Answer in Search of a Question

Davis, Chandler
June 2010
Mathematical Intelligencer;Jun2010, Vol. 32 Issue 2, p3
Academic Journal
A drawing of embeddings in the plane triangular lattice of the smallest planar graph is presented.


Related Articles

  • Graph Embeddings and Simplicial Maps. Heath, L. S. // Theory of Computing Systems;1997, Vol. 30 Issue 1, p51 

    Analyzes the embedding of a unidirected graph in another graph. Lower bounds on dilation for various guest and host graphs; Extension of the lower bounds in two directions; Bidecomposability.

  • Consistency of V = HOD with the wholeness axiom. Corazza, Paul // Archive for Mathematical Logic;2000, Vol. 39 Issue 3, p219 

    Abstract. The Wholeness Axiom (WA) is an axiom schema that can be added to the axioms of ZFC in an extended language {is an element of, j}, and that asserts the existence of a nontrivial elementary embedding j : V Arrow right V. The well-known inconsistency proofs are avoided by omitting from...

  • Il primo amore non si scorda mai or an up-to-date survey of small embeddings for partial even-cycle systems. C. Lindner, Charles // Journal of Geometry;2003, Vol. 76 Issue 1/2, p183 


  • Embedding Complete Binary Trees into Star and Pancake Graphs. Bouabdallah, A.; Heydemann, M. C.; Opatrny, J.; Sotteau, D. // Theory of Computing Systems;1998, Vol. 31 Issue 3, p279 

    Let G and H be two simple undirected graphs. An embedding of the graph G into the graph H is an injective mapping � from the vertices of G to the vertices of H. The dilation of the embedding is the maximum distance between f(u), f(v) taken over all edges (u, u) of G. We give a construction...

  • Representations of Locally Inverse-Semigroups II. Imaoka, Teruo; Katsura, Masashi // Semigroup Forum;1997, Vol. 55 Issue 2, p247 

    As a generalization of the Preston-Vagner Representation Theorem, Imaoka, Inata and Yokoyama [6] gave a representation of a locally inverse *-semigroup S by using the L-classes of S. In this paper, we shall change our point of view from L-classes to R-classes, and obtain another representation,...

  • Embeddings of Finite Distributive Lattices into Products of Chains. Rebecca N., Larson // Semigroup Forum;1998, Vol. 56 Issue 1, p70 

    A theory of infinite distributive lattices has been developed by Gierz and Stralka. As a result of a theorem by Dilworth, a distributive lattice of breadth n can be embedded, typically in many ways, into a product of n chains. Gierz and Stralka showed that in the infinite case there is one...

  • Embedding Locally Compact Semigroups into Groups. Ka-Sing Lau; Lawson, Jimmie; Wei-Bin Zeng // Semigroup Forum;1998, Vol. 57 Issue 2, p151 

    Examines the embedding of locally compact semigroups into groups. Definition of a semitopological semigroup; Background on several embedding theorems; Numerical representations of conditions for group embeddability of a semigroup.

  • Remarques sur les théorèmes d'immersion de Hahn et Hausdorff et sur les corps de séries formelles. Esterle, J // Quarterly Journal of Mathematics;Jun2000, Vol. 51 Issue 2 

    We give a short proof of the Hausdorff-Sierpinski embedding theorem for linearly ordered sets and of the existence of inverses for nonzero elements of Hahn's rings of formal series. We also give a new proof and an improved version of Hahn's embedding theorem for linearly ordered groups.

  • On the Analogue of Veech's Theorem in the WAP -compactification of a Locally Compact Group. Baker, J. W.; Filali, M. // Semigroup Forum;2002, Vol. 65 Issue 1, p107 

    Let G be a nomcompact locally compact group with an identity e and let UG be the LUC-compactification of G. Veech's theorem asserts that gx and x are distinct in UG whenever g is an element in G other than e. We study the analogue of this theorem in the WAP-compactification of G.


Read the Article


Sorry, but this item is not currently available from your library.

Try another library?
Sign out of this library

Other Topics