T. Aliashvili
Abstract:
We deal with complex points of two-dimensional surfaces. A short review of basic
results about complex points of smooth surfaces in $\mathbb{C}^2$ is presented
at the beginning. For algebraic surfaces, a formula is proved which expresses
the number of complex points as the local degree of an explicitly constructible
polynomial endomorphism.
Keywords:
Surface, grassmanian, complex point, Euler characteristic, mapping degree.
MSC 2000: 32S05, 55M25