Trace decategorification of categorified quantum sl(2)

Abstract

The trace or the 0th Hochschild--Mitchell homology of a linear category C may be regarded as a kind of decategorification of C. We compute traces of the two versions U and U* of categorified quantum sl2 introduced by the third author. One version of the trace coincides with the split Grothendieck group K0(U), which is known to be isomorphic to the the integral idempotented form U(sl2) of quantum sl(2). The higher Hochschild--Mitchell homology in this case is zero. The trace of the second version is isomorphic to the idempotented integral form of the current algebra U(sl2[t]).