71 citations to https://www.mathnet.ru/rus/im640
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М. О. Аветисян, Х. А. Хачатрян, “О качественных свойствах решения для одной системы нелинейных бесконечных алгебраических уравнений”, Владикавк. матем. журн., 24:4 (2022), 5–18
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Х. А. Хачатрян, А. С. Петросян, “Вопросы существования и единственности решения одного класса нелинейных интегральных уравнений на всей прямой”, Вестн. Сам. гос. техн. ун-та. Сер. Физ.-мат. науки, 26:3 (2022), 446–479
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Mohammad M. Al-Gharabli, Aissa Guesmia, Salim A. Messaoudi, “Some Existence and Exponential Stability Results for a Plate Equation with Strong Damping and a Logarithmic Source Term”, Differ Equ Dyn Syst, 2022
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Piskin E., Boulaaras S., Irkil N., “Qualitative Analysis of Solutions For the P-Laplacian Hyperbolic Equation With Logarithmic Nonlinearity”, Math. Meth. Appl. Sci., 44:6 (2021), 4654–4672
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Boulaaras S.M., Choucha A., Zara A., Abdalla M., Cheri B.-B., “Global Existence and Decay Estimates of Energy of Solutions For a New Class of P-Laplacian Heat Equations With Logarithmic Nonlinearity”, J. Funct. space, 2021 (2021), 5558818
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Kh. A. Khachatryan, H. S. Petrosyan, “Integral Equations on the Whole Line with Monotone Nonlinearity and Difference Kernel”, J Math Sci, 255:6 (2021), 790
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Mezouar N., Boulaaras S.M., Allahem A., “Global Existence of Solutions For the Viscoelastic Kirchhoff Equation With Logarithmic Source Terms”, Complexity, 2020 (2020), 7105387
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Liu G., “The Existence, General Decay and Blow-Up For a Plate Equation With Nonlinear Damping and a Logarithmic Source Term”, Electron. Res. Arch., 28:1 (2020), 263–289
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Al-Gharabli M.M., Guesmia A., Messaoudi S.A., “Well-Posedness and Asymptotic Stability Results For a Viscoelastic Plate Equation With a Logarithmic Nonlinearity”, Appl. Anal., 99:1 (2020), 50–74
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Х. А. Хачатрян, “О разрешимости некоторых нелинейных граничных задач для сингулярных интегральных уравнений типа свертки”, Тр. ММО, 81, № 1, МЦНМО, М., 2020, 3–40 ; Kh. A. Khachatryan, “Solvability of some nonlinear boundary value problems for singular integral equations of convolution type”, Trans. Moscow Math. Soc., 81:1 (2020), 1–31