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Sigma Models on Flags

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arxiv 1809.10604 v3 pith:KJUMZCF7 submitted 2018-09-27 hep-th cond-mat.str-el

Sigma Models on Flags

classification hep-th cond-mat.str-el
keywords modelcaseflagmathbbmodelsparameterssigmaspecial
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We study (1+1)-dimensional non-linear sigma models whose target space is the flag manifold $U(N)\over U(N_1)\times U(N_2)\cdots U(N_m)$, with a specific focus on the special case $U(N)/U(1)^{N}$. These generalize the well-known $\mathbb{CP}^{N-1}$ model. The general flag model exhibits several new elements that are not present in the special case of the $\mathbb{CP}^{N-1}$ model. It depends on more parameters, its global symmetry can be larger, and its 't Hooft anomalies can be more subtle. Our discussion based on symmetry and anomaly suggests that for certain choices of the integers $N_I$ and for specific values of the parameters the model is gapless in the IR and is described by an $SU(N)_1$ WZW model. Some of the techniques we present can also be applied to other cases.

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  1. On the Schubert calculus of the quantum K-theory for partial flag manifolds: a 3d A-model perspective

    hep-th 2026-06 unverdicted novelty 6.0

    Computes 2- and 3-point functions of Schubert line defects in 3d A-model for partial flag manifolds Fl(k;n) to obtain K-theoretic Littlewood-Richardson coefficients, with small-beta limit recovering 2d quantum cohomology.