Analytic surfaces in C^2 and their local hull of holomorphy

@inproceedings{Moser1985AnalyticSI,
  title={Analytic surfaces in C^2 and their local hull of holomorphy},
  author={J. K. Moser},
  year={1985}
}
a) We consider real analylic surfaces M (i.e. dim*M:2) in C2. Two such surfaces M, ft are called equivalent if they can be mapped into each olher by a mapping which is biholomorphic in the complex struc"ture of C2. Actually, we are concerned only with local equivalence which refers to the neighbourhood of a point pofM. One has to distinguish points p for which the tangent space T.M:V is a complex line (i.e. V:iV) and those for which Z is totally real (i.e. V)|V:(O)). Points of the second type… 
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