English

Fields of CR meromorphic functions

Complex Variables 2007-10-29 v1 Algebraic Geometry Analysis of PDEs

Abstract

Let MM be a smooth compact CRCR manifold of CRCR dimension nn and CRCR codimension kk, which has a certain local extension property EE. In particular, if MM is pseudoconcave, it has property EE. Then the field \CalK(M)\Cal K(M) of CRCR meromorphic functions on MM has transcendence degree dd, with dn+kd\leq n+k. If f1,f2,\hdots,fdf_1, f_2, \hdots , f_d is a maximal set of algebraically independent CRCR meromorphic functions on MM, then \CalK(M)\Cal K(M) is a simple finite algebraic extension of the field C(f1,f2,\hdots,fd)\Bbb C(f_1, f_2, \hdots, f_d) of rational functions of the f1,f2,\hdots,fdf_1, f_2, \hdots , f_d. When MM has a projective embedding, there is an analogue of Chow's theorem, and \CalK(M)\Cal K(M) is isomorphic to the field \CalR(Y)\Cal R(Y) of rational functions on an irreducible projective algebraic variety YY, and MM has a CRCR embedding in \romanregY\roman{reg} Y. The equivalence between algebraic dependence and analytic dependence fails when condition EE is dropped.

Keywords

Cite

@article{arxiv.0710.5166,
  title  = {Fields of CR meromorphic functions},
  author = {C. Denson Hill and Mauro Nacinovich},
  journal= {arXiv preprint arXiv:0710.5166},
  year   = {2007}
}
R2 v1 2026-06-21T09:37:01.035Z