✦ LIBER ✦

Lattice homomorphism inequalities for vector valued functions

✍ Scribed by George A. Anastassiou

Publisher: Elsevier Science
Year: 1997
Tongue: English
Weight: 319 KB
Volume: 30
Category: Article
ISSN: 0362-546X
DOI: 10.1016/s0362-546x(96)00227-1

No coin nor oath required. For personal study only.

📜 SIMILAR VOLUMES

A remark on inequalities of Calderon-Zyg

A remark on inequalities of Calderon-Zygmund type for vector-valued functions

✍ J. Schwartz 📂 Article 📅 1961 🏛 John Wiley and Sons 🌐 English ⚖ 626 KB

It is well-known that, by applying standard inequalities to functions with values in an appropriate Banach space, the applicability of these inequalities can often be usefully extended. For this reason, it is noteworthy that, whereas M. Riesz' original proof of his well-known inequality for the

Minimax Inequalities for Vector-Valued M

Minimax Inequalities for Vector-Valued Mappings onW-Spaces

✍ Shih-Sen Chang; Gue Myung Lee; Byung Soo Lee 📂 Article 📅 1996 🏛 Elsevier Science 🌐 English ⚖ 137 KB

Schwarz's lemma for vector-valued analyt

Schwarz's lemma for vector-valued analytic functions

✍ Stephen Fisher 📂 Article 📅 1971 🏛 Elsevier Science 🌐 English ⚖ 450 KB

Inequalities for scalar-valued linear op

Inequalities for scalar-valued linear operators that extend to their vector-valued analogues

✍ Kenneth F Andersen 📂 Article 📅 1980 🏛 Elsevier Science 🌐 English ⚖ 245 KB

Duality for Vector Optimization of Set-V

Duality for Vector Optimization of Set-Valued Functions

✍ Wen Song 📂 Article 📅 1996 🏛 Elsevier Science 🌐 English ⚖ 164 KB

In this note, a general cone separation theorem between two subsets of image space is presented. With the aid of this, optimality conditions and duality for vector optimization of set-valued functions in locally convex spaces are discussed.

A minimax inequality for vector-valued m

A minimax inequality for vector-valued mappings

✍ Z.F. Li; S.Y. Wang 📂 Article 📅 1999 🏛 Elsevier Science 🌐 English ⚖ 220 KB