2015

Fasciculi Mathematici

Rocznik: 2015 | Numer: nr 54

artykuł naukowy

angielski

EN Let I = (0, ∞) with the usual topology and product as max multiplication. Then I becomes a locally compact topological semigroup. Let X be a Banach Space. Let L₁(I, X) be the Banach space of X-valued measurable functions ƒ such that ʃ₀^∞ǁƒ (t)ǁdt < ∞. If ƒ ϵ L₁(I) and g ϵ L₁(I, X), we define ƒ* g(s) = ƒ (s) ʃ₀^s g(t)dt + g(s) ʃ₀^s ƒ (t)dt. It turns out that ƒ * g ϵ L₁(I, X) and L₁(I, X) becomes an L₁ (I)-Banach module. A bounded linear operator T on L₁ (I, X) is called a multiplier of L₁ (I, X) if T(ƒ * g) = ƒ * Tg for all ƒ ϵ L₁ (I) and g ϵ L₁ (I, X). We characterize the multipliers of L₁ (I, X) in terms of operator valued measures with point-wise finite variation and give an easy proof of some results of Tewari[12].

41 - 58

10.1515/fascmath-2015-0003

CC BY-NC-ND (uznanie autorstwa - użycie niekomercyjne - bez utworów zależnych)

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