The Geometer's Toolkit to String Compactifications

· 2007 · hep-th · arXiv 0706.1310

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abstract

These lecture notes are meant to serve as an introduction to some geometric constructions and techniques (in particular the ones of toric geometry) often employed by the physicist working on string theory compactifications. The emphasis is wholly on the geometry side, not on the physics. The treated topics include toroidal orbifolds, methods of toric geometry, desinglularization of toroidal orbifolds and their orientifold quotients.

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A note on the holographic consistency of DGKT-type vacua with $h^{2,1}=0$

hep-th · 2026-06-29 · unverdicted · novelty 4.0

Cancellations that satisfy a holographic three-point function constraint in DGKT vacua persist across examples with h^{2,1}=0 and more complicated triple-intersection numbers.

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A note on the holographic consistency of DGKT-type vacua with $h^{2,1}=0$ hep-th · 2026-06-29 · unverdicted · none · ref 62 · internal anchor
Cancellations that satisfy a holographic three-point function constraint in DGKT vacua persist across examples with h^{2,1}=0 and more complicated triple-intersection numbers.

The Geometer's Toolkit to String Compactifications

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