The standard complex space is a Stein manifold.

Some will be opened up to create diverse, complex and idiosyncratic open spaces, others are kept as underground features.

This is a special case of the Carathéodory metric of any complex space.

This is a special case of the Kobayashi metric defined on any complex space.

A typical problem about an arrangement in complex space is to describe the holes.

This formula is valid for any inner product space, including Euclidean and complex spaces.

Many of those parties backed out when they began to understand how complex the space would be to live in and restore.

It's a real, complex space that we don't just see but come to virtually inhabit.

The distance Study refers to is a Hermitian form on complex projective space.

This description generalizes to complex projective space of higher dimension.