Integral representations for some weighted classes of functions holomorphic in matrix domains
M. M. Djrbashian ; A. H. Karapetyan
Annales Polonici Mathematici, Tome 55 (1991), p. 87-94 / Harvested from The Polish Digital Mathematics Library

In 1945 the first author introduced the classes Hp(α), 1 ≤ p<∞, α > -1, of holomorphic functions in the unit disk with finite integral (1) ∬ |f(ζ)|p (1-|ζ|²)α dξ dη < ∞ (ζ=ξ+iη) and established the following integral formula for fHp(α): (2) f(z) = (α+1)/π ∬ f(ζ) ((1-|ζ|²)α)/((1-zζ̅)2+α) dξdη, z∈ . We have established that the analogues of the integral representation (2) hold for holomorphic functions in Ω from the classes Lp(Ω;[K(w)]αdm(w)), where: 1) Ω=w=(w,...,wn)n:Imw>k=2n|wk|², K(w)=Imw-k=2n|wk|²; 2) Ω is the matrix domain consisting of those complex m × n matrices W for which I(m)-W·W* is positive-definite, and K(W)=det[I(m)-W·W*]; 3) Ω is the matrix domain consisting of those complex n × n matrices W for which ImW=(2i)-1(W-W*) is positive-definite, and K(W) = det[Im W]. Here dm is Lebesgue measure in the corresponding domain, I(m) denotes the unit m × m matrix and W* is the Hermitian conjugate of the matrix W.

Publié le : 1991-01-01
EUDML-ID : urn:eudml:doc:262402
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     title = {Integral representations for some weighted classes of functions holomorphic in matrix domains},
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     year = {1991},
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M. M. Djrbashian; A. H. Karapetyan. Integral representations for some weighted classes of functions holomorphic in matrix domains. Annales Polonici Mathematici, Tome 55 (1991) pp. 87-94. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-apmv55z1p87bwm/

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