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Atiyah--Simger for a Kaehler manifold

I am trying to understand the proof of the Atiyah--Singer index theorem, and would like to see how it works for a "simple" example. Could somebody direct me to a proof for the special case of a Kaehler manifold $(M,g)$ and its Dirac operator $$ (\overline{\partial} + \overline{\partial}^*): \Omega^{0,\bullet} \to \Omega^{0,\bullet}. $$