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❤️ Second Battle of Bull Run 🐰

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❤️ Kuratowski's theorem 🐰

"A subdivision of K3,3 in the generalized Petersen graph G(9,2), showing that the graph is nonplanar. In graph theory, Kuratowski's theorem is a mathematical forbidden graph characterization of planar graphs, named after Kazimierz Kuratowski. It states that a finite graph is planar if and only if it does not contain a subgraph that is a subdivision of K5 (the complete graph on five vertices) or of K3,3 (complete bipartite graph on six vertices, three of which connect to each of the other three, also known as the utility graph). Statement A planar graph is a graph whose vertices can be represented by points in the Euclidean plane, and whose edges can be represented by simple curves in the same plane connecting the points representing their endpoints, such that no two curves intersect except at a common endpoint. Planar graphs are often drawn with straight line segments representing their edges, but by Fáry's theorem this makes no difference to their graph-theoretic characterization. A subdivision of a graph is a graph formed by subdividing its edges into paths of one or more edges. Kuratowski's theorem states that a finite graph G is planar, if it is not possible to subdivide the edges of K5 or K3,3, and then possibly add additional edges and vertices, to form a graph isomorphic to G. Equivalently, a finite graph is planar if and only if it does not contain a subgraph that is homeomorphic to K5 or K3,3. Kuratowski subgraphs If G is a graph that contains a subgraph H that is a subdivision of K5 or K3,3, then H is known as a Kuratowski subgraph of G.. With this notation, Kuratowski's theorem can be expressed succinctly: a graph is planar if and only if it does not have a Kuratowski subgraph. The two graphs K5 and K3,3 are nonplanar, as may be shown either by a case analysis or an argument involving Euler's formula. Additionally, subdividing a graph cannot turn a nonplanar graph into a planar graph: if a subdivision of a graph G has a planar drawing, the paths of the subdivision form curves that may be used to represent the edges of G itself. Therefore, a graph that contains a Kuratowski subgraph cannot be planar. The more difficult direction in proving Kuratowski's theorem is to show that, if a graph is nonplanar, it must contain a Kuratowski subgraph. Algorithmic implications A Kuratowski subgraph of a nonplanar graph can be found in linear time, as measured by the size of the input graph.. This allows the correctness of a planarity testing algorithm to be verified for nonplanar inputs, as it is straightforward to test whether a given subgraph is or is not a Kuratowski subgraph.. Usually, non-planar graphs contain a large number of Kuratowski-subgraphs. The extraction of these subgraphs is needed, e.g., in branch and cut algorithms for crossing minimization. It is possible to extract a large number of Kuratowski subgraphs in time dependent on their total size.. History Kazimierz Kuratowski published his theorem in 1930.. The theorem was independently proved by Orrin Frink and Paul Smith, also in 1930, but their proof was never published. The special case of cubic planar graphs (for which the only minimal forbidden subgraph is K3,3) was also independently proved by Karl Menger in 1930. Since then, several new proofs of the theorem have been discovered.. In the Soviet Union, Kuratowski's theorem was known as either the Pontryagin–Kuratowski theorem or the Kuratowski–Pontryagin theorem, as the theorem was reportedly proved independently by Lev Pontryagin around 1927. However, as Pontryagin never published his proof, this usage has not spread to other places.. Related results A closely related result, Wagner's theorem, characterizes the planar graphs by their minors in terms of the same two forbidden graphs K5 and K3,3. Every Kuratowski subgraph is a special case of a minor of the same type, and while the reverse is not true, it is not difficult to find a Kuratowski subgraph (of one type or the other) from one of these two forbidden minors; therefore, these two theorems are equivalent.. An extension is the Robertson-Seymour theorem. See also *Kelmans–Seymour conjecture, that 5-connected nonplanar graphs contain a subdivision of References Planar graphs Theorems in graph theory "

❤️ Santa (disambiguation) 🐰

"Santa usually refers to Santa Claus, or Father Christmas. Santa (feminine form of saint in various languages) may also refer to: Arts, entertainment, and media *Santa (1932 film), the first Mexican narrative sound film *Santa (1943 film), a Mexican film *Santa (band), a Spanish rock band of the 1980s *Santa (TV series), a 1978 Mexican telenovela Places =Extraterrestrial= *1288 Santa, an asteroid *(obsolete) , a dwarf planet given the in-house nickname "Santa" =Inhabited places= *Santa, Cameroon *Santa, Ghana *Santa, Montagnes, Ivory Coast *Santa, Woroba, Ivory Coast *Santa Province, Peru Santa District Santa, Peru *Santa, Ilocos Sur, Philippines *Santa, now Dumanlı, a district in modern northern Turkey People *José Santa (born 1970), Colombian football player *Santa (given name), feminine given name Other uses *La Santa, a secret criminal society in Italy *Santa, a stock character in Sardarji jokes *Santa F1, a grape tomato marketed by Santa Sweets, Inc. *Santa language, a Mongolic language spoken in northwest China See also *Dear Santa (disambiguation) *My Santa (disambiguation) *Santa Claus (disambiguation) *Santa Claus machine, a fictional machine which can be used to convert materials into anything else *Santa claws (disambiguation) *Santa's Slay, a 2005 Canadian-American Christmas slasher comedy film that stars professional wrestler Bill Goldberg as Santa Claus * Santa with Muscles, a 1996 American Christmas comedy film starring Hulk Hogan *Santo (disambiguation) "

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