Results 81 to 90 of about 277 (127)
Let Δ = {z│ │z│ < 1} be the unit disk and f an analytic function in Δ. The Dirichlet integral DΔ(f) of f on Δ is defined byand we denote by AD(Δ) the space of all functions f analytic on Δ for which DΔ(f) < ∞.
Rauno Aulaskari
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Tangential characterizations of BMOA on strictly pseudoconvex domains.
Let \(\Omega\) be a bounded strictly pseudoconvex domain in \(\mathbb{C}^ n\) with \(C^ \infty\) boundary which has the special finite covering by open balls. The author receives a criterion of belonging of a function \(F \in H^ 2 (\Omega)\) to BMOA in terms of Carleson measure. In contrast to the similar result of Fefferman and Stein this theorem uses
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ON THE FRACTIONAL DERIVATIVE OF FUNCTIONS IN WEIGHTED H p AND BMOA
. We introduce fractional derivative for functions in weighted H p and weighted BMOA (see[17]). We give necessary and sufficient conditions on the weights such that the radial limits exist for all functions and their fractional derivatives in the star ...
I. Paulsen, Communicated Vern
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Pointwise multipliers from Dirichlet type spaces Dτ to Qp spaces in the unit ball of Cn∗
In this paper, the pointwise multipliers M(Dτ,Qp) and M(Dτ,Qp,0) are characterized in the unit ball of Cn for the values of τ,p in the three cases: (i ...
Ouyang, Caiheng, Peng, Ru
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The Bloch space and BMO analytic functions in the tube over the spherical cone
We prove that the Bloch space coincides with the space BMOA in the tube over the spherical cone of R 3 {{\mathbf {R}}^3} ; this extends a well-known one ...
David Békollé
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Automatic identification of epileptic EEG signals through binary magnetic optimization algorithms
Epilepsy is a class of chronic neurological disorders characterized by transient and unexpected electrical disturbances of the brain. The automated analysis of the electroencephalogram (EEG) signal can be instrumental for the proper diagnosis of this ...
Clodoaldo A. M. Lima +13 more
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MÖBIUS INVARIANT Qp SPACES ASSOCIATED WITH THE GREEN’S FUNCTION ON THE UNIT BALL OF C n
In this paper, function spaces Qp(B) and Qp,0(B), associated with the Green’s function, are defined and studied for the unit ball B of C n. We prove that Qp(B) and Qp,0(B) are Möbius invariant Banach spaces and that Qp(B) = Bloch(B),Qp,0(B) = B0(B) (the
Caiheng Ouyang +2 more
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NORMAL LIMITS AND STAR-INVARIANT SUBSPACES OF BOUNDED MEAN OSCILLATION IN MULTIPLY CONNECTED DOMAINS
. Let D be a domain in the plain bounded by n+1 analytic Jordan curves. Let H 2 be the usual Hardy class of analytic functions in D. Denote by BMOA the space of analytic functions of bounded mean oscillation in D and let K2 be the star-invariant subspace
R. Davidson +2 more
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POINTWISE MULTIPLIERS FROM WEIGHTED BERGMAN SPACES AND HARDY SPACES TO WEIGHTED BERGMAN SPACES
Pointwise multipiers from weighted Bergman spaces and Hardy spaces to weighted Bergman spaces are characterized by using Bloch type spaces, BMOA type spaces, weighted Bergman spaces and tent ...
Zhao, Ruhan, Ruhan Zhao
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A geometric condition which implies BMOA.
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