Sciweavers

FUN
2010
Springer

Symmetric Monotone Venn Diagrams with Seven Curves

14 years 5 months ago
Symmetric Monotone Venn Diagrams with Seven Curves
An n-Venn diagram consists of n curves drawn in the plane in such a way that each of the 2n possible intersections of the interiors and exteriors of the curves forms a connected non-empty region. A k-region in a diagram is a region that is in the interior of precisely k curves. A n-Venn diagram is symmetric if it has a point of rotation about which rotations of the plane by 2π/n radians leaves the diagram fixed; it is polar symmetric if it is symmetric and its stereographic projection about the infinite outer face is isomorphic to the projection about the innermost face. A Venn diagram is monotone if every k-region is adjacent to both some (k − 1)region (if k > 0) and also to some k+1 region (if k < n). A Venn diagram is simple if at most two curves intersect at any point. We prove that the “Gr¨unbaum ” encoding uniquely identifies monotone simple symmetric n-Venn diagrams and describe an algorithm that produces an exhaustive list of all of the monotone simple symmetri...
Tao Cao, Khalegh Mamakani, Frank Ruskey
Added 19 Jul 2010
Updated 19 Jul 2010
Type Conference
Year 2010
Where FUN
Authors Tao Cao, Khalegh Mamakani, Frank Ruskey
Comments (0)