Results 201 to 210 of about 4,239 (245)

Targeted blood proteome profiling using NULISAseq identifies a high-performance biomarker panel for Aβ pathology quantification and staging. [PDF]

Alzheimers Dement
Zheng W, Jiang Y, Wong HY, Wong WW, Cheng LKW, Cheng EYL, Wong BWY, Lo RMN, Leung SK, Ip FC, Yuen JKY, Shea YF, Wong WM, Shum CK, Wai HM, Mok VCT, Kwok TCY, Mok KY, Heslegrave A, Hardy J, Zetterberg H, Fu AKY, Ip NY.   +22 more
europepmc   +1 more source

Structural analysis of cone photoreceptors in AO-OCT enables S-cone identification by a support vector machine classifier. [PDF]

Biomed Opt Express
Ji Q, Bernucci MT, Liu Y, Crowell JA, Miller DJ, Miller DT.   +5 more
europepmc   +1 more source

Structural connectivity associations with dyslexia-linked genes identifies the left insula as the key phonological hub

Zhao J, Zhao Y, Buchanan C, Mountford H, Moodie J, Li Y, Shen X, 23andMe Research Team, Tucker-Drob E, Whalley H, Cox S, Luciano M.   +11 more
europepmc   +1 more source

Rapid prediction of conformationally-dependent DFT-level descriptors using graph neural networks for carboxylic acids and alkyl amines.

Digit Discov
Haas BC, Hardy MA, Sowndarya S V S, Adams K, Coley CW, Paton RS, Sigman MS.   +6 more
europepmc   +1 more source

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Weighted multiparameter local Hardy spaces

Rocky Mountain Journal of Mathematics, 2021
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
He, Shaoyong, Chen, Jiecheng
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Weighted Subspaces of Hardy Spaces

Canadian Journal of Mathematics, 1988
A function f in Hp on the unit disc U of the complex plane has the uniform growthWe consider in this paper a subspace of Hp with better uniform growthFor the previous results on see [5, 6, 7]. We start with proving an inequality on Hp which is related to the Hardy-Stein identity (Theorem 2.1) in Section 2. This is applied in the subsequent section to
Kim, Hong Oh, Kwon, Ern Geun
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Weighted Composition Operators on Weighted Hardy Spaces

Computational Methods and Function Theory, 2019
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Gupta, Anuradha, Gupta, Bhawna
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Approximation in weighted Hardy spaces

Journal d'Analyse Mathématique, 1997
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Bonilla, A., Pérez-González, F., Stray, A., Trujillo-González, R.   +3 more
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Real Functions in Weighted Hardy Spaces

Journal of Mathematical Sciences, 2002
For a function \(w\in L^1\) on the unit circle with \(w\geq 0\) and \(\log w\in L^1\), let \[ I_w= {H^p\over \varphi} \cap{\overline {H^p\over\overline \varphi}} \] where \(\varphi\in H^p\) is an outer function such that \(|\varphi |^p=w\). The following problem is considered: when \(I_w\) contains no nonconstant functions. In the case \(p=2\), this is
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A HARDY-LITTLEWOOD THEOREM FOR WEIGHTED SPACES

Acta Mathematica Scientia, 1997
Summary: Let \(q\geq 2\). If \(f\) is a measurable function on \(\mathbb{R}^n\) such that \(f(x)|x|^{n(1-2/q)}\in L^q(\mathbb{R}^n)\), then its Fourier transform \(\widehat f\) can be defined and there exists a constant \(A_q\) such that the inequality \(|\widehat f|_q\leq A_q|f|\cdot|^{n(1-2/q)}|_q\) holds. This is the Hardy-Littlewood theorem.
Liu, Jianming, Zheng, Weixing
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