A projective Dirac operator on CP^2 within fuzzy geometry

Published 2 Nov 2010 in hep-th, math-ph, and math.MP | (1011.0647v3)

Abstract: We propose an ansatz for the commutative canonical spin_c Dirac operator on CP² in a global geometric approach using the right invariant (left action-) induced vector fields from SU(3). This ansatz is suitable for noncommutative generalisation within the framework of fuzzy geometry. Along the way we identify the physical spinors and construct the canonical spin_c bundle in this formulation. The chirality operator is also given in two equivalent forms. Finally, using representation theory we obtain the eigenspinors and calculate the full spectrum. We use an argument from the fuzzy complex projective space CP^2_F based on the fuzzy analogue of the unprojected spin_c bundle to show that our commutative projected spin_c bundle has the correct SU(3)-representation content.