The ordered sets field is an important part of the ongoing mathematical, algorithmic and combinatorics research. This young field identifies and addresses many unsolved problems, a considerable group of which were proven (NP). " Characterizing the finite ordered sets with fixed point property" is among those open unsolved problems. It was originally introduced and described by Rival (1984); and was later demonstrated to be NP-complete by Williamson. Since then, several researchers worked and published on the subject, describing a variety of algorithms and techniques to address and solve aspects of the problem. This thesis introduces a computational technique for identifying ordered sets with the fixed point property (FPP). The technique con...
AbstractThe theory of ordered sets lies at the confluence of several branches of mathematics includi...
AbstractAn elementary combinatorial proof is presented of the following fixed point theorem: Let P b...
Consider an ordered point set $P = (p_1,\ldots,p_n)$, its order type (denoted by $\chi_P$) is a map ...
AbstractThis survey exhibits various algorithms to decide the question if a given ordered set P has ...
We provide a polynomial time algorithm that identifies if a given finite ordered set is in the class...
"Ordered sets are ubiquitous in mathematics and have significant applications in computer science, s...
This chapter gives an overview how retractions are used to prove fixed point results in ordered sets...
For a finite ground set X, this paper investigates properties of the set of orders with the fixed po...
Series Encyclopedia of Mathematics and Its Applications (No. 144)Ordered sets are ubiquitous in math...
AbstractThe relationship between the fixed point property and forbidden retracts associated with a f...
AbstractWe propose a new approach towards proving that the fixed point property for ordered sets is ...
We prove that, for a finite ordered set P that contains no crowns with 6 or more elements, it can be...
The second edition of this highly praised textbook provides an expanded introduction to the theory o...
The Ordered conjecture of Kolaitis and Vardi asks whether fixed-point logic differs from first-order...
The order type of a point set in Rd maps each (d+1)-tuple of points to its orientation (e.g. clockwi...
AbstractThe theory of ordered sets lies at the confluence of several branches of mathematics includi...
AbstractAn elementary combinatorial proof is presented of the following fixed point theorem: Let P b...
Consider an ordered point set $P = (p_1,\ldots,p_n)$, its order type (denoted by $\chi_P$) is a map ...
AbstractThis survey exhibits various algorithms to decide the question if a given ordered set P has ...
We provide a polynomial time algorithm that identifies if a given finite ordered set is in the class...
"Ordered sets are ubiquitous in mathematics and have significant applications in computer science, s...
This chapter gives an overview how retractions are used to prove fixed point results in ordered sets...
For a finite ground set X, this paper investigates properties of the set of orders with the fixed po...
Series Encyclopedia of Mathematics and Its Applications (No. 144)Ordered sets are ubiquitous in math...
AbstractThe relationship between the fixed point property and forbidden retracts associated with a f...
AbstractWe propose a new approach towards proving that the fixed point property for ordered sets is ...
We prove that, for a finite ordered set P that contains no crowns with 6 or more elements, it can be...
The second edition of this highly praised textbook provides an expanded introduction to the theory o...
The Ordered conjecture of Kolaitis and Vardi asks whether fixed-point logic differs from first-order...
The order type of a point set in Rd maps each (d+1)-tuple of points to its orientation (e.g. clockwi...
AbstractThe theory of ordered sets lies at the confluence of several branches of mathematics includi...
AbstractAn elementary combinatorial proof is presented of the following fixed point theorem: Let P b...
Consider an ordered point set $P = (p_1,\ldots,p_n)$, its order type (denoted by $\chi_P$) is a map ...