Natalia Saulina scite author profile

We count the number of bound states of BPS black holes on local Calabi-Yau threefolds involving a Riemann surface of genus g. We show that the corresponding gauge theory on the brane reduces to a q-deformed Yang-Mills theory on the Riemann surface. Following the recent connection between the black hole entropy and the topological string partition function, we find that for a large black hole charge N , up to corrections of O(e −N ), Z BH is given as a sum of a square of chiral blocks, each of which corresponds to a specific D-brane amplitude. The leading chiral block, the vacuum block, corresponds to the closed topological string amplitudes. The sub-leading chiral blocks involve topological string amplitudes with D-brane insertions at (2g − 2) points on the Riemann surface analogous to the Ω points in the large N 2d Yang-Mills theory. The finite N amplitude provides a non-perturbative definition of topological strings in these backgrounds. This also leads to a novel non-perturbative formulation of c = 1 non-critical string at the self-dual radius.

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Monodromies, fluxes, and compact three-generation F-theory GUTs

Marsano

Saulina

Schäfer‐Nameki

2009

J. High Energy Phys.

165

401

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We analyze constraints for embedding local SU(5) F-theory GUTs into consistent compactifications and construct explicit three-generation models based on the geometry of [1]. The key tool for studying constraints in this problem when there is an underlying E 8 structure is the spectral cover, which encodes all of the symmetries that fix the allowed couplings in the superpotential, as well as the consistent, supersymmetric G-fluxes. Imposing phenomenological requirements such as the existence of three generations, top and bottom Yukawa couplings, good flavor structure and absence of exotics and of a tree-level µ-term, we derive stringent constraints on the allowed spectral covers. The resulting spectral covers are in conflict with the neutrino scenarios that have been studied in local F-theory models unless we allow for the possibility of additional charged fields, perhaps playing the role of gauge messengers, that do not comprise complete GUT multiplets. Quite remarkably, the existence of additional incomplete GUT multiplets below the GUT scale is necessary for consistency with gauge coupling "unification", as their effect can precisely cancel that of the internal hypercharge flux, which distorts the gauge couplings already at M GUT .

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Stringy instantons and quiver gauge theories

Florea¹,

Kachru²,

McGreevy³

et al. 2007

J. High Energy Phys.

188

349

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We explore contributions to the 4D effective superpotential which arise from Euclidean D3 branes ("instantons") that intersect space-filling D-branes. These effects can perturb the effective field theory on the space-filling branes by nontrivial operators composed of charged matter fields, changing the vacuum structure in a qualitative way in some examples. Our considerations are exemplified throughout by a careful study of a fractional brane configuration on a del Pezzo surface.

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F-theory compactifications for supersymmetric GUTs

Marsano¹,

Saulina²,

Schäfer‐Nameki³

2009

J. High Energy Phys.

101

268

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We construct a family of elliptically fibered Calabi-Yau four-folds Y 4 for F-theory compactifications that realize SU(5) GUTs in the low-energy limit. The three-fold base X 3 of these fibrations is almost Fano and satisfies the topological criteria required to ensure that the U(1) Y gauge boson remains massless, while allowing a decoupling of GUT and Planck scale physics. We study generic features of these models and the ability to engineer three chiral generations of MSSM matter. Finally, we demonstrate that it is relatively easy to implement the topological conditions required to reproduce certain successful features of local F-theory models, such as the emergence of flavor hierarchies.

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Topological boundary conditions in abelian Chern–Simons theory

2011

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We study topological boundary conditions in abelian Chern-Simons theory and line operators confined to such boundaries. From the mathematical point of view, their relationships are described by a certain 2-category associated to an even integer-valued symmetric bilinear form (the matrix of Chern-Simons couplings). We argue that boundary conditions correspond to Lagrangian subgroups in the finite abelian group classifying bulk line operators (the discriminant group). We describe properties of boundary line operators; in particular we compute the boundary associator. We also study codimension one defects (surface operators) in abelian Chern-Simons theories. As an application, we obtain a classification of such theories up to isomorphism, in general agreement with the work of

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Natalia Saulina

Black holes, q-deformed 2d Yang–Mills, and non-perturbative topological strings

Monodromies, fluxes, and compact three-generation F-theory GUTs

Stringy instantons and quiver gauge theories

F-theory compactifications for supersymmetric GUTs

Topological boundary conditions in abelian Chern–Simons theory

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