We consider the concept of rank as a measure of the vertical levels and positions of elements of partially ordered sets (posets). We are motivated by the need for algorithmic measures on large, real-world hierarchically-structured data objects like the semantic hierarchies of ontolog-ical databases. These rarely satisfy the strong property of gradedness, which is required for traditional rank functions to exist. Representing such semantic hierarchies as finite, bounded posets, we recognize the duality of ordered structures to motivate rank functions which respect verticality both from the bottom and from the top. Our rank functions are thus interval-valued, and always exist, even for non-graded posets, providing order homomorphisms to an in...
AbstractSuppose that n competitors participate in r races so that each competitor obtains a result c...
summary:A $k$-ranking of a graph $G=(V,E)$ is a mapping $\varphi \:V \rightarrow \lbrace 1,2,\dots ,...
The relative rank rank(S: U) of a subsemigroup U of a semigroup S is the minimum size of a set V ⊆ S...
In order theory, a rank function measures the vertical “level ” of a poset element. It is an integer...
The rank (resp. dimension) of a poset P is the cardinality of a largest (resp. smallest) set of line...
AbstractThe rank (resp. dimension) of a poset P is the cardinality of a largest (resp. smallest) set...
Objects that are described by attribute vectors often need to be ranked. A popular approach not requ...
The first part of the thesis concerns the problem of ranking in general. We take a closer look at th...
Ranked data arise when some group of judges is asked to rank order a set of n items according to som...
The relative rank rank(S : U) of a subsemigroup U of a semigroup S is the minimum size of a set V su...
We study rank functions (also known as graph homomorphisms onto Z), ways of imposing graded poset st...
We answer the following question: Let P and Q be graded posets having some property and let ffi be s...
When ranking objects (like chemicals, geographical sites, river sections, etc.) by multicriteria ana...
AbstractThis paper structurally characterizes the complexity of ranking. A set A is (strongly) P-ran...
AbstractMotivated by work of Stembridge, we study rank functions for Viennot's heaps of pieces. We p...
AbstractSuppose that n competitors participate in r races so that each competitor obtains a result c...
summary:A $k$-ranking of a graph $G=(V,E)$ is a mapping $\varphi \:V \rightarrow \lbrace 1,2,\dots ,...
The relative rank rank(S: U) of a subsemigroup U of a semigroup S is the minimum size of a set V ⊆ S...
In order theory, a rank function measures the vertical “level ” of a poset element. It is an integer...
The rank (resp. dimension) of a poset P is the cardinality of a largest (resp. smallest) set of line...
AbstractThe rank (resp. dimension) of a poset P is the cardinality of a largest (resp. smallest) set...
Objects that are described by attribute vectors often need to be ranked. A popular approach not requ...
The first part of the thesis concerns the problem of ranking in general. We take a closer look at th...
Ranked data arise when some group of judges is asked to rank order a set of n items according to som...
The relative rank rank(S : U) of a subsemigroup U of a semigroup S is the minimum size of a set V su...
We study rank functions (also known as graph homomorphisms onto Z), ways of imposing graded poset st...
We answer the following question: Let P and Q be graded posets having some property and let ffi be s...
When ranking objects (like chemicals, geographical sites, river sections, etc.) by multicriteria ana...
AbstractThis paper structurally characterizes the complexity of ranking. A set A is (strongly) P-ran...
AbstractMotivated by work of Stembridge, we study rank functions for Viennot's heaps of pieces. We p...
AbstractSuppose that n competitors participate in r races so that each competitor obtains a result c...
summary:A $k$-ranking of a graph $G=(V,E)$ is a mapping $\varphi \:V \rightarrow \lbrace 1,2,\dots ,...
The relative rank rank(S: U) of a subsemigroup U of a semigroup S is the minimum size of a set V ⊆ S...