linear algebra

That does not mean the same thing as in the context of linear algebra.

Such a system is also called inconsistent in the language of linear algebra.

His mother was known for her work in numerical linear algebra.

The study of such objects is sometimes called super linear algebra.

But, for a room with many surfaces, linear algebra and a computer are necessary.

Such rings are the main object of study in linear algebra.

An equivalent formulation in terms of linear algebra is the following.

Jeffrey will have more time to work on linear algebra puzzles!

In linear algebra terms, this can be justified as follows.

The methods are commonly taken from group theory and linear algebra.

Linear algebra talks about functions, which are often called transformations.

Linear algebra is central to both pure and applied mathematics.

As such, these operators may be described via linear algebra techniques.

At the receiver some linear algebra is needed for decoding.

This process is very similar to the use of coordinates vector in linear algebra.

As such, the ideas of linear algebra are employed to study tensors.

Matrix pencils play an important role in numerical linear algebra.

A different part of his day might be spent working on an important and interesting linear algebra puzzle to improve the Pipeline.

Linear algebra is concerned with properties common to all vector spaces.

Below are just some examples of applications of linear algebra.

The domain studying these matters is called numerical linear algebra.

She is best known for early work on linear algebra in infinite dimension, which has later become a part of functional analysis.

It is not the outer product of linear algebra.

The theorem may be illustrated by the following application to linear algebra.

This abstract definition coincides with the one in linear algebra.