262,668 research outputs found
THE BIRTH ANNIVERSARY OF VERONIKA I. SKVORTSOVA
The birth anniversary of Veronika I. Skvortsova
TO THE JUBILEE OF VERONICA I. SKVORTSOVA, HONOURED SCIENCE WORKER, CORRESPONDING MEMBER OF RUSSIAN ACADEMY OF MEDICAL SCIENCES, DEPUTY MINISTER OF HEALTH AND SOCIAL DEVELOPMENT MINISTRY
To the jubilee of Veronica I. Skvortsova, Honoured Science Worker, corresponding member of Russian Academy of Medical Sciences, Deputy Minister of Health and Social Development Ministry
TO THE JUBILEE OF VERONICA I. SKVORTSOVA, HONOURED SCIENCE WORKER, CORRESPONDING MEMBER OF RUSSIAN ACADEMY OF MEDICAL SCIENCES, DEPUTY MINISTER OF HEALTH AND SOCIAL DEVELOPMENT MINISTRY
To the jubilee of Veronica I. Skvortsova, Honoured Science Worker, corresponding member of Russian Academy of Medical Sciences, Deputy Minister of Health and Social Development Ministry
Predicting and Understanding Cancer Response to Treatment
Contains fulltext :
196925.pdf (Publisher’s version ) (Open Access
Contemporary Migration Processes in Russia
This article, abridged from the Russian
original, was published by the Institute
of Socio-Political Studies of the
Russian Academy of Science, Moscow,
in 1993. Irena Orlova, Y. Streltsova and
E. Skvortsova work in the Department
of Sociology of Migration at the Institute.
Dr. Orlova is the Head of the
Department. The article was translated
by A. Benifand and R. Kovaleva, York
University, and edited by R. Brym,
Professor of Sociology, University of
Toronto.
The article examines the contribution
of migration to Russian population
dynamics, inter-regional
migration flows, the growth of regional
and ethnic separatism, human
rights problems associated with migration,
refugee issues, and the "brain
drain" from Russia. It is based on official
demographic statistics and a wide
range of sociological surveys. It focuses
mainly on the period 1990-93
and contains a brief postscript bringing
the analysis up to date.Cet article estune version abrégée d'un
texte qui a été publié en russe par l'Institut
d'études sodo-politiques de
l'Académie russe des sciences à Moscou
en 1993. 1. Orlova, Y. Streltsova et
E. Skvortsova sont membres du Département
de sociologie des migrations
à l'Institut. Dr. Orlova est
directrice du Département. L'article a
été traduit par A. Benifand et R.
Kovaleva de l'Université York. La traduction
a été dirigee par le professeur
R. Brym du Département de sociologie
de l'Université de Toronto.
L'article examine l'effet des migrations
sur la dynamique démographique
en Russie, les flux migratoires
interrégionaux, la croissance des mouvements
séparatistes régionaux et ethniques,
les problèmes des droits de la
personne qui sont liés aux migrations,
la situation des réfugiés et les problèmes
résultant de l'émigration des intellectuels
russes. L'analyse est fondée
sur des statistiques démographiques
officielles et plusieurs études sociologiques.
Elle traite surtout de la période
1990-1993. Le postscriptum décrit les
développements récents
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
Estimates for solutions and attraction domains of the zero solution to systems of quasi-linear equations of neutral type
Мария Александровна Скворцова, аспирант, Институт математики им. С. Л. Соболева СО РАН (Россия, г. Новосибирск), [email protected].
Maria Aleksandrovna Skvortsova, Postgraduate Student, Sobolev Institute of Mathematics SB RAS (Russia, Novosibirsk), [email protected].Настоящая работа посвящена изучению одного класса систем дифференциальных
уравнений нейтрального типа. Указаны области притяжения нулевого решения и установлены оценки экспоненциального убывания решений на бесконечности. В частности, из этих оценок вытекает асимптотическая устойчивость нулевого решения рассматриваемых систем. Результаты получены с использованием модифицированного функционала Ляпунова - Красовского.
The present paper is devoted to study a class of systems of differential equations of neutral type. We obtain attraction domains of the zero solution and establish estimates of exponential decay at infinity for solutions. In particular, asymptotic stability of the zero solution follows from these estimates. These results were derived by the use of a modified Lyapunov - Krasovskii functional.Институт математики им. С. Л. Соболева СО РА
Protecting Animals 36: Author Witi Ihimaera
In this very special episode of Knowing Animals I am joined by beloved New Zealand author Witi Ihimaera. Witi has written many books featuring nonhuman animals. He offers us a non-colonial lens through which to think about the human/nonhuman relationship
- …
