Norm (mathematics)/Related Articles: Difference between revisions

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Banach space [r]: A vector space endowed with a norm that is complete. ^[e]
Bounded set [r]: A set for which there is a constant C such that the norm of all elements in the set is less than C. ^[e]
Closed set [r]: In geometry and topology, a set that contains its boundary; the complement of an open set. ^[e]
Holomorphic function [r]: Function $f$ from $A\subseteq \mathbb {C}$ to $B\subseteq \mathbb {C}$ is called holomorphic in domain $A$ if for every open domain $E\subseteq A$ there exist derivative $f'(z)~\forall ~z\in E$ . ^[e]
Inner product [r]: A bilinear or sesquilinear form on a vector space generalising the dot product in Euclidean spaces. ^[e]
Metric space [r]: Any topological space which has a metric defined on it. ^[e]
Normed space [r]: A vector space that is endowed with a norm. ^[e]
Number theory [r]: The study of integers and relations between them. ^[e]

Vector (disambiguation) [r]: Add brief definition or description
Linear combination [r]: Expression of first order, composed of the sums and differences of elements with coefficients in a field, such as the field of real numbers. ^[e]
Complex conjugation [r]: The operation on complex numbers which changes the sign of the imaginary part, x+iy → x-iy ^[e]
Real part [r]: Add brief definition or description
Almost sure convergence [r]: The probability that the given sequence of random variables converges is 1. ^[e]
Structure (mathematical logic) [r]: A set along with a collection of finitary functions and relations which are defined on it. ^[e]

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+==Articles related by keyphrases (Bot populated)==
+{{r|Vector (disambiguation)}}
+{{r|Linear combination}}
+{{r|Complex conjugation}}
+{{r|Real part}}
+{{r|Almost sure convergence}}
+{{r|Structure (mathematical logic)}}