The Experts below are selected from a list of 12 Experts worldwide ranked by ideXlab platform
S Tokarzewski - One of the best experts on this subject based on the ideXlab platform.
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homogenization procedure and pad approximants for effective heat conductivity of composite materials with cylindrical inclusions having square cross section
Proceedings of The Royal Society A: Mathematical Physical and Engineering Sciences, 1999Co-Authors: Igor V Andrianov, G A Starushenko, Vladyslav V Danishevskyy, S TokarzewskiAbstract:An analytical solution, describing the effective heat conductivity of composite materials with a periodic array of cylindrical inclusions with square cross–section, has been obtained by asymptotic methods and Pade approximants for any values of the concentration of inclusions and conductivity.
Igor V Andrianov - One of the best experts on this subject based on the ideXlab platform.
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homogenization procedure and pad approximants for effective heat conductivity of composite materials with cylindrical inclusions having square cross section
Proceedings of The Royal Society A: Mathematical Physical and Engineering Sciences, 1999Co-Authors: Igor V Andrianov, G A Starushenko, Vladyslav V Danishevskyy, S TokarzewskiAbstract:An analytical solution, describing the effective heat conductivity of composite materials with a periodic array of cylindrical inclusions with square cross–section, has been obtained by asymptotic methods and Pade approximants for any values of the concentration of inclusions and conductivity.
G A Starushenko - One of the best experts on this subject based on the ideXlab platform.
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homogenization procedure and pad approximants for effective heat conductivity of composite materials with cylindrical inclusions having square cross section
Proceedings of The Royal Society A: Mathematical Physical and Engineering Sciences, 1999Co-Authors: Igor V Andrianov, G A Starushenko, Vladyslav V Danishevskyy, S TokarzewskiAbstract:An analytical solution, describing the effective heat conductivity of composite materials with a periodic array of cylindrical inclusions with square cross–section, has been obtained by asymptotic methods and Pade approximants for any values of the concentration of inclusions and conductivity.
Vladyslav V Danishevskyy - One of the best experts on this subject based on the ideXlab platform.
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homogenization procedure and pad approximants for effective heat conductivity of composite materials with cylindrical inclusions having square cross section
Proceedings of The Royal Society A: Mathematical Physical and Engineering Sciences, 1999Co-Authors: Igor V Andrianov, G A Starushenko, Vladyslav V Danishevskyy, S TokarzewskiAbstract:An analytical solution, describing the effective heat conductivity of composite materials with a periodic array of cylindrical inclusions with square cross–section, has been obtained by asymptotic methods and Pade approximants for any values of the concentration of inclusions and conductivity.
Viktor Ivanovich Buslaev - One of the best experts on this subject based on the ideXlab platform.
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convergence of m point pade approximants of a tuple of multivalued analytic functions
Sbornik Mathematics, 2015Co-Authors: Viktor Ivanovich BuslaevAbstract:We prove the convergence of -point Pad? approximants of an -tuple of holomorphic germs that admit analytic continuation along all paths in the extended complex plane that do not pass through a?finite set of points. This result extends Stahl's theorem from the case to the case of an arbitrary . Bibliography: 15 titles.
