Lumbar-Spine
发表于 2025-3-25 06:35:15
Mahlon M. Day what could be claimed. The book thus far has done its utmost to suspend judgement or definition of this entity called Literature, apart from the belief that something as vague as artistic (literary) intention (no matter where located) is a prerequisite to discuss Literature (Art).
gonioscopy
发表于 2025-3-25 11:14:01
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PLIC
发表于 2025-3-25 11:58:18
Mahlon M. Dayng. argues that the director creates a type of knowledge, ‘reward’ and ‘resonant experience’ (G. Gabrielle Starr) through instinctive and expert choices.. . .978-1-349-68105-1978-1-137-40767-2
scrape
发表于 2025-3-25 16:13:52
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体贴
发表于 2025-3-25 23:26:21
Normed Linear Spaces,Each of the function spaces mentioned in the introduction of the preceding chapter has (with one exception, . (.)) a norm ║ ║ which defines the topology of major interest in the space; a neighborhood basis of a point . is the family of sets {.: ║.−.║ ≤ .} where . > 0.
demote
发表于 2025-3-26 03:47:29
Completeness, Compactness, and Reflexivity,In a metric space we have characterized completeness in terms of sequences; in general this does not suffice and we need to use —
Range-Of-Motion
发表于 2025-3-26 04:27:06
Unconditional Convergence and Bases,We shall be interested in applications mainly in weak and norm topologies of a Banach space, but first we describle several possible forms of convergence of a series . of elements of an LCS ..
Manifest
发表于 2025-3-26 09:15:40
Compact Convex Sets and Continuous Function Spaces,The present section is concerned with a cycle of theorems in all of which D. I. . had a part. They were originally stated for the .*-topology of a conjugate space, but the proofs adapt without difficulty to locally convex spaces.
ALE
发表于 2025-3-26 14:28:49
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pantomime
发表于 2025-3-26 17:06:41
Metric Geometry in Normed Spaces,Banach’s book, p. 160, gives a theorem of . and . that .. This is true only for real-linear spaces, and is proved by characterizing the midpoint of a segment in a normed space in terms of the distance function. Using the same proof a slightly stronger result can be attained.