Representations of copointed Hopf algebras arising from the tetrahedron rack
classification
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algebrasrackcopointedhopfmodulestetrahedronaffinealgebra
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We study the copointed Hopf algebras attached to the Nichols algebra of the affine rack $\Aff(\F_4,\omega)$, also known as tetrahedron rack, and the 2-cocycle -1. We investigate the so-called Verma modules and classify all the simple modules. We conclude that these algebras are of wild representation type and not quasitriangular, also we analyze when these are spherical.
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