Here one is working with a vector space over the complex numbers.

It is true that every vector space has a basis.

See vector space for the definitions of terms used on this page.

Perhaps the most important example of a vector space is the following.

Let to be a basis of as an vector space.

The Lie group acts on the vector space in a natural way.

Let S be a vector space over the real numbers, or, more generally, some ordered field.

One must also consider the type of field over which the vector space is defined.

Then, the complex numbers themselves clearly form a vector space.

Let V be any vector space over the complex numbers.

A lot of people get nauseated during the transitions between Armstrong and linear space, but it seems to hit me especially hard.

Chase brought us out into linear space at a sharp angle to the plane of the planetary system, within about ten days travel time.

A cipher with no weak keys is said to have a flat, or linear, key space.

A linear space is a basic structure in incidence geometry.

The table below shows all possible nontrivial linear spaces of five points.

It can be a thin linear space cutting next to buildings.

I don't know, though, if we could go this fast even with the linear space drive.

The following example is neither a hypersurface, nor a linear space, nor a single point.

A peripheral linear open space, like a street thus connects the major part of the complex.

This might come from his influence of Mondrian's use of linear space.