q$-Deformed Chern Class, Chern-Simons and Cocycle Hierarchy

Abstract

In this paper, from the q-gauge covariant condition we define the q-deformed Killing form and the second q-deformed Chern class for the quantum group SUq(2). Developing Zumino's method we introduce a q-deformed homotopy operator to compute the q-deformed Chern-Simons and the q-deformed cocycle hierarchy. Some recursive relations related to the generalized q-deformed Killing forms are derived to prove the cocycle hierarchy formulas directly. At last, we construct the q-gauge covariant Lagrangian and derive the q-deformed Yang-Mills equation. We find that the components of the singlet and the adjoint representation are separated in the q-deformed Chern class, q-deformed cocycle hierarchy and the q-deformed Lagrangian, although they are mixed in the commutative relations of BRST algebra.

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