- In mathematics, a
norm is a
function from a real or
complex vector space to the non-negative real
numbers that
behaves in
certain ways like the distance...
-
Matrix norm, a map that ****igns a
length or size to a
matrix Operator norm, a map that ****igns a
length or size to any
operator in a
function space Norm (abelian...
- In mathematics, the Lp
spaces are
function spaces defined using a
natural generalization of the p-
norm for finite-dimensional
vector spaces. They are sometimes...
-
Sobolev space is a
vector space of
functions equipped with a
norm that is a
combination of Lp-
norms of the
function together with its
derivatives up to...
-
vertical bars (like so: ‖A‖{\displaystyle \|A\|}). Thus, the
matrix norm is a
function ‖⋅‖:Km×n→R{\displaystyle \|\cdot \|:K^{m\times n}\to \mathbb {R} }...
-
Social norms are
shared standards of
acceptable behavior by groups.
Social norms can both be
informal understandings that
govern the
behavior of members...
- In
mathematical analysis, the
uniform norm (or sup
norm) ****igns to real- or complex-valued
bounded functions f{\displaystyle f}
defined on a set S{\displaystyle...
- , the
vector space of
essentially bounded measurable functions with the
essential supremum norm, are two
closely related Banach spaces. In fact the former...
-
terms in
place of "Euclidean
function", such as "degree
function", "valuation
function", "gauge
function" or "
norm function". Some
authors also require...
- a
polynomial over a
field satisfies all of the
requirements of the
norm function in the
euclidean domain. That is,
given two
polynomials f(x) and g(x)...