212 results
Search Results
2. Eleven Papers on Differential Equations
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S. A. Akhmedov, B. V. Bazaliĭ, Yu. M. Berezanskiĭ, V. S. Bondarchuk, Yu. L. Daletskiĭ, A. È. Eremenko, M. V. Fedoryuk, M. L. Gorbachuk, G. A. Iosif′yan, V. A. Kutovoĭ, V. F. Lazutkin, O. A. Oleĭnik, V. Yu. Shelepov, I. N. Tavkhelidze, S. F. Zaletkin, S. A. Akhmedov, B. V. Bazaliĭ, Yu. M. Berezanskiĭ, V. S. Bondarchuk, Yu. L. Daletskiĭ, A. È. Eremenko, M. V. Fedoryuk, M. L. Gorbachuk, G. A. Iosif′yan, V. A. Kutovoĭ, V. F. Lazutkin, O. A. Oleĭnik, V. Yu. Shelepov, I. N. Tavkhelidze, and S. F. Zaletkin
- Abstract
The papers in this volume, like those in the previous one, have been selected, translated, and edited from publications not otherwise translated into English under the auspices of the AMS-ASL-IMS Committee on Translations from Russian and Other Foreign Languages.
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- 2016
3. Selected Papers on Analysis and Differential Equations
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This volume contains translations of papers that originally appeared in the Japanese journal Sūgaku. These papers range over a variety of topics in ordinary and partial differential equations, and in analysis. Many of them are survey papers presenting new results obtained in the last few years. This volume is suitable for graduate students and research mathematicians interested in analysis and differential equations.
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- 2015
4. Fifteen Papers on Real and Complex Functions, Series, Differential and Integral Equations
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N. I. Ahiezer, I. S. Aršon, Dong Guang-chung, V. F. Gapoškin, E. K. Godunova, L. D. Kudrjavcev, V. I. Levin, V. I. Mel′nik, S. M. Nikol′skiĭ, M. K. Potapov, E. M. Saak, G. H. Sindalovskiĭ, S. A. Teljakovskiĭ, R. M. Trigub, G. M. Vaĭnikko, A. G. Vituškin, N. I. Ahiezer, I. S. Aršon, Dong Guang-chung, V. F. Gapoškin, E. K. Godunova, L. D. Kudrjavcev, V. I. Levin, V. I. Mel′nik, S. M. Nikol′skiĭ, M. K. Potapov, E. M. Saak, G. H. Sindalovskiĭ, S. A. Teljakovskiĭ, R. M. Trigub, G. M. Vaĭnikko, and A. G. Vituškin
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- 2016
5. Sixteen Papers on Differential and Difference Equations, Functional Analysis, Games and Control
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M. A. Aĭzerman, I. A. Bahtin, V. M. Borok, È. M. Braverman, Ja. V. Bykov, M. L. Cetlin, L. D. Èskin, I. M. Gel′fand, G. N. Gestrin, Ju. F. Korobeĭnik, V. G. Linenko, S. A. Maksimov, A. S. Markus, S. M. Nikol′skiĭ, I. I. Pjateckiĭ-Šapiro, S. Z. Rafal′son, L. I. Rozonoér, S. L. Sobolev, N. G. Sorokina, S. V. Uspenskiĭ, V. N. Viziteĭ, Ja. I. Žitomirskiĭ, M. A. Aĭzerman, I. A. Bahtin, V. M. Borok, È. M. Braverman, Ja. V. Bykov, M. L. Cetlin, L. D. Èskin, I. M. Gel′fand, G. N. Gestrin, Ju. F. Korobeĭnik, V. G. Linenko, S. A. Maksimov, A. S. Markus, S. M. Nikol′skiĭ, I. I. Pjateckiĭ-Šapiro, S. Z. Rafal′son, L. I. Rozonoér, S. L. Sobolev, N. G. Sorokina, S. V. Uspenskiĭ, V. N. Viziteĭ, and Ja. I. Žitomirskiĭ
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- 2016
6. Seven Papers on Equations Related to Mechanics and Heat
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A. A. Andronov, L. D. Èskin, V. I. Fodčuk, E. A. Leontovič, V. I. Mal′čenko, Ju. A. Mitropol′skiĭ, R. L. Sahbagjan, V. A. Solonnikov, A. A. Andronov, L. D. Èskin, V. I. Fodčuk, E. A. Leontovič, V. I. Mal′čenko, Ju. A. Mitropol′skiĭ, R. L. Sahbagjan, and V. A. Solonnikov
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- 2016
7. Fourteen Papers on Algebra, Topology, Algebraic and Differential Geometry
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V. P. Kompaniec, B. T. Levšenko, P. A. Medvedev, I. P. Mitjuk, A. F. Mutylin, M. A. Naĭmark, A. L. Oniščik, B. A. Pasynkov, P. I. Petrov, R. S. Pokazeeva, V. Z. Poljakov, Ja. G. Sinaĭ, A. S. Švarc, A. N. Tjurin, V. E. Voskresenskiĭ, V. P. Kompaniec, B. T. Levšenko, P. A. Medvedev, I. P. Mitjuk, A. F. Mutylin, M. A. Naĭmark, A. L. Oniščik, B. A. Pasynkov, P. I. Petrov, R. S. Pokazeeva, V. Z. Poljakov, Ja. G. Sinaĭ, A. S. Švarc, A. N. Tjurin, and V. E. Voskresenskiĭ
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- 2016
8. Fourteen Papers Translated from the Russian
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V. I. Arnol′d, S. D. Berman, K. Buzashi, T. Donchev, K. M. Efimov, I. I. Gikhman, S. G. Gindikin, M. I. Kanovich, A. A. Kirillov, Yu. I. Manin, V. G. Maz′ya, Yu. A. Neretin, A. A. Panchishkin, Bl. Sendov, Ya. G. Sinaĭ, Vu Kim Tuan, È. B. Vinberg, S. B. Yakubovich, V. I. Arnol′d, S. D. Berman, K. Buzashi, T. Donchev, K. M. Efimov, I. I. Gikhman, S. G. Gindikin, M. I. Kanovich, A. A. Kirillov, Yu. I. Manin, V. G. Maz′ya, Yu. A. Neretin, A. A. Panchishkin, Bl. Sendov, Ya. G. Sinaĭ, Vu Kim Tuan, È. B. Vinberg, and S. B. Yakubovich
- Abstract
Contains topics in such areas as representation theory, mathematical physics, Lie groups, differential equations, and random processes
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- 2016
9. Fourteen Papers Translated from the Russian
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L. A. Aksent′ev, T. N. Arutyunyan, A. E. Ètkin, V. A. Kasimov, V. È. Katsnel′son, A. S. Madgerova, Algis Morkeliūnas, I. R. Nezhmetdinov, S. Ya. Novikov, M. I. Ostrovskiĭ, E. M. Semenov, E. V. Tokarev, V. S. Vladimirov, N. V. Zabolotskiĭ, L. A. Aksent′ev, T. N. Arutyunyan, A. E. Ètkin, V. A. Kasimov, V. È. Katsnel′son, A. S. Madgerova, Algis Morkeliūnas, I. R. Nezhmetdinov, S. Ya. Novikov, M. I. Ostrovskiĭ, E. M. Semenov, E. V. Tokarev, V. S. Vladimirov, and N. V. Zabolotskiĭ
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Covers a range of topics including integral representations, complex analysis, differential equations, and functional analysis.
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- 2016
10. Eight Papers on Differential Equations and Functional Analysis
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F. A. Berezin, V. I. Judovič, M. A. Krasnosel′skiĭ, O. A. Ladyženskaja, V. P. Palamodov, V. A. Solonnikov, M. G. Šur, N. N. Ural′ceva, B. R. Vaĭnberg, P. P. Zabreĭko, F. A. Berezin, V. I. Judovič, M. A. Krasnosel′skiĭ, O. A. Ladyženskaja, V. P. Palamodov, V. A. Solonnikov, M. G. Šur, N. N. Ural′ceva, B. R. Vaĭnberg, and P. P. Zabreĭko
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- 2016
11. Eleven Papers on Differential Equations, Functional Analysis and Measure Theory
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I. A. Bahtin, S. V. Fomin, I. C. Gohberg, V. V. Grusin, M. V. Keldyš, M. A. Krasnosel′skiĭ, M. G. Kreĭn, L. H. Liberman, V. È. Ljance, S. M. Nikol′skiĭ, A. Povzner, P. E. Sobolevskiĭ, V. G. Sprindžuk, I. A. Bahtin, S. V. Fomin, I. C. Gohberg, V. V. Grusin, M. V. Keldyš, M. A. Krasnosel′skiĭ, M. G. Kreĭn, L. H. Liberman, V. È. Ljance, S. M. Nikol′skiĭ, A. Povzner, P. E. Sobolevskiĭ, and V. G. Sprindžuk
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- 2016
12. Eleven Papers on Differential Equations, Two on Information Theory
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A. A. Andronov, D. V. Anosov, Ding Shia-shi, R. L. Dobrušin, G. V. Gil′, A. N. Kolmogorov, E. A. Leontovič, A. D. Myškis, O. A. Oleĭnik, S. L. Sobolev, V. M. Staržinskiĭ, A. A. Andronov, D. V. Anosov, Ding Shia-shi, R. L. Dobrušin, G. V. Gil′, A. N. Kolmogorov, E. A. Leontovič, A. D. Myškis, O. A. Oleĭnik, S. L. Sobolev, and V. M. Staržinskiĭ
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- 2016
13. Twelve papers on logic and differential equations
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- 2016
14. Nine papers on topology, Lie groups, and differential equations
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- 2016
15. Sixteen Papers on Differential Equations
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Ju. V. Egorov, A. V. Fursikov, D. M. Galin, Ju. S. Il′jašenko, T. F. Kalugina, V. Ju. Kiselev, A. I. Komeč, A. A. Lokšin, N. O. Maksimova, O. A. Oleĭnik, V. M. Petkov, P. R. Popivanov, E. V. Radkevič, C. V. Rangelov, D. A. Silaev, A. N. Šošitaĭšvili, M. A. Šubin, A. I. Suslov, M. I. Višik, Ju. V. Egorov, A. V. Fursikov, D. M. Galin, Ju. S. Il′jašenko, T. F. Kalugina, V. Ju. Kiselev, A. I. Komeč, A. A. Lokšin, N. O. Maksimova, O. A. Oleĭnik, V. M. Petkov, P. R. Popivanov, E. V. Radkevič, C. V. Rangelov, D. A. Silaev, A. N. Šošitaĭšvili, M. A. Šubin, A. I. Suslov, and M. I. Višik
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- 2016
16. Thirteen Papers on Differential Equations
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V. M. Alekseev, V. V. Barkovskiĭ, B. F. Bylov, M. V. Fedorjuk, G. N. Finoženok, L. V. Hohlova, M. G. Kreĭn, G. Ja. Ljubarskiĭ, Ja. B. Lopatinskiĭ, V. R. Nosov, V. O. Oliĭnik, A. M. Samoĭlenko, G. E. Šilov, M. I. Višik, K. V. Zadiraka, V. M. Alekseev, V. V. Barkovskiĭ, B. F. Bylov, M. V. Fedorjuk, G. N. Finoženok, L. V. Hohlova, M. G. Kreĭn, G. Ja. Ljubarskiĭ, Ja. B. Lopatinskiĭ, V. R. Nosov, V. O. Oliĭnik, A. M. Samoĭlenko, G. E. Šilov, M. I. Višik, and K. V. Zadiraka
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- 2016
17. Thirteen Papers on Functional Analysis and Differential Equations
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V. I. Arnol′d, O. V. Besov, V. I. Gurariĭ, T. M. Karaseva, V. Ja. Lin, O. B. Lykova, Ju. V. Malyšev, Ju. A. Mitropol′skiĭ, V. V. Nemyckiĭ, V. I. Paraska, A. M. Samoĭlenko, I. I. Šmulev, Ju. K. Solncev, I. V. Stankevič, S. A. Teljakovskiĭ, V. I. Arnol′d, O. V. Besov, V. I. Gurariĭ, T. M. Karaseva, V. Ja. Lin, O. B. Lykova, Ju. V. Malyšev, Ju. A. Mitropol′skiĭ, V. V. Nemyckiĭ, V. I. Paraska, A. M. Samoĭlenko, I. I. Šmulev, Ju. K. Solncev, I. V. Stankevič, and S. A. Teljakovskiĭ
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- 2016
18. Fourteen Papers on Functional Analysis and Differential Equations
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V. I. Arnol′d, I. A. Fel′dman, C. Foiaş, S. Fomin, I. C. Gohberg, K. K. Golovkin, O. A. Ladyženskaya, A. S. Markus, G. I. Nazarov, V. A. Pliss, L. A. Sahnovič, V. A. Solonnikov, A. V. Štraus, N. N. Ural′ceva, V. I. Arnol′d, I. A. Fel′dman, C. Foiaş, S. Fomin, I. C. Gohberg, K. K. Golovkin, O. A. Ladyženskaya, A. S. Markus, G. I. Nazarov, V. A. Pliss, L. A. Sahnovič, V. A. Solonnikov, A. V. Štraus, and N. N. Ural′ceva
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- 2016
19. Ten Papers on Differential Equations and Functional Analysis
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A. D. Aleksandrov, M. G. Gasymov, S. N. Kružkov, B. M. Levitan, M. A. Naĭmark, L. A. Sahnovič, Ja. G. Sinaĭ, A. D. Aleksandrov, M. G. Gasymov, S. N. Kružkov, B. M. Levitan, M. A. Naĭmark, L. A. Sahnovič, and Ja. G. Sinaĭ
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- 2016
20. Fifteen Papers on Differential Equations
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N. V. Azbelev, Z. B. Caljuk, A. A. Dezin, S. D. Èĭdel′man, A. F. Filippov, V. P. Il′in, V. A. Jakubovič, O. A. Oleĭnik, B. L. Roždestvenskiĭ, A. A. Samarskiĭ, G. E. Šilov, M. S. Šneerson, A. N. Tihonov, N. V. Azbelev, Z. B. Caljuk, A. A. Dezin, S. D. Èĭdel′man, A. F. Filippov, V. P. Il′in, V. A. Jakubovič, O. A. Oleĭnik, B. L. Roždestvenskiĭ, A. A. Samarskiĭ, G. E. Šilov, M. S. Šneerson, and A. N. Tihonov
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- 2016
21. Eight Papers on Differential Equations
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V. G. Egorov, L. N. Ešukov, A. A. Kiselev, J. Kurzweil, O. A. Ladyženskaya, M. I. Višik, Ju. A. Volkov, I. Vrkoč, V. G. Egorov, L. N. Ešukov, A. A. Kiselev, J. Kurzweil, O. A. Ladyženskaya, M. I. Višik, Ju. A. Volkov, and I. Vrkoč
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- 2016
22. Concerning the Hilbert 16th Problem
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Yu. Ilyashenko, S. Yakovenko, Yu. Ilyashenko, and S. Yakovenko
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This book examines qualitative properties of vector fields in the plane, in the spirit of Hilbert's Sixteenth Problem. Two principal topics explored are bifurcations of limit cycles of planar vector fields and desingularization of singular points for individual vector fields and for analytic families of such fields. In addition to presenting important new developments in this area, this book contains an introductory paper which outlines the general context and describes connections between the papers in the volume. The book will appeal to researchers and graduate students working in the qualitative theory of ordinary differential equations and dynamical systems.
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- 2016
23. Wave Propagation. Scattering Theory
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M. Sh. Birman and M. Sh. Birman
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The papers in this collection were written primarily by members of the St. Petersburg seminar in mathematical physics. The seminar, now run by O. A. Ladyzhenskaya, was initiated in 1947 by V. I. Smirnov, to whose memory this volume is dedicated. The papers in the collection are devoted mainly to wave propagation processes, scattering theory, integrability of nonlinear equations, and related problems of spectral theory of differential and integral operators. The book is of interest to mathematicians working in mathematical physics and differential equations, as well as to physicists studying various wave propagation processes.
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- 2016
24. Estimating the Error of Numerical Solutions of Systems of Reaction-Diffusion Equations
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Donald J. Estep, Mats G. Larson, Roy D. Williams, Donald J. Estep, Mats G. Larson, and Roy D. Williams
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This paper is concerned with the computational estimation of the error of numerical solutions of potentially degenerate reaction-diffusion equations. The underlying motivation is a desire to compute accurate estimates as opposed to deriving inaccurate analytic upper bounds. In this paper, we outline, analyze, and test an approach to obtain computational error estimates based on the introduction of the residual error of the numerical solution and in which the effects of the accumulation of errors are estimated computationally. We begin by deriving an a posteriori relationship between the error of a numerical solution and its residual error using a variational argument. This leads to the introduction of stability factors, which measure the sensitivity of solutions to various kinds of perturbations. Next, we perform some general analysis on the residual errors and stability factors to determine when they are defined and to bound their size. Then we describe the practical use of the theory to estimate the errors of numerical solutions computationally. Several key issues arise in the implementation that remain unresolved and we present partial results and numerical experiments about these points. We use this approach to estimate the error of numerical solutions of nine standard reaction-diffusion models and make a systematic comparison of the time scale over which accurate numerical solutions can be computed for these problems. We also perform a numerical test of the accuracy and reliability of the computational error estimate using the bistable equation. Finally, we apply the general theory to the class of problems that admit invariant regions for the solutions, which includes seven of the main examples. Under this additional stability assumption, we obtain a convergence result in the form of an upper bound on the error from the a posteriori error estimate. We conclude by discussing the preservation of invariant regions under discretization.
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- 2013
25. Quadratic Vector Equations on Complex Upper Half-Plane
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Oskari Ajanki, László Erdős, Torben Krüger, Oskari Ajanki, László Erdős, and Torben Krüger
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The authors consider the nonlinear equation $-\frac 1m=z+Sm$ with a parameter $z$ in the complex upper half plane $\mathbb H $, where $S$ is a positivity preserving symmetric linear operator acting on bounded functions. The solution with values in $ \mathbb H$ is unique and its $z$-dependence is conveniently described as the Stieltjes transforms of a family of measures $v$ on $\mathbb R$. In a previous paper the authors qualitatively identified the possible singular behaviors of $v$: under suitable conditions on $S$ we showed that in the density of $v$ only algebraic singularities of degree two or three may occur. In this paper the authors give a comprehensive analysis of these singularities with uniform quantitative controls. They also find a universal shape describing the transition regime between the square root and cubic root singularities. Finally, motivated by random matrix applications in the authors'companion paper they present a complete stability analysis of the equation for any $z\in \mathbb H$, including the vicinity of the singularities.
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- 2019
26. Extended States for the Schrödinger Operator with Quasi-Periodic Potential in Dimension Two
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Yulia Karpeshina, Roman Shterenberg, Yulia Karpeshina, and Roman Shterenberg
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The authors consider a Schrödinger operator $H=-\Delta +V(\vec x)$ in dimension two with a quasi-periodic potential $V(\vec x)$. They prove that the absolutely continuous spectrum of $H$ contains a semiaxis and there is a family of generalized eigenfunctions at every point of this semiaxis with the following properties. First, the eigenfunctions are close to plane waves $e^i\langle \vec \varkappa,\vec x\rangle $ in the high energy region. Second, the isoenergetic curves in the space of momenta $\vec \varkappa $ corresponding to these eigenfunctions have the form of slightly distorted circles with holes (Cantor type structure). A new method of multiscale analysis in the momentum space is developed to prove these results. The result is based on a previous paper on the quasiperiodic polyharmonic operator $(-\Delta)^l+V(\vec x)$, $l>1$. Here the authors address technical complications arising in the case $l=1$. However, this text is self-contained and can be read without familiarity with the previous paper.
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- 2019
27. Harmonic Analysis and Nonlinear Differential Equations
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Michel L. Lapidus, Lawrence H. Harper, Adolfo J. Rumbos, Michel L. Lapidus, Lawrence H. Harper, and Adolfo J. Rumbos
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This volume is a collection of papers dealing with harmonic analysis and nonlinear differential equations and stems from a conference on these two areas and their interface held in November 1995 at the University of California, Riverside, in honor of V. L. Shapiro. There are four papers dealing directly with the use of harmonic analysis techniques to solve challenging problems in nonlinear partial differential equations. There are also several survey articles on recent developments in multiple trigonometric series, dyadic harmonic analysis, special functions, analysis on fractals, and shock waves, as well as papers with new results in nonlinear differential equations. These survey articles, along with several of the research articles, cover a wide variety of applications such as turbulence, general relativity and black holes, neural networks, and diffusion and wave propagation in porous media. A number of the papers contain open problems in their respective areas.
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- 2011
28. The Legacy of Sonya Kovalevskaya
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Linda Keen and Linda Keen
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Sonya Kovalevskaya was a distinguished mathematician and considered by her contemporaries to be among the best of her generation. Her work, ideas, and approach to mathematics are still relevant today, while her accomplishments continue to inspire women mathematicians. The academic year 1985–86 marked the 15th anniversary of the Association for Women in Mathematics and the 25th anniversary of the Mary Ingraham Bunting Institute of Radcliffe College, Harvard University–both organizations that have enhanced women's role in mathematics. These two occasions provided a framework for a Kovalevskaya celebration, which included a symposium at Radcliffe College, and special sessions at the AMS meeting in Amherst, Massachusetts, both in October 1985. The papers in this collection were drawn from those two events. The first group of papers contains background material about Kovalevskaya's life and work, including a discussion of how she has been perceived by the mathematical community over the last century. The rest of the papers contain new mathematics and cover a wide variety of subjects in geometry, analysis, dynamical systems, and applied mathematics. They all involve, in one form or another, Kovalevskaya's main areas of interest—differential equations and mathematical questions arising from physical phenomena.
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- 2011
29. Dynamical Systems and Statistical Mechanics
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Ya. G. Sinaĭ and Ya. G. Sinaĭ
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Dynamical systems and statistical mechanics have been developing in close interaction during the past decade, and the papers in this book attest to the productiveness of this interaction. The first paper in the collection contains a new result in the theory of quantum chaos, a burgeoning line of inquiry that combines mathematics and physics and is likely in time to produce many new connections and applications. Another paper, related to the renormalization group method for the study of maps of the circle with singularities due to a jump in the derivative, demonstrates that the fixed point of the renormgroup can be sufficiently described in this case. In certain situations, the renormgroup methods work better than the traditional KAM method. Other topics covered include thermodynamic formalism for certain infinite-dimensional dynamical systems, numerical simulation of dynamical systems with hyperbolic behavior, periodic points of holomorphic maps, the theory of random media, statistical properties of the leading eigenvalue in matrix ensembles of large dimension, spectral properties of the one-dimensional Schrödinger operator. This volume will appeal to many readers, as it covers a broad range of topics and presents a view of the some of the frontier research in the Soviet Union today.
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- 2018
30. Representation Theory and Dynamical Systems
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A. M. Vershik and A. M. Vershik
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This volume presents research conducted between 1989 and 1991 by the participants in the Leningrad Seminar on representation theory, dynamical systems, and their applications, headed by A. M. Vershik. The primary areas covered here are mathematical physics, Lie groups and their representations, infinite-dimensional groups, topology, and dynamical systems. The book contains a number of useful introductory surveys; for example, one paper by Vaksman and Soibrevebelman provides a systematic description of the theory of quantum groups in the spirit of representation theory—a new and popular area for which there are few introductory surveys. A portion of the book is devoted to adic transformations and substitutions, a new area of ergodic theory. With a balance of survey papers and frontier research results, this book will appeal to graduate students and researchers alike.
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- 2018
31. Nonlinear Stokes Phenomena
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Yu. S. Il’yashenko and Yu. S. Il’yashenko
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The nonlinear Stokes phenomenon occurs in the local theory of differential equations (or, more concisely, local dynamics) and finds application in singularity theory. This book contains a number of papers on this subject, including a survey that begins with Stokes'pioneering works on linear theory and discusses the work of Voronin.
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- 2018
32. Estimates and Asymptotics for Discrete Spectra of Integral and Differential Equations
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M. Sh. Birman and M. Sh. Birman
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The Leningrad Seminar on mathematical physics, begun in 1947 by V. I. Smirnov and now run by O. A. Ladyzhenskaya, is sponsored by Leningrad University and the Leningrad Branch of the Steklov Mathematical Institute of the Academy of Sciences of the USSR. The main topics of the seminar center on the theory of boundary value problems and related questions of analysis and mathematical physics. This volume contains adaptations of lectures presented at the seminar during the academic year 1989-1990. For the most part, the papers are devoted to investigations of the spectrum of the Schrödinger operator (or its generalizations) perturbed by some relatively compact operator. The book studies the discrete spectrum that emerges in the spectral gaps of the nonperturbed operator, and considers the corresponding estimates and asymptotic formulas for spectrum distribution functions in the large-coupling-constant limit. The starting point here is the opening paper, which is devoted to the important case of a semi-infinite gap. The book also covers the case of inner gaps, related questions in the theory of functions, and an integral equation with difference kernel on a finite interval. The collection concludes with a paper focusing on the classical problem of constructing scattering theory for the Schrödinger operator with potential decreasing faster than the Coulomb potential.
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- 2018
33. Topological Classification of Integrable Systems
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A. T. Fomenko and A. T. Fomenko
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In recent years, researchers have found new topological invariants of integrable Hamiltonian systems of differential equations and have constructed a theory for their topological classification. Each paper in this important collection describes one of the “building blocks” of the theory, and several of the works are devoted to applications to specific physical equations. In particular, this collection covers the new topological invariants of integrable equations, the new topological obstructions to integrability, a new Morse-type theory of Bott integrals, and classification of bifurcations of the Liouville tori in integrable systems. The papers collected here grew out of the research seminar “Contemporary Geometrical Methods” at Moscow University, under the guidance of A. T. Fomenko, V. V. Trofimov, and A. V. Bolsinov. Bringing together contributions by some of the experts in this area, this collection is the first publication to treat this theory in a comprehensive way.
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- 2018
34. Sinai’s Moscow Seminar on Dynamical Systems
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L. A. Bunimovich, B. M. Gurevich, Ya. B. Pesin, L. A. Bunimovich, B. M. Gurevich, and Ya. B. Pesin
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This book is a collection of papers written by participants in the seminar of Ya. G. Sinai, which has for thirty years played the leading role in shaping the modern statistical and topological theory of dynamical systems. The seminar has served as the major place for new ideas and approaches in the ergodic theory of dynamical systems. These papers, written by internationally known mathematicians, represent the major part of the enormous variety of Sinai's scientific interests. The following topics are discussed: hyperbolic dynamical systems, limit theorems for dynamical systems with chaotic behavior, thermodynamic formalism, symbolic dynamics, symplectic geometry, statistical mechanics, and more. The book reflects the unique style of Sinai's school and its interest in various interconnections between ergodic theory and various other branches of mathematics and physics.
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- 2016
35. Carleman Estimates, Observability Inequalities and Null Controllability for Interior Degenerate Nonsmooth Parabolic Equations
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Genni Fragnelli, Dimitri Mugnai, Genni Fragnelli, and Dimitri Mugnai
- Abstract
The authors consider a parabolic problem with degeneracy in the interior of the spatial domain, and they focus on observability results through Carleman estimates for the associated adjoint problem. The novelties of the present paper are two. First, the coefficient of the leading operator only belongs to a Sobolev space. Second, the degeneracy point is allowed to lie even in the interior of the control region, so that no previous result can be adapted to this situation; however, different cases can be handled, and new controllability results are established as a consequence.
- Published
- 2016
36. Differential Operators and Spectral Theory
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V. Buslaev, M. Solomyak, D. Yafaev, V. Buslaev, M. Solomyak, and D. Yafaev
- Abstract
This volume contains a collection of original papers in mathematical physics, spectral theory, and differential equations. The papers are dedicated to the outstanding mathematician, Professor M. Sh. Birman, on the occasion of his 70th birthday. Contributing authors are leading specialists and close professional colleagues of Birman. The main topics discussed are spectral and scattering theory of differential operators, trace formulas, and boundary value problems for PDEs. Several papers are devoted to the magnetic Schrödinger operator, which is within Birman's current scope of interests and recently has been studied extensively. Included is a detailed survey of his mathematical work and an updated list of his publications. This book is aimed at graduate students and specialists in the above-mentioned branches of mathematics and theoretical physicists. The biographical section will be of interest to readers concerned with the scientific activities of Birman and the history of those branches of analysis and spectral theory where his contributions were important and often decisive. Features: The first detailed survey of Birman's mathematical work; includes an updated bibliography. New material on the history of some branches of analysis. Prominent authors: Lieb, Agmon, Deift, Simon, Ladyzhenskaya, and others. All original works, containing new results in fields of great current interest.
- Published
- 2016
37. Nonlinear Evolution Equations
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N. N. Uraltseva and N. N. Uraltseva
- Abstract
This collection focuses on nonlinear problems in partial differential equations. Most of the papers are based on lectures presented at the seminar on partial differential equations and mathematical physics at St. Petersburg University. Among the topics explored are the existence and properties of solutions of various classes of nonlinear evolution equations, nonlinear imbedding theorems, bifurcations of solutions, and equations of mathematical physics (Navier-Stokes type equations and the nonlinear Schrödinger equation). The book will be useful to researchers and graduate students working in partial differential equations and mathematical physics.
- Published
- 2016
38. Asymptotic Methods for Wave and Quantum Problems
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M. V. Karasev and M. V. Karasev
- Abstract
The collection consists of four papers in different areas of mathematical physics united by the intrinsic coherence of the asymptotic methods used. The papers describe both the known results and most recent achievements, as well as new concepts and ideas in mathematical analysis of quantum and wave problems. In the introductory paper “Quantization and Intrinsic Dynamics” a relationship between quantization of symplectic manifolds and nonlinear wave equations is described and discussed from the viewpoint of the weak asymptotics method (asymptotics in distributions) and the semiclassical approximation method. It also explains a hidden dynamic geometry that arises when using these methods. Three other papers discuss applications of asymptotic methods to the construction of wave-type solutions of nonlinear PDE's, to the theory of semiclassical approximation (in particular, the Whitham method) for nonlinear second-order ordinary differential equations, and to the study of the Schrödinger type equations whose potential wells are sufficiently shallow that the discrete spectrum contains precisely one point. All the papers contain detailed references and are oriented not only to specialists in asymptotic methods but also to a wider audience of researchers and graduate students working in partial differential equations and mathematical physics.
- Published
- 2016
39. Topology and Geometry: Commemorating SISTAG
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A. J. Berrick, Man Chun Leung, Xingwang Xu, A. J. Berrick, Man Chun Leung, and Xingwang Xu
- Abstract
This book presents nineteen articles written by participants in the Singapore International Symposium in Topology and Geometry (SISTAG), held July 2–6, 2001, at the National University of Singapore. Rather than being a simple snapshot of the meeting in the form of a proceedings, it serves as a commemorative volume consisting of papers selected to show the diversity and depth of the mathematics presented at SISTAG. The book contains articles on low-dimensional topology, algebraic, differential and symplectic geometry, and algebraic topology. While papers reflect the focus of the conference, many documents written after SISTAG and included in this volume represent the latest thinking in the fields of topology and geometry. This volume is of interest to graduate students and mathematicians working in the fields of algebraic, differential and symplectic geometry, algebraic, geometric and low-dimensional topology, and mathematical physics.
- Published
- 2011
40. Advances in Differential Equations and Mathematical Physics
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Yulia Karpeshina, Günter Stolz, Rudi Weikard, Yanni Zeng, Yulia Karpeshina, Günter Stolz, Rudi Weikard, and Yanni Zeng
- Abstract
This volume presents the proceedings of the 9th International Conference on Differential Equations and Mathematical Physics. It contains 29 research and survey papers contributed by conference participants. The papers represent some of the most interesting results and the major areas of research that were covered, including spectral theory with applications to non-relativistic and relativistic quantum mechanics, including time-dependent and random potential, resonances, many body systems, pseudodifferential operators and quantum dynamics, inverse spectral and scattering problems, the theory of linear and nonlinear partial differential equations with applications in fluid dynamics, conservation laws and numerical simulations, as well as equilibrium and nonequilibrium statistical mechanics. The volume is intended for graduate students and researchers interested in mathematical physics.
- Published
- 2011
41. Integral geometry
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Robert L Bryant, Victor Guillemin, Sigurdur Helgason, R O Wells Jr, Robert L Bryant, Victor Guillemin, Sigurdur Helgason, and R O Wells Jr
- Abstract
The topic of integral geometry is not as well known as its counterpart, differential geometry. However, research in integral geometry has indicated that this field may yield as equally deep insights as differential geometry has into the global and local nature of manifolds and the functions on them. In 1984, an AMS-IMS-SIAM joint summer research conference on integral geometry was held at Bowdoin College. This volume consists of papers presented there. The papers range from purely expository to quite technical and represent a good survey of contemporary work in integral geometry. Three major areas are covered: the classical problems of computing geometric invariants by statistical averaging procedures; the circle of ideas concerning the Radon transform, going back to the seminal work of Funck and Radon around 1916–1917; and integral-geometric transforms which are now being used in the study of field equations in mathematical physics. Some of these areas also involve group-representation theoretic problems.
- Published
- 2011
42. Mathematical Developments Arising from Linear Programming
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Jeffrey C. Lagarias, Michael J. Todd, Jeffrey C. Lagarias, and Michael J. Todd
- Abstract
In recent years, there has been intense work in linear and nonlinear programming, much of it centered on understanding and extending the ideas underlying N. Karmarkar's interior-point linear programming algorithm, which was presented in 1984. This interdisciplinary research was the subject of an AMS Summer Research Conference on Mathematical Developments Arising from Linear Programming, held at Bowdoin College in the summer of 1988, which brought together researchers in mathematics, computer science, and operations research. This volume contains the proceedings from the conference. Among the topics covered in this book are: completely integrable dynamical systems arising in optimization problems, Riemannian geometry and interior-point linear programming methods, concepts of approximate solution of linear programs, average case analysis of the simplex method, and recent results in convex polytopes. Some of the papers extend interior-point methods to quadratic programming, the linear complementarity problem, convex programming, multi-criteria optimization, and integer programming. Other papers study the continuous trajectories underlying interior point methods. This book will be an excellent resource for those interested in the latest developments arising from Karmarkar's linear programming algorithm and in path-following methods for solving differential equations.
- Published
- 2011
43. Microlocal analysis
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M Salah Baouendi, Richard Beals, Linda Preiss Rothschild, M Salah Baouendi, Richard Beals, and Linda Preiss Rothschild
- Abstract
This volume is the proceedings of the AMS-IMS-SIAM Joint Summer Research Conference on Microlocal Analysis and its Applications to Partial Differential Equations, held July 10–16, 1983 in Boulder, Colorado. It contains refereed articles which were delivered at the conference. Two of the papers are survey articles, one on uniqueness and non-uniqueness in the Cauchy problem and one on hypoanalytic structures; the rest are either detailed announcements or complete papers covering such areas as spectrum of operators, nonlinear problems, asymptotics, pseudodifferential operators of multiple characteristics and operators on groups and homogeneous spaces. The volume should be useful to active mathematicians and graduate students working on linear and nonlinear partial differential equations and related areas.
- Published
- 2011
44. The Geometrical Study of Differential Equations
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Joshua A. Leslie, Thierry P. Robart, Joshua A. Leslie, and Thierry P. Robart
- Abstract
This volume contains papers based on some of the talks given at the NSF-CBMS conference on “The Geometrical Study of Differential Equations” held at Howard University (Washington, DC). The collected papers present important recent developments in this area, including the treatment of nontransversal group actions in the theory of group invariant solutions of PDEs, a method for obtaining discrete symmetries of differential equations, the establishment of a group-invariant version of the variational complex based on a general moving frame construction, the introduction of a new variational complex for the calculus of difference equations and an original structural investigation of Lie-Bäcklund transformations. The book opens with a modern and illuminating overview of Lie's line-sphere correspondence and concludes with several interesting open problems arising from symmetry analysis of PDEs. It offers a rich source of inspiration for new or established researchers in the field. This book can serve nicely as a companion volume to Selected Topics in the Geometrical Study of Differential Equations, by Niky Kamran, in the AMS series, CBMS Regional Conference Series in Mathematics.
- Published
- 2011
45. Nonlinear Diffusion Equations and Curvature Conditions in Metric Measure Spaces
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Luigi Ambrosio, Andrea Mondino, Giuseppe Savaré, Luigi Ambrosio, Andrea Mondino, and Giuseppe Savaré
- Abstract
The aim of this paper is to provide new characterizations of the curvature dimension condition in the context of metric measure spaces $(X,\mathsf d,\mathfrak m)$. On the geometric side, the authors'new approach takes into account suitable weighted action functionals which provide the natural modulus of $K$-convexity when one investigates the convexity properties of $N$-dimensional entropies. On the side of diffusion semigroups and evolution variational inequalities, the authors'new approach uses the nonlinear diffusion semigroup induced by the $N$-dimensional entropy, in place of the heat flow. Under suitable assumptions (most notably the quadraticity of Cheeger's energy relative to the metric measure structure) both approaches are shown to be equivalent to the strong $\mathrm {CD}^{•}(K,N)$ condition of Bacher-Sturm.
- Published
- 2020
46. Differential Equations and Mathematical Physics
- Author
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Rudi Weikard, Gilbert Weinstein, Rudi Weikard, and Gilbert Weinstein
- Abstract
This volume contains the proceedings of the 1999 International Conference on Differential Equations and Mathematical Physics. The contributions selected for this volume represent some of the most important presentations by scholars from around the world on developments in this area of research. The papers cover topics in the general area of linear and nonlinear differential equations and their relation to mathematical physics, such as multiparticle Schrödinger operators, stability of matter, relativity theory, fluid dynamics, spectral and scattering theory including inverse problems.
- Published
- 2017
47. Fundamental Solutions and Local Solvability for Nonsmooth Hörmander’s Operators
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Marco Bramanti, Luca Brandolini, Maria Manfredini, Marco Pedroni, Marco Bramanti, Luca Brandolini, Maria Manfredini, and Marco Pedroni
- Abstract
The authors consider operators of the form $L=\sum_{i=1}^{n}X_{i}^{2}+X_{0}$ in a bounded domain of $\mathbb{R}^{p}$ where $X_{0},X_{1},\ldots,X_{n}$ are nonsmooth Hörmander's vector fields of step $r$ such that the highest order commutators are only Hölder continuous. Applying Levi's parametrix method the authors construct a local fundamental solution $\gamma$ for $L$ and provide growth estimates for $\gamma$ and its first derivatives with respect to the vector fields. Requiring the existence of one more derivative of the coefficients the authors prove that $\gamma$ also possesses second derivatives, and they deduce the local solvability of $L$, constructing, by means of $\gamma$, a solution to $Lu=f$ with Hölder continuous $f$. The authors also prove $C_{X,loc}^{2,\alpha}$ estimates on this solution.
- Published
- 2017
48. Optimal Regularity and the Free Boundary in the Parabolic Signorini Problem
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Donatella Danielli, Nicola Garofalo, Arshak Petrosyan, Tung To, Donatella Danielli, Nicola Garofalo, Arshak Petrosyan, and Tung To
- Abstract
The authors give a comprehensive treatment of the parabolic Signorini problem based on a generalization of Almgren's monotonicity of the frequency. This includes the proof of the optimal regularity of solutions, classification of free boundary points, the regularity of the regular set and the structure of the singular set.
- Published
- 2017
49. Modern Theory of Dynamical Systems
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Anatole Katok, Yakov Pesin, Federico Rodriguez Hertz, Anatole Katok, Yakov Pesin, and Federico Rodriguez Hertz
- Abstract
This volume is a tribute to one of the founders of modern theory of dynamical systems, the late Dmitry Victorovich Anosov. It contains both original papers and surveys, written by some distinguished experts in dynamics, which are related to important themes of Anosov's work, as well as broadly interpreted further crucial developments in the theory of dynamical systems that followed Anosov's original work. Also included is an article by A. Katok that presents Anosov's scientific biography and a picture of the early development of hyperbolicity theory in its various incarnations, complete and partial, uniform and nonuniform.
- Published
- 2017
50. Global Minimization of Nonconvex Energy Functions: Molecular Conformation and Protein Folding
- Author
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P. M. Pardalos, D. Shalloway, G. Xue, P. M. Pardalos, D. Shalloway, and G. Xue
- Abstract
This book contains refereed papers presented at a remarkable interdisciplinary scientific meeting attended by a mix of leading biochemists and computer scientists held at DIMACS in March 1995. It describes the development of a variety of new methods which are being developed for attacking the important problem of molecular structure. Features: Focuses on global optimization algorithms and heuristics for molecular conformation and protein folding problems Presents the most efficient recent algorithms Covers a spectrum of algorithmic issues and applications
- Published
- 2017
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