Search results with tag "Kuratowski"
Fubini's theorem - University of Washington
sites.math.washington.eduKuratowski-Ulam theorem The Kuratowski-Ulam theorem, named after Polish mathematicians Kazimierz Kuratowski and Stanisław Ulam, called also Fubini theorem for category, is a similar result for arbitrary second countable Baire spaces. Let X and Y be second countable Baire spaces (or, in particular, Polish spaces), and . Then the following are
Math 228: Kuratowski’s Theorem
www.math.cmu.edu3 Kuratowski’s Theorem: Setup We begin this section just by restating the theorem from the beginning of the introduction, to remind ourselves what we are doing here. Theorem 1 (Kuratowski’s Theorem). Let G be a graph. Then G is nonplanar if and only if G contains a subgraph that is a subdivision of either K 3;3 or K 5.
A short proof of Kuratowski's graph planarity criterion
ttic.uchicago.eduA Short Proof of Kuratowski’s Graph Planarity Criterion Yury Makarychev DEPARTMENT OF DIFFERENTIAL GEOMETRY FACULTY OF …
The Hahn–Banach theorem - UCL
www.ucl.ac.uk2Zorn’s lemma was first proved by the Polish mathematician Kazimierz Kuratowski (1896–1980) in 1922. It was rediscovered and applied by the German/American mathematician Max Zorn (1906–1993) in 1935. 3. 7. Let V be a vector space, and let …
Planar Graphs - Rutgers University
sites.math.rutgers.eduKuratowski proved \Zorn’s Lemma" rst, 20 years before Zorn had anything to do with it. It is amazing that he descended down to nite planar graph theory and gave it such a gem. 2. 3 Coloring Planar Graphs One of the major stimulants for the study of planar graphs back in the 1800s was the 4-color
The complete graph K4 is planar K5 and K3,3 are not planar
www.jn.inf.ethz.chThm (Kuratowski 1930): G is planar iff G contains no subgraph homeomorphic to K5 or K3,3. Thm (Wagner 1937): G is planar iff G contains no subgraph contractable to K5 or K3,3. Ex: Finding subgraphs can be tricky, as the Petersen graph shows: Left: The Petersen graph is easily seen to be contractable to K5 Right: After removal of 2 edges
GRAPH THEORY WITH APPLICATIONS
www.iro.umontreal.ca9.5 Kuratowski's Theorem . . 151 9.6 The Five-Colour Theorem and the Four-Colour Conjecture 156 9.7 Nonhamiltonian Planar Graphs . 160 Applications 9 .8 A Planarity Algorithm . . 163 . X 10 DIRECTED GRAPHS 10.1 Directed Graphs . 10.2 Directed Paths 10.3 Directed Cycles Applications 10.4 A Job Sequencing Problem. ...