-parking function associated to a positive integer vector of the form (a,b,b,...
AbstractGiven an undirected graph G=(V,E), and a designated vertex q∈V, the notion of a G-parking fu...
Konheim and Weiss [2] introduced the concept of parking func-tions of length n in the study of the l...
AMS Subject Classication: 05C30, 05C05 Abstract. There are several combinatorial objects that are kn...
AbstractParking functions are central in many aspects of combinatorics. We define in this communicat...
Parking functions of length $n$ are well known to be in correspondence with both labelled trees on $...
International audienceFor a fixed sequence of $n$ positive integers $(a,\bar{b}) := (a, b, b,\ldots,...
A parking function can be thought of as a sequence of n drivers, each with a preferred parking space...
International audienceFor a fixed sequence of $n$ positive integers $(a,\bar{b}) := (a, b, b,\ldots,...
AbstractKreweras studied a polynomialPn(q) which enumerates (labeled) rooted forests by number of in...
AbstractIn this paper, we give a new expression for the Tutte polynomial of a general connected grap...
A parking function can be thought of as a sequence of n drivers, each with a preferred parking space...
AbstractFor a directed graph G on vertices {0,1,…,n}, a G-parking function is an n-tuple (b1,…,bn) o...
AbstractIn this paper, we give a new expression for the Tutte polynomial of a general connected grap...
Doctor of PhilosophyDepartment of MathematicsIlia ZharkovWe introduce an object called a tree growin...
AbstractA generalized x-parking function associated to a positive integer vector of the form (a,b,b,...
AbstractGiven an undirected graph G=(V,E), and a designated vertex q∈V, the notion of a G-parking fu...
Konheim and Weiss [2] introduced the concept of parking func-tions of length n in the study of the l...
AMS Subject Classication: 05C30, 05C05 Abstract. There are several combinatorial objects that are kn...
AbstractParking functions are central in many aspects of combinatorics. We define in this communicat...
Parking functions of length $n$ are well known to be in correspondence with both labelled trees on $...
International audienceFor a fixed sequence of $n$ positive integers $(a,\bar{b}) := (a, b, b,\ldots,...
A parking function can be thought of as a sequence of n drivers, each with a preferred parking space...
International audienceFor a fixed sequence of $n$ positive integers $(a,\bar{b}) := (a, b, b,\ldots,...
AbstractKreweras studied a polynomialPn(q) which enumerates (labeled) rooted forests by number of in...
AbstractIn this paper, we give a new expression for the Tutte polynomial of a general connected grap...
A parking function can be thought of as a sequence of n drivers, each with a preferred parking space...