This has led to the formulation of a notion of stability for objects in a derived category, contact with Kontsevich’s homological mirror symmetry conjecture, and . We present a justification on the conjecture on the mirror construction of D- branes in Aganagic-Vafa [2]. We apply the techniques employed in. PDF | This monograph builds on lectures at the Clay School on Geometry and String Theory that sought to bridge the gap between the languages of string .
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Information References 42 Citations 20 Files Plots. Dirichlet branes, homological mirror symmetry, and stability – Douglas, Michael R. Privacy policy Powered by Invenio v1.
This site jirror also available in the following languages: Calabi-Yau moduli space, mirror manifolds and space-time topology change in string theory – Aspinwall, Paul S. B UTTG Derived categories and zero-brane stability – Aspinwall, Paul S. Unitarity, D-brane dynamics and D-brane categories – Lazaroiu, C. D-brane stability and monodromy – Aspinwall, Paul S.
[math/] Dirichlet branes, homological mirror symmetry, and stability
A Point’s point of view of stringy geometry – Aspinwall, Paul S. Nonlinear instantons from supersymmetric p-branes – Marino, Diriichlet et al. Einstein type metrics and stability on vector bundles – Leung, Naichung Conan J.
Braid group actions on derived categories of coherent sheaves – Seidel, Paul et al. Chern-Simons gauge theory as a string theory – Witten, Edward Prog.
Dirichlet branes, homological mirror symmetry, and stability – INSPIRE-HEP
Massless black holes and conifolds in string theory – Strominger, Andrew Nucl. D-branes in Gepner models – Recknagel, A. Orbifold resolution by D-branes – Douglas, Symmerty R.
K theory and Ramond-Ramond charge – Minasian, Ruben et al. Two lectures on D-geometry and noncommutative geometry – Douglas, Michael R. Kahler cone substructure – Sharpe, Eric R.
Intertwining operator superalgebras and vertex tensor categories for superconformal algebras. On counting special Lagrangian homology three spheres – Joyce, Dominic Contemp.
