241 research outputs found
"Yan yi" zhi liang mian xing
Szeto, Man Chun.Thesis M.Phil. Chinese University of Hong Kong 2014.Includes bibliographical references (leaves 140-142).Abstracts also in Chinese.Title from PDF title page (viewed on 19, December, 2016).Szeto, Man Chun
An Introduction to the New Zealand Treasury Model
The Treasury is the New Zealand government’s lead advisor on economic and financial issues. Part of this advice consists of providing the government with forecasts of economic and fiscal variables. Economic forecasts are important, not only as a basis for forecasts of tax revenue, but also in informing the government of the macroeconomic environment in which proposed fiscal policy settings will operate. The New Zealand Treasury Model (NZTM) is an important part of the economic forecasting process at the Treasury. This paper has three purposes. The first is to give readers an idea of the key features of NZTM. The second is to detail major changes to the model since the last published documentation of the model (Szeto, 2002). These model developments have enhanced NZTM to provide more detailed forecasts. Key changes include the disaggregation of deflators into the various expenditure GDP components, the introduction of consumption and capital goods imports into the model (rather than just treating them as intermediate imports) and the disaggregation of the inflation equation into tradable and non-tradable components. The final purpose of this paper is to outline briefly NZTM’s role in the Treasury’s forecasting process.Computable general equilibrium model; New Zealand economy; forecasting
[Exposition] Présence : exposition de Szeto Lap 司徒立 à l'espace culturel ICICLE, du 14 juin au 5 septembre 2024
A l'espace ICICLE Paris au 35 avenue George V, Paris 8e, vernissage de l'exposition de Szeto Lap (司徒立) en présence de l'artiste : jeudi 13 juin 2024, 18h00 – 20h00. Avec l'exposition "Présence", Szeto Lap, premier artiste chinois à avoir été exposé au Centre Pompidou dès 1982, revient sur la scène parisienne après plus de trois décennies d'absence. Le 13 juin, en ouverture du vernissage, un échange entre Éric Lefebvre, directeur du musée Cernuschi et Myriam Kryger, commissaire de l’exp..
Supplemental Tables - Top Authors in Dermatology: Comparisons of Standardized Database Citation Indicators
Supplemental Tables - Top Authors in Dermatology: Comparisons of Standardized Database Citation Indicators.
Data derived from Baas, Jeroen; Boyack, Kevin; Ioannidis, John P.A. (2020), “Data for "Updated science-wide author databases of standardized citation indicators"”, Mendeley Data, V2, doi: 10.17632/btchxktzyw.2
Supplemental Table 1: Top 50 Dermatology Authors by 2019 Career-Long Metrics, Excluding Self-Citations.
Supplemental Table 2: Top 50 Dermatology Authors by 2019 Single-Year Metrics, Excluding Self-Citations.
Supplemental Table 3: Top 50 Dermatology Authors by 2019 Career-Long Metrics, All Citations Including Self-Citations.
Supplemental Table 4: Top 50 Dermatology Authors by 2019 Single-Year Metrics, All Citations Including Self-Citations
On Partial Galois Algebras
We generalize, in the context of partial group action, the Kanzaki commutator theorem for Galois extensions and the structure theorem for Galois algebras given by Szeto and Xue
CUHK electronic theses & dissertations collection
Szeto, Pui Yiu.Thesis M.Phil. Chinese University of Hong Kong 2015.Includes bibliographical references (leaves 83-88).Abstracts also in Chinese.Title from PDF title page (viewed on 30, September, 2016)
On Azumaya crossed products
Let B be an Azumaya algebra with a finite inner automorphism group G. It is shown that if B contains a maximal commutative Galois algebra S with Galois group G|S restricted by and isomorphic with G, then B contains a crossed product D(S,G, f ) with a factor set f . Also properties of the Azumaya crossed product D(S,G, f ) are given
On the Wedderburn Theorem
In [6], Pierce studied the modules over a commutative regular ring R by using the representation of R as the global sections of a sheaf which we call the Pierce sheaf. When the stalks of the Pierce sheaf are regular, Magid gave a Galois theory and some properties for a central separable R-algebra [4, (2.4), (2.5), (2.6) and (2.7)]. When the stalks of the Pierce sheaf are semi-local, DeMeyer presented a Galois theory for a central separable R-algebra [3, sections 2 and 3] and the author characterized the finitely generated and projective modules over a central separable R-algebra in terms of the R-modules in [7] and [8].</jats:p
On free ring extensions of degree n
Nagahara and Kishimoto [1] studied free ring extensions B(x) of degree n for some integer n over a ring B with 1, where xn=b, cx=xρ(c) for all c and some b in B(ρ=automophism of B), and {1,x…,xn−1} is a basis. Parimala and Sridharan [2], and the author investigated a class of free ring extensions called generalized quaternion algebras in which b=−1 and ρ is of order 2. The purpose of the present paper is to generalize a characterization of a generalized quaternion algebra to a free ring extension of degree n in terms of the Azumaya algebra. Also, it is shown that a one-to-one correspondence between the set of invariant ideals of B under ρ and the set of ideals of B(x) leads to a relation of the Galois extension B over an invariant subring under ρ to the center of B
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