normed

Each square term is a normed distance, depicting the energy of the symbol.

Two, a nationally normed student achievement test, administered by a certified teacher.

This is the standard topology on any normed vector space.

It is not specifically the inner product on a normed vector space.

In the case of a normed vector space, the statement is:

In other words, this dual of a normed space over a complete field is necessarily complete.

The open and closed balls in a normed vector space are balanced sets.

Every inner product space is also a normed space.

The time to digital converter needs fast rising edges with normed height.

Measures of non-compactness are most commonly used if M is a normed vector space.

Let be a family of random functions defined from , where is any normed metric space.

For this reason, not every scalar product space is a normed vector space.

Let be a normed space with norm .

Normed vector spaces are central to the study of linear algebra and functional analysis.

Of special interest are complete normed spaces called Banach spaces.

Not every linear operator between normed spaces is bounded.

Any linear operator defined on a finite-dimensional normed space is bounded.

Kadets also made several contributions to the theory of finite-dimensional normed spaces.

A (real or complex) linear space endowed with a norm is a normed space.

Much of his work concerns the theory of normed spaces and convex geometry.

The answer is no (see normed division algebras).

He was one of the first mathematicians to apply normed vector spaces in numerical analysis.

If R is a normed ring, then the condition of row or column finiteness can be relaxed.

A Banach space is a complete normed space.

The idea of normed vector space was in the air, and in the 1920s Banach created functional analysis.