Compact quotients with positive algebraic dimensions of large domains in a complex projective 3-space
Compact quotients with positive algebraic dimensions of large domains in a complex projective 3-space
A domain in a complex 3-dimensional projective space is said to be large, if the domain contains a line, i.e., a projective linear subspace of dimension one. We study compact complex 3-manifolds defined as non-singular quotients of large domains. Any holomorphic automorphism of a large domain becomes an element of …