TITLE

COMPACTLY SUPPORTED HAMILTONIAN LOOPS WITH A NON-ZERO CALABI INVARIANT

AUTHOR(S)
KISLEV, ASAF
PUB. DATE
January 2014
SOURCE
Electronic Research Announcements in Mathematical Sciences;2014, Vol. 21, p80
SOURCE TYPE
Academic Journal
DOC. TYPE
Article
ABSTRACT
We give examples of compactly supported Hamiltonian loops with a non-zero Calabi invariant on certain open symplectic manifolds.
ACCESSION #
96805931

 

Related Articles

  • The Nakayama Automorphism of the Almost Calabi-Yau Algebras Associated to SU(3) Modular Invariants. Evans, David; Pugh, Mathew // Communications in Mathematical Physics;May2012, Vol. 312 Issue 1, p179 

    We determine the Nakayama automorphism of the almost Calabi-Yau algebra A associated to the braided subfactors or nimrep graphs associated to each SU(3) modular invariant. We use this to determine a resolution of A as an A- A bimodule, which will yield a projective resolution of A.

  • Calabi-Yau Manifolds in Biology and Biological String-Brane Theory. Yi-Fang Chang // NeuroQuantology;Dec2015, Vol. 13 Issue 4, p465 

    Based on topological biology and structural biology, and combined the extensive quantum biology and general biological string, we propose that Calabi-Yau manifolds can provide a mathematical method to be applied to biology. Some Calabi-Yau spaces may possibly describe the biological spatial...

  • A Simple Proof of Gopakumar-Vafa Conjecture for Local Toric Calabi-Yau Manifolds. Peng, Pan // Communications in Mathematical Physics;Nov2007, Vol. 276 Issue 2, p551 

    We prove Gopakumar-Vafa conjecture for local toric Calabi-Yau manifolds. It is also proven that the local Gopakumar-Vafa invariants of a given class vanish at large genera.

  • On Elevating Free-Fermion Z[sub 2]×Z[sub 2] Orbifolds Models to Compactifications of F Theory. Berglund, P.; Ellis, J.; Faraggi, A. E.; Nanopoulos, D. V.; Qiu, Z. // International Journal of Modern Physics A: Particles & Fields; G;4/10/2000, Vol. 15 Issue 9, p1345 

    We study the elliptic fibrations of some Calabi-Yau threefolds, including the Z[sub 2] × Z[sub 2] orbifold with (h[sub 1,1], h[sub 2,1]) = (27, 3), which is equivalent to the common framework of realistic free-fermion models, as well as related orbifold models with (h[sub 1,1], h[sub 2,1]) =...

  • Universal Calabi–Yau Algebra: Classification and Enumeration of Fibrations. Anselmo, F.; Ellis, J.; Volkov, G.; Nanopoulos, D. V. // Modern Physics Letters A;3/28/2003, Vol. 18 Issue 10, p699 

    We apply a universal normal Calabi–Yau algebra to the construction and classification of compact complex n-dimensional spaces with SU(n) holonomy and their fibrations. This algebraic approach includes natural extensions of reflexive weight vectors to higher dimensions and a...

  • Constructing models of space-time for superstring theory. Witten, Edward // Physics Today;Jun93, Vol. 46 Issue 6, p93 

    Reviews the book `Calabi-Yau Manifolds: A Bestiary for Physicists,' by Tristan Hubsch.

  • U(1)-invariant special Lagrangian 3-folds in C� and special Lagrangian fibrations. Joyce, Dominic // Turkish Journal of Mathematics;2003, Vol. 27 Issue 1, p99 

    Surveys three papers studying special Lagrangian 3-folds N in C� invariant under the U(1)-action. Definition of calibrated submanifolds; Deformation and obstruction theory for compact SL m-folds in almost Calabi-Yau m-folds; Classification of singular points.

  • Ka¨hler potential of moduli space of Calabi-Yau d-fold embedded in CP[sup d+1]. Sugiyama, Katsuyuki // Journal of Mathematical Physics;Dec2000, Vol. 41 Issue 12 

    We study a Ka¨hler potential K of a one parameter family of a Calabi-Yau d-fold embedded in CP[sup d+1]. By comparing results of the topological B-model and the data of the conformal field theory (CFT) calculation at a Gepner point, the K is determined unambiguously. It has a moduli parameter...

  • Unobstuctedness of Calabi--Yau orbi-Kleinfolds. Ran, Z. // Journal of Mathematical Physics;Jan1998, Vol. 39 Issue 1, p625 

    Demonstrates the unobstructed deformations of Calabi-Yau spaces with certain type of hypersurface-quotient singularities. Application of deformation to all Calabi-Yau orbifolds nonsingular in codimension 2; Consideration of the extension of the theorem to the case of singular X.

Share

Read the Article

Courtesy of THE LIBRARY OF VIRGINIA

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

Try another library?
Sign out of this library

Other Topics