Complex and Lagrangian surfaces of the complex projective plane via K\"ahlerian Killing Spinc spinors
Abstract
The complex projective space C P2 of complex dimension 2 has a Spinc structure carrying K\"ahlerian Killing spinors. The restriction of one of these K\"ahlerian Killing spinors to a surface M2 characterizes the isometric immersion of M2 into C P2 if the immersion is either Lagrangian or complex.
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