We notice that, for branes wrapped on complex analytic subvarieties, the algebraic-geometric version of K-theory makes the identification between brane-antibrane pairs and lower-dimensional branes automatic. This is because coherent sheaves on the ambient variety represent gauge bundles on subvarieties, and they can be put in exact sequences (projective resolutions) with sheaves corresponding to vector bundles on the pair; this automatically gives a D(p - 2) as a formal difference of bundles on the Dp - D (p) over bar pair, both belonging to the Grothendieck group of coherent sheaves of the ambient
Tomasiello, A. (2002). Projective resolutions of coherent sheaves and descent relations between branes. ADVANCES IN THEORETICAL AND MATHEMATICAL PHYSICS, 4(3), 1-8.
Projective resolutions of coherent sheaves and descent relations between branes
Tomasiello, A
2002
Abstract
We notice that, for branes wrapped on complex analytic subvarieties, the algebraic-geometric version of K-theory makes the identification between brane-antibrane pairs and lower-dimensional branes automatic. This is because coherent sheaves on the ambient variety represent gauge bundles on subvarieties, and they can be put in exact sequences (projective resolutions) with sheaves corresponding to vector bundles on the pair; this automatically gives a D(p - 2) as a formal difference of bundles on the Dp - D (p) over bar pair, both belonging to the Grothendieck group of coherent sheaves of the ambient
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