Results 11 to 20 of about 2,930,586 (273)
Interpolating Sequences for Besov Spaces
Journal of Functional Analysis, 2002 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
B. Böe
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Complete interpolating sequences for Paley-Wiener spaces and Muckenhoupt's $(A_p)$ condition [PDF]
, 1995 We describe the complete interpolating sequences for the Paley-Wiener spaces Lpp (1 < p < 8) in terms of Muckenhoupt's (Ap) condition. For p = 2, this description coincides with those given by Pavlov [9], Nikol'skii [8] and Minkin [7] of the ...
Yurii Lyubarskii, Kristian Seip
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Complete interpolating sequences for the Gaussian shift-invariant space [PDF]
Applied and Computational Harmonic Analysis, 2021 Anton Baranov +2 more
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Interpolating sequences for the Bergman space. [PDF]
Michigan Mathematical Journal, 1994 The main results of the paper. Theorem A. Suppose \(A = \{a_ n\}\) is a sequence of interpolation for \(L^ 2_ a (\mathbb{D})\) -- the Bergman Space. Then there exists a unique sequence \(\{t_ n\}\) in \(L^ 2_ a (\mathbb{D})\) such that the kernel function \(K_ A (z,w)\) admits the following partial fraction expansion \[ K_ A (z,w) = (1-z \overline w)^{-
Ke Zhu
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Sequences interpolating some geometric inequalities [PDF]
Creative Mathematics and Informatics, 2019 Using the geometric dynamic of an iterative process (Theorem 2.1), we obtain refinements to some famous geometric inequalities in a triangle by constructing interpolating sequences.
Dorin Andrica, Ştefan Marinescu
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Asymptotic Interpolating Sequences in Uniform Algebras
Journal of the London Mathematical Society, 2003 Let \(A\) be a uniform algebra. A sequence \(S= \{x_n: n\in \mathbb{N}\}\) of distinct points in the spectrum \(M(A)\) of \(A\) is called asymptotically interpolating if for every \((a_n)\in \ell^\infty\) there exists a function \(f\in A\) such that \(| f(x_n)- a_n|\to 0\) as \(n\to\infty\).
P. Gorkin, R. Mortini
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Interpolating sequences on uniform algebras
Topology, 2009 AbstractWe consider the problem of whether a given interpolating sequence for a uniform algebra yields linear interpolation. A positive answer is obtained when we deal with dual uniform algebras. Further we prove that if the Carleson generalized condition is sufficient for a sequence to be interpolating on the algebra of bounded analytic functions on ...
Pablo Galindo +2 more
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Interpolation sequences revisited [PDF]
2011 Design, Automation & Test in Europe, 2011 This work revisits the formulation of interpolation sequences, in order to better understand their relationships with Bounded Model Checking and with other Unbounded Model Checking approaches relying on standard interpolation. We first focus on different Bounded Model Checking schemes (bound, exact and exact-assume), pointing out their impact on the ...
CABODI, Gianpiero +2 more
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Polynomial Interpolation on Sequences
Mathematica Pannonica, 2022 This short note deals with polynomial interpolation of complex numbers verifying a Lipschitz condition, performed on consecutive points of a given sequence in the plane. We are interested in those sequences which provide a bound of the error at the first uninterpolated point, depending only on its distance to the last interpolated one.
Tugores, Francesc, Tugores, Laia
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