196,584 research outputs found
sarthak-sahoo-0710/Organoid_scRNASeq_analysis: Organoid_scRNASeq_analysis
<p>Codes to analyze single cell RNA seq. data for mammary organoids.</p>
Sahoo-Supplement Fig 2.pdf
Micro-architectural
parameters of iliac crest bone evaluated by µCT
(a)
3-D µCT images showing a normal bone and gross micro-architectural
deterioration in the proband’s bone, (b)
All parameters of cortical bone microarchitecture; T.Ar (periosteal area), B.Ar
(cortical mean cross-section area), Cs.Th (cortical thickness), T.Pm
(periosteal perimeter), and B.Pm (cortical bone perimeter) are significantly
lower in the proband compared to age and sex-matched healthy control, (c) Parameters of trabecular bone microarchitecture; Tb.Th (trabecular
thickness), and Tb.N (trabecular number) are decreased, while Tb.Sp (trabecular
separation) and SMI (structure model index) are increased in the proband’s
bone. All values are expressed as mean ± S.E.
*
p<0.05 and ** p<0. 01versus control</p
Про стійкість рівняння Коші на розв'язних групах
The notion of (ψ, γ)-stability was introduced in [V. A. Faiziev, Th. M. Rassias, and P. K. Sahoo, Trans. Amer. Math. Soc., 354, 4455 (2002)]. It was shown that the Cauchy equation f(xy) = f(x) + f(y) is (ψ, γ)-stable both on any Abelian group and on any meta-Abelian group. In [V. A. Faiziev and P. K. Sahoo, Publ. Math. Debrecen, 75, 6 (2009)], it was proved that the Cauchy equation is (ψ, γ)-stable on step-two solvable groups and step-three nilpotent groups. In the present paper, we prove a more general result and show that the Cauchy equation is (ψ, γ)-stable on solvable groups.няття (ψ,γ)-стійкості введено в роботі [Fahiev V. A., Rassias Th. M., Sahoo P. K. The space of (ψ,γ)-additive mappings on semigroups//Trans. Amer. Math. Soc. - 2002. - 354. - P. 4455-4472]. Було показано, що рівняння Коші f(xy)=f(x)+f(y) є (ψ,γ)-стійким як на довільній абелевій групі, так i на довільній метабелевій групі. В роботі [Farnev V. A., Sahoo P. K. On (ψ,γ)-stability of Cauchy equation on some noncommutative groups // Publ. Math. Debrecen. - 2009. - 75. - P. 67-83] доведено, що рівняння Коші є (ψ,γ)-стійким як на двоступеневих розв'язних групах, так i на триступеневих нільпотентних групах. В нашій роботі доведено більш загальний результат i показано, що рівняння Коші є (ψ,γ)-стійким на розв'язних групах.This paper was partially supported by an IRIG grant from the Office of the VP for Research, and an A&S grant from the College Arts and Sciences, University of Louisville
Про стійкість рівняння Коші на розв'язних групах
The notion of (ψ, γ)-stability was introduced in [V. A. Faiziev, Th. M. Rassias, and P. K. Sahoo, Trans. Amer. Math. Soc., 354, 4455 (2002)]. It was shown that the Cauchy equation f(xy) = f(x) + f(y) is (ψ, γ)-stable both on any Abelian group and on any meta-Abelian group. In [V. A. Faiziev and P. K. Sahoo, Publ. Math. Debrecen, 75, 6 (2009)], it was proved that the Cauchy equation is (ψ, γ)-stable on step-two solvable groups and step-three nilpotent groups. In the present paper, we prove a more general result and show that the Cauchy equation is (ψ, γ)-stable on solvable groups.няття (ψ,γ)-стійкості введено в роботі [Fahiev V. A., Rassias Th. M., Sahoo P. K. The space of (ψ,γ)-additive mappings on semigroups//Trans. Amer. Math. Soc. - 2002. - 354. - P. 4455-4472]. Було показано, що рівняння Коші f(xy)=f(x)+f(y) є (ψ,γ)-стійким як на довільній абелевій групі, так i на довільній метабелевій групі. В роботі [Farnev V. A., Sahoo P. K. On (ψ,γ)-stability of Cauchy equation on some noncommutative groups // Publ. Math. Debrecen. - 2009. - 75. - P. 67-83] доведено, що рівняння Коші є (ψ,γ)-стійким як на двоступеневих розв'язних групах, так i на триступеневих нільпотентних групах. В нашій роботі доведено більш загальний результат i показано, що рівняння Коші є (ψ,γ)-стійким на розв'язних групах.This paper was partially supported by an IRIG grant from the Office of the VP for Research, and an A&S grant from the College Arts and Sciences, University of Louisville
Про стійкість рівняння Коші на розв'язних групах
The notion of (ψ, γ)-stability was introduced in [V. A. Faiziev, Th. M. Rassias, and P. K. Sahoo, Trans. Amer. Math. Soc., 354, 4455 (2002)]. It was shown that the Cauchy equation f(xy) = f(x) + f(y) is (ψ, γ)-stable both on any Abelian group and on any meta-Abelian group. In [V. A. Faiziev and P. K. Sahoo, Publ. Math. Debrecen, 75, 6 (2009)], it was proved that the Cauchy equation is (ψ, γ)-stable on step-two solvable groups and step-three nilpotent groups. In the present paper, we prove a more general result and show that the Cauchy equation is (ψ, γ)-stable on solvable groups.няття (ψ,γ)-стійкості введено в роботі [Fahiev V. A., Rassias Th. M., Sahoo P. K. The space of (ψ,γ)-additive mappings on semigroups//Trans. Amer. Math. Soc. - 2002. - 354. - P. 4455-4472]. Було показано, що рівняння Коші f(xy)=f(x)+f(y) є (ψ,γ)-стійким як на довільній абелевій групі, так i на довільній метабелевій групі. В роботі [Farnev V. A., Sahoo P. K. On (ψ,γ)-stability of Cauchy equation on some noncommutative groups // Publ. Math. Debrecen. - 2009. - 75. - P. 67-83] доведено, що рівняння Коші є (ψ,γ)-стійким як на двоступеневих розв'язних групах, так i на триступеневих нільпотентних групах. В нашій роботі доведено більш загальний результат i показано, що рівняння Коші є (ψ,γ)-стійким на розв'язних групах.This paper was partially supported by an IRIG grant from the Office of the VP for Research, and an A&S grant from the College Arts and Sciences, University of Louisville
Author-wise bibliometric analysis based on entropy.
Author-wise bibliometric analysis based on entropy.</p
Going Beyond Counting First Authors in Author Co-citation Analysis
The present study examines one of the fundamental aspects of author co-citation analysis (ACA) - the way co-citation
counts are defined. Co-citation counting provides the data on which all subsequent statistical analyses and mappings
are based, and we compare ACA results based on two different types of co-citation counting - the traditional type that
only counts the first one among a cited work's authors on the one hand and a non-traditional type that takes into
account the first 5 authors of a cited work on the other hand. Results indicate that the picture produced through this non-traditional author co-citation counting contains more coherent author groups and is therefore considerably clearer. However, this picture represents fewer specialties in the research field being studied than that produced through the traditional first-author co-citation counting when the same number of top-ranked authors is selected and analyzed. Reasons for these effects are discussed
Anion-selective macromolecular artificial ionophores with steroid and fatty acid pendants
Synthetic anion transporters are potential therapeutics for a plethora of cellular ailments including cystic fibrosis, cancer resistance, epilepsy, etc. In this context, cationic macromolecular amphiphiles are gaining revived interest because of their easy synthesis and ample ion channelization through the membrane barrier. Herein, side chain alanine containing cationic polymer amphiphiles with steroid/fatty acid decoration was established to be an efficient anion-selective artificial ionophore. The facile amphiphilicity-assisted assembly makeover of cholic acid containing copolymers channelized the better transmembrane anion transport and efficiency with the maximum selectivity found with NO2- ion
Appropriate Similarity Measures for Author Cocitation Analysis
We provide a number of new insights into the methodological discussion about author cocitation analysis. We first argue that the use of the Pearson correlation for measuring the similarity between authors’ cocitation profiles is not very satisfactory. We then discuss what kind of similarity measures may be used as an alternative to the Pearson correlation. We consider three similarity measures in particular. One is the well-known cosine. The other two similarity measures have not been used before in the bibliometric literature. Finally, we show by means of an example that our findings have a high practical relevance.information science;Pearson correlation;cosine;similarity measure;author cocitation analysis
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