Let (A v) v ∈ V be a finite family of sets. We establish an improved inclusion-exclusion identity for each closure operator on the power set of V having the unique base property. The result generalizes three improvements of the inclusion-exclusion principle as well as Whitney's broken circuit theorem on the chromatic polynomial of a graph
We investigate a standard operator on classes of languages: unambiguous polynomial closure. We prove...
In this work, we presented a new law which was based on the well-known duality property for the set ...
AbstractThe topic of this paper is Borel versions of infinite combinatorial theorems. For example it...
This introduction to the recent theory of abstract tubes describes the framework for establishing im...
Let $\mathcal{F}$ = {F 1, F 2,..., Fn } be a family of n sets on a ground set S, such as a family of...
In this text we attempt to unify many results about the K operator based on a new theory involving g...
We consider a natural generalisation of the familiar inclusion-exclusion formula for sets in the set...
In this BSc thesis we focus on the principle of inclusion and exclusion and its applications. This p...
Viele Probleme der Kombinatorik, Zahlentheorie, Wahrscheinlichkeitstheorie, Zuverlässigkeitstheorie ...
In this thesis we present two new applications of the representation theory of finite groups in disc...
The authors present a measure theoretic formulation of the principle of inclusion and exclusion. App...
AbstractThe principle of inclusion-exclusion on semilattices is extended on partially ordered sets a...
AbstractAfter a discussion of shadows in a more general setting, we prove for the immediate inclusio...
An additive induced-hereditary property of graphs is any class of finite simple graphs which is clos...
We investigate classes of graphs and posets that admit decompositions to obtain or disprove finitene...
We investigate a standard operator on classes of languages: unambiguous polynomial closure. We prove...
In this work, we presented a new law which was based on the well-known duality property for the set ...
AbstractThe topic of this paper is Borel versions of infinite combinatorial theorems. For example it...
This introduction to the recent theory of abstract tubes describes the framework for establishing im...
Let $\mathcal{F}$ = {F 1, F 2,..., Fn } be a family of n sets on a ground set S, such as a family of...
In this text we attempt to unify many results about the K operator based on a new theory involving g...
We consider a natural generalisation of the familiar inclusion-exclusion formula for sets in the set...
In this BSc thesis we focus on the principle of inclusion and exclusion and its applications. This p...
Viele Probleme der Kombinatorik, Zahlentheorie, Wahrscheinlichkeitstheorie, Zuverlässigkeitstheorie ...
In this thesis we present two new applications of the representation theory of finite groups in disc...
The authors present a measure theoretic formulation of the principle of inclusion and exclusion. App...
AbstractThe principle of inclusion-exclusion on semilattices is extended on partially ordered sets a...
AbstractAfter a discussion of shadows in a more general setting, we prove for the immediate inclusio...
An additive induced-hereditary property of graphs is any class of finite simple graphs which is clos...
We investigate classes of graphs and posets that admit decompositions to obtain or disprove finitene...
We investigate a standard operator on classes of languages: unambiguous polynomial closure. We prove...
In this work, we presented a new law which was based on the well-known duality property for the set ...
AbstractThe topic of this paper is Borel versions of infinite combinatorial theorems. For example it...