AbstractLet C+ and C− be two collections of topological discs. The collection of discs is ‘topological’ in the sense that their boundaries are Jordan curves and each pair of Jordan curves intersect at most twice. We prove that the region ∪C+ − ∪C− has combinatorial complexity at most 10n − 30 where p = |C+|, q = |C−| and n = p + q ≥ 5. Moreover, this bound is achievable. We also show less precise bounds that are stated as functions of p and q
We analyse the combinatorial complexity κ(F) of the minimum M(x,y) of a collection F of n continuous...
AbstractIn this paper the communication complexity C(mn) of the cardinality of set intersection, mn ...
In the 90's Clark, Colbourn and Johnson wrote a seminal paper where they proved that maximum clique ...
AbstractLet C+ and C− be two collections of topological discs. The collection of discs is ‘topologic...
Let $CC^+$ and $CC^-$ be two collections of topological discs of arbitrary radii. The collection of...
Consider a face F in an arrangement of n Jordan curves in the plane, no two of which intersect more ...
AbstractThis paper studies an impact of geometric degeneracies on the complexity of geometric object...
Abstract. We provide a new formula for an upper bound of the com-plexity of non-Seifert graph-manifo...
A (not necessarily convex) object C in the plane is - curved for some constant , ! 1, if it has con...
We consider an arrangement A of n hyperplanes in Rd and the zone Z in A of the boundary of an arbitr...
International audienceA (unit) disk graph is the intersection graph of closed (unit) disks in the pl...
The complexity of combinatorial problems with succinct input representation. - In: Acta informatica....
Abstract. We study the resolution complexity of Tseitin formulas over arbitrary rings in terms of co...
1 Topological and Geometrical Combinatorics Martin Tancer Abstract The task of the thesis is to pres...
This work.develops the foundations of topological graph theory with a unified approach using combin...
We analyse the combinatorial complexity κ(F) of the minimum M(x,y) of a collection F of n continuous...
AbstractIn this paper the communication complexity C(mn) of the cardinality of set intersection, mn ...
In the 90's Clark, Colbourn and Johnson wrote a seminal paper where they proved that maximum clique ...
AbstractLet C+ and C− be two collections of topological discs. The collection of discs is ‘topologic...
Let $CC^+$ and $CC^-$ be two collections of topological discs of arbitrary radii. The collection of...
Consider a face F in an arrangement of n Jordan curves in the plane, no two of which intersect more ...
AbstractThis paper studies an impact of geometric degeneracies on the complexity of geometric object...
Abstract. We provide a new formula for an upper bound of the com-plexity of non-Seifert graph-manifo...
A (not necessarily convex) object C in the plane is - curved for some constant , ! 1, if it has con...
We consider an arrangement A of n hyperplanes in Rd and the zone Z in A of the boundary of an arbitr...
International audienceA (unit) disk graph is the intersection graph of closed (unit) disks in the pl...
The complexity of combinatorial problems with succinct input representation. - In: Acta informatica....
Abstract. We study the resolution complexity of Tseitin formulas over arbitrary rings in terms of co...
1 Topological and Geometrical Combinatorics Martin Tancer Abstract The task of the thesis is to pres...
This work.develops the foundations of topological graph theory with a unified approach using combin...
We analyse the combinatorial complexity κ(F) of the minimum M(x,y) of a collection F of n continuous...
AbstractIn this paper the communication complexity C(mn) of the cardinality of set intersection, mn ...
In the 90's Clark, Colbourn and Johnson wrote a seminal paper where they proved that maximum clique ...
DOI
Add to ORKG