Examples of 'banach' in a sentence
Meaning of "banach"
banach (noun) - A type of mathematical space, named after the Polish mathematician Stefan Banach, that is complete with respect to a specific norm. This term is commonly used in functional analysis and mathematical theory
Show more definitions
- being a Banach space
- A surname.
How to use "banach" in a sentence
Basic
Advanced
banach
Banach did more than put things in order.
Uniformly convex banach space.
Banach spaces play a central role in functional analysis.
This is another banach space.
Banach and his recipe.
To do so we first study continuous multilinear mappings and homogeneous polynomials between banach spaces.
Banach manifolds are one possibility of extending manifolds to infinite dimensions.
In this dissertation we present some results of automatic continuity for banach algebras homomorphisms.
Hahn banach extension theorem.
Every uniformly smooth Banach space is reflexive.
Banach contraction mapping principle.
Theorem of existence of inverse operators Banach theorem.
Banach contraction mapping theorem.
Prove that a normed space is not Banach.
Banach is considered one of the most conditioned athletes of all time.
See also
A counterexample to the approximation problem in Banach spaces.
Banach analytic manifold.
Where is the norm on the Banach space.
Banach completely makes it.
Suppose that and are Banach spaces and that.
Banach came up with the idea that you can pick out and name a common feature.
The third property of a Banach space is its completeness.
Banach spaces are a different generalization of Hilbert spaces.
Hypercomplex analysis on Banach algebras is called functional analysis.
A Banach space is a complete normed space.
This is in stark contrast to the situation in Banach spaces.
It is a Banach space where its norm is defined by.
Most of functional analysis is formulated for Banach spaces.
Let be a Banach space and be a normed vector space.
Several concepts of a derivative may be defined on a Banach space.
Being at Banach gave me thetime and space to develop myresearch.
Handbook of the geometry of Banach spaces.
Compact operators on a Banach space are always completely continuous.
It is necessary that the spaces in question be Banach spaces.
We may also define a Banach space version of this theorem.
This applies in particular to separable reflexive Banach spaces.
Quotient of a Banach space by a subspace.
Introduction to the theory of Banach space.
A Banach measure is a type of generalized measure to elide this problem.
Schatten widely studied tensor products of Banach spaces.
The name Banach algebras were also named after him.
Let be a homomorphism between Banach algebras.
This Banach space is the completion of the normed space.
Gelfand representation of a commutative Banach algebra.
Is called a Banach space if it is complete.
One has the isometric isomorphism of Banach spaces.
Banach spaces are much more complicated than Hilbert spaces.
It was hard to outlast or outdrink Banach during these sessions.
We say that the Banach limit is not uniquely determined in this case.
There is an analog of this result for Banach space.
