Results 211 to 220 of about 31,456 (265)

Retinal neurodegeneration, neuroretinal rim analysis and choroid thickness in pseudoexfoliation syndrome with spectral domain optical coherence tomography. [PDF]

Sci Rep
Faria Pereira A, Mota Moreira P, Coelho-Costa I, Teixeira-Martins R, Estrela Silva S, Oliveira-Ferreira C.   +5 more
europepmc   +1 more source

Spectralis Optical Coherence Tomography for Evaluating Ocular Hypertensive and Glaucoma Suspect Eyes: Real-World Data from Taiwan. [PDF]

Diagnostics (Basel)
Wong MS, Wu CW, Chang YC, Chen HY.
europepmc   +1 more source

Imaging tests as predictors of progression to rheumatoid arthritis in clinically suspect arthralgia: a systematic review and meta-analysis. [PDF]

Rheumatology (Oxford)
Gupta A, Anis S, de Pablo P.
europepmc   +1 more source

Weighted BMO and Toeplitz operators on the Bergman space A1

, 2012
Jari Taskinen, Jani A. Virtanen
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Two characterizations of central BMO space via the commutators of Hardy operators

, 2021
This article addresses two characterizations of BMO⁢(ℝn){\mathrm{BMO}(\mathbb{R}^{n})}-type space via the commutators of Hardy operators with homogeneous kernels on Lebesgue spaces: (i) characterization of the central BMO⁢(ℝn){\mathrm{BMO}(\mathbb{R}^{n})
Zunwei Fu, Shan-zhen Lu, S. Shi
semanticscholar   +1 more source

On compactness of commutators of multiplication and bilinear pseudodifferential operators and a new subspace of BMO

, 2020
It is known that the compactness of the commutators of point-wise multiplication with bilinear homogeneous Calderon–Zygmund operators acting on product of Lebesgue spaces is characterized by the multiplying function being in the space CMO.
R. Torres, Qingying Xue
semanticscholar   +1 more source

BMO from dyadic BMO on the bidisc

Journal of the London Mathematical Society, 2008
AbstractWe generalize to the bidisc a theorem of Garnett and Jones relating the space BMO of functions of bounded mean oscillation to its martingale counterpart, dyadic BMO. Namely, translation‐averages of suitable families of dyadic BMO functions belong to BMO.
Jill Pipher, Lesley A. Ward
openaire   +2 more sources

Properties of BMO Functions whose Reciprocals are also BMO

Zeitschrift für Analysis und ihre Anwendungen, 1993
The paper gives some properties of the space \(\text{BMO}_ *=\{w\in\text{BMO}: 1/\omega\in\text{BMO}\}\) such as Theorem 1. A real- valued function \(u\) is in \(\text{BMO }\Leftrightarrow\) there exists \(w\in \text{BMO}_ *\) such that \(u=w-1/w\) (a consequence of \(\text{Lip }\alpha\)-operatability on BMO); Theorem 3.
Johnson, R. L., Neugebauer, C. J.
openaire   +1 more source