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Page 21
... dense in a topological space X , if its closure is X. It is said to be nowhere dense if its closure does not contain any open set . A space is separable , if it contains a denumer- able dense set . 12 THEOREM . If a topological space ...
... dense in a topological space X , if its closure is X. It is said to be nowhere dense if its closure does not contain any open set . A space is separable , if it contains a denumer- able dense set . 12 THEOREM . If a topological space ...
Page 450
... dense subset of its boundary . - PROOF . Let K be the convex set . It will be shown that -7 ( x , y ) T ( x , −y ) , y € X , for a in a dense subset Z of X. The set K contains some sphere S ( 0 , 1 / N ) about the origin . This clearly ...
... dense subset of its boundary . - PROOF . Let K be the convex set . It will be shown that -7 ( x , y ) T ( x , −y ) , y € X , for a in a dense subset Z of X. The set K contains some sphere S ( 0 , 1 / N ) about the origin . This clearly ...
Page 842
... Dense convex sets , V.7.27 ( 437 ) Dense linear manifolds , V.7.40-41 ( 438-439 ) Dense set , definition , 1.6.11 ( 21 ) density of simple functions in L ,, 1 ≤ p < ∞ , III.3.8 ( 125 ) density of continuous functions in TM and L ...
... Dense convex sets , V.7.27 ( 437 ) Dense linear manifolds , V.7.40-41 ( 438-439 ) Dense set , definition , 1.6.11 ( 21 ) density of simple functions in L ,, 1 ≤ p < ∞ , III.3.8 ( 125 ) density of continuous functions in TM and L ...
Contents
8 | 28 |
Algebraic Preliminaries | 34 |
Three Basic Principles of Linear Analysis | 49 |
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A₁ additive set function algebra Amer analytic arbitrary B-space ba(S Banach Borel sets ca(S Cauchy sequence compact Hausdorff space compact operator complex numbers contains continuous functions converges convex set Corollary countably additive DEFINITION dense differential disjoint Doklady Akad E₁ element equation exists f₁ finite dimensional function defined function f Hausdorff space Hence Hilbert space homeomorphism implies inequality integral isometric isomorphism L₁ L₁(S Lebesgue Lemma Let f linear map linear operator linear topological space Math measurable functions measure space metric space Nauk SSSR N. S. neighborhood non-negative normed linear space o-field o-finite open set operator topology positive measure space Proc PROOF properties proved real numbers Riesz S₁ scalar semi-group sequentially compact Show subset subspace Suppose theory TM(S topological space u-integrable u-measurable uniformly weak topology weakly compact weakly sequentially compact zero ΕΕΣ