Quasinorm
In linear algebra, functional analysis and related areas of mathematics, a quasinorm is similar to a norm in that it satisfies the norm axioms, except that the triangle inequality is replaced by
for some
This is not to be confused with a seminorm or pseudonorm, where the norm axioms are satisfied except for positive definiteness.
Related concepts
A vector space with an associated quasinorm is called a quasinormed vector space.
A complete quasinormed vector space is called a quasi-Banach space.
A quasinormed space is called a quasinormed algebra if the vector space A is an algebra and there is a constant K > 0 such that
for all .
A complete quasinormed algebra is called a quasi-Banach algebra.
See also
References
- Aull, Charles E.; Robert Lowen (2001). Handbook of the History of General Topology. Springer. ISBN 0-7923-6970-X.
- Conway, John B. (1990). A Course in Functional Analysis. Springer. ISBN 0-387-97245-5.
- Nikolʹskiĭ, Nikolaĭ Kapitonovich (1992). Functional Analysis I: Linear Functional Analysis. Encyclopaedia of Mathematical Sciences 19. Springer. ISBN 3-540-50584-9.
- Swartz, Charles (1992). An Introduction to Functional Analysis. CRC Press. ISBN 0-8247-8643-2.
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