Республика Карелия: современное состояние и перспективы развития лесопромышленного комплекса
Analytical communities for the goal of this paper can be defined as loosely united clusters of professionals doing joint or related work in policy analysis, research and development, who frequently work together on common analytical goals and clients, while not necessarily form a special organizational structure which differ them from think tank. Examples of analytical communities could be university research departments, regular authors of one analytical journal, members of certain intellectual clubs, or regularly meeting informal research groups, including individual intellectuals working together on the regular basis. The goal of this paper is to show an important connection between regional and local analytical communities and local administrations of the Russian regions to specify a unique role the analytical communities can play in strategic planning, providing local administrations both with data, ideas, solutions, and scenarios of social developments, which local authorities are interested to get the answers to.
The paper deals with the problem of Soviet-Finnish scientific-technical cooperation in the mid-1950s - mid-1960s as well as the role of specialists who worked in the "new Soviet area" of the Karelian Peninsula and Ladoga Karelia which became a part of the USSR after the Soviet-Finnish war in 1941-1944. The article examies the mechanisms of cooperation between the states as well as it effects on enterprises of the former Finnish territory.
We consider certain spaces of functions on the circle, which naturally appear in harmonic analysis, and superposition operators on these spaces. We study the following question: which functions have the property that each their superposition with a homeomorphism of the circle belongs to a given space? We also study the multidimensional case.
We consider the spaces of functions on the m-dimensional torus, whose Fourier transform is p -summable. We obtain estimates for the norms of the exponential functions deformed by a C1 -smooth phase. The results generalize to the multidimensional case the one-dimensional results obtained by the author earlier in “Quantitative estimates in the Beurling—Helson theorem”, Sbornik: Mathematics, 201:12 (2010), 1811 – 1836.
We consider the spaces of function on the circle whose Fourier transform is p-summable. We obtain estimates for the norms of exponential functions deformed by a C1 -smooth phase.