Institution
Central Economics and Mathematics Institute
Facility•Moscow, Russia•
About: Central Economics and Mathematics Institute is a facility organization based out in Moscow, Russia. It is known for research contribution in the topics: Population & Foreign-exchange reserves. The organization has 297 authors who have published 580 publications receiving 6449 citations. The organization is also known as: Federal State Institution of Science Central Economics and Mathematics Institute of the Russian Academy of Sciences.
Papers published on a yearly basis
Papers
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25 Jun 2021TL;DR: In this article, the authors presented the management systems of distributed situational centers, which aim at developing public administration and regulation by increasing the speed of decision-making. But, the study involved such standard methods as economic analysis, classification, expert assessment, deduction, etc., and the results can serve as a theoretical basis for modifying the existing and planned situational centers in Russia, especially those that will form an integral part of the system.
Abstract: Introduction. A complex system of distributed situational centers is one of the main vectors of the transformation of public administration in Russia. Each region needs additional infrastructure to develop a promising mechanism of multifunctional tools for effective electronic administration and management of socio-economic processes within public and private partnerships. The versatility and exclusivity of this mechanism lie in its large-scale capabilities, which make it possible to engage the most important spheres of the state’s life in detailed monitoring, analysis, forecasting, and strategizing. Study objects and methods. The research featured the management systems of situational centers, which aim at developing public administration and regulation by increasing the speed of decision-making. The study involved such standard methods as economic analysis, classification, expert assessment, deduction, etc. Results and discussion. The results can serve as a theoretical basis for modifying the existing and planned situational centers in Russia, especially those that will form an integral part of the system of distributed situational centers. Taking into account the rapid development of new public administration instruments, it is necessary to bridge the gap between Russia and other countries. Conclusion. Modern realities dictate new approaches in the field of public administration and regulation. That is why the development of situational centers is a strategically important area for creating a centralized system for managing the country. Improving the functionality of such centers will lead to a qualitative improvement in the entire structure of the state apparatus.
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TL;DR: In this paper, the rate of convergence of an iteration process in Hilbert space is estimated for the purpose of solving an equation with a non-self-adjoint operator under the assumption that the real component of the operator is positive definite.
Abstract: The rate of convergence of an iteration process in Hilbert space is estimated for the purpose of solving an equation with a non-self-adjoint operator. On the assumption that the real component of the operator is positive definite, we outline the selection of the relaxation parameter and present an estimate of the rate of convergence that is exact in the class of normal operators.
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TL;DR: In this paper , the authors give an alternative algorithm to find a stable flow in a network with several sources and sinks, which runs in O(nm)$ time for a network having $n$ vertices and $m$ edges.
Abstract: In 2010s Fleiner introduced a notion of stable flows in directed networks and showed that such a flow always exists and can be found by use of a reduction to the stable allocation problem due to Baiou and Balinski. Recently Cseh and Matuschke devised a direct strongly polynomial algorithm. In this paper we give an alternative algorithm to find a stable flow in a network with several sources and sinks. It is based on an idea of preflows (appeared in 1970s in a faster algorithm for the classical max-flow problem), and runs in $O(nm)$ time for a network with $n$ vertices and $m$ edges. The results are further generalized to a larger class of objects, so-called stable quasi-flows with bounded excesses in non-terminal vertices. (The paper is written in Russian.)
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TL;DR: In this paper, the authors discuss the phenomenon of academic rent, specifies the main aggregates of the concept, and proposes a method for determining the value of immaterial part of the academic rent based on interviews with experts from leading Russian universities.
Abstract: The article discusses the phenomenon of academic rent, specifies the main aggregates of the concept. The author proposes the method for determining the value of immaterial part of academic rent, based on interviews with experts from leading Russian universities. The article presents the results of surveys and applied calculations, which show a gradual decrease of the academic rent volume. This new concept is used to explain several paradoxes of the Russian market of higher education. The transition of the university system from the model of academic rent to the model of scale’s effect is proved.
Authors
Showing all 315 results
Name | H-index | Papers | Citations |
---|---|---|---|
Boris Mirkin | 35 | 178 | 6722 |
Yuri Kabanov | 26 | 85 | 3396 |
L. V. Chernysheva | 24 | 167 | 1867 |
Igor V. Evstigneev | 21 | 129 | 1838 |
Alexander Zeifman | 21 | 177 | 1502 |
Vladimir Popov | 20 | 169 | 2041 |
Vyacheslav V. Kalashnikov | 19 | 109 | 1217 |
Vladimir I. Danilov | 18 | 165 | 1255 |
Victor Polterovich | 17 | 126 | 1145 |
Ernst Presman | 15 | 41 | 875 |
Andrei Dmitruk | 13 | 51 | 604 |
Anatoly Peresetsky | 13 | 45 | 617 |
Anton Oleinik | 12 | 55 | 495 |
Vladimir Rotar | 11 | 28 | 577 |
Nikolai B. Melnikov | 11 | 72 | 323 |