Fuzzy Fractional Boundary Value Problems With Hilfer Fractional Derivatives by Elhoussain Arhrrabi, M’hamed Elomari, Said Melliani, Lalla Saadia Chadli

Unified existence results for nonlinear fractional boundary value problems by Imran Talib, Asmat Batool, Muhammad Bilal Riaz, Md. Nur Alam

“…In this work, we focus on investigating the existence of solutions to nonlinear fractional boundary value problems (FBVPs) with generalized nonlinear boundary conditions. …”
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Floquet boundary value problem of fractional functional differential equations by Yong Zhou, Yuansheng Tian, Yun-Yun He

“…In this paper, we prove the existence of positive solutions for Floquet boundary value problem concerning fractional functional differential equations with bounded delay. …”
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Nonlinear initial boundary-value problems with Riesz fractional derivative by Martin P. Arciga-Alejandre

“…We consider an initial boundary-value problem for a nonlinear partial differential equation with fractional derivative of Riesz type on a half-line. …”
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On the boundary value problem for the loaded parabolic equations with irregular coefficients by M.T. Jenaliyev, A.S. Kassymbekova

“…Along with the initial boundary value problem, the corresponding adjoint boundary value problem is investigated. …”
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Numerical solution of the boundary value problems for the parabolic equation with involution by A. Ashyralyev, C. Ashyralyyev, A.M.S. Ahmed

“… In this work, we study two boundary value problems for involutary parabolic equation with the first and second kind conditions. …”
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Sturm-Liouville boundary value problems and Lagrange interpolation series by W.N. EVERITT, G. SCHOTTLER, P.L. BUTZER

“…Recent results have shown that one important and significant case of this connection is to be found in the generation of these Kramer-type kernels from self-adjoint boundary value problems, determined by symmetric ordinary linear differential expressions defined on intervals of the real line. …”
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On the Solvability of Fourth-Order Two-Point Boundary Value Problems by Ravi P. Agarwal, Petio S. Kelevedjiev

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Strictly localized bounding functions and Floquet boundary value problems by S. Cecchini, Luisa Malaguti, Valentina Taddei

Subjects: “…multivalued boundary value problems…”
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Multi-point boundary-value problems for the p-Laplacian at resonance by Xiaohong Ni, Weigao Ge

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On the existence of solutions for a boundary value problem on the half-line by Marek Galewski, Toufik Moussaoui, Ibrahim Soufi

Subjects: “…dirichlet boundary value problem…”
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Boundary Value Problems For Caputo-Hadamard Fractional Differential Equations by Wafaa Benhamida, Samira Hamani, Johnny Henderson

“…In this paper, we investigate the existence of solutions of a boundary value problem for Caputo-Hadamard fractional differential equations. …”
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Overdetermined boundary value problems with strongly nonlinear elliptic PDE by Boqiang Lv, Fengquan Li, Weilin Zou

Subjects: “…overdetermined boundary value problems…”
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A Numerical Approach for Dealing with Fractional Boundary Value Problems by Abeer A. Al-Nana, Iqbal M. Batiha, Shaher Momani

Subjects: “…fractional boundary value problem…”
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Waves described in the adjoint boundary value problem Helmholtz equation by A.S. Raevskii, S.B. Raevskii, A.Yu. Sedakov

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Boundary-value problems for the biharmonic equation with a linear parameter by Yakov Yakubov

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On the Non-Local Boundary Value Problem from the Probabilistic Viewpoint by Mirko D’Ovidio

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Boundary-value problems of nonstationary transfer for generalized energy equation. by E. M. Kartashov, L. M. Ozherelkova, I. V. Antonova

“…New analytic solvings of boundary-value problems of transfer for the hyperbolic type equations are surveyed.…”
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A third order nonlocal boundary value problem at resonance by E. Kaufmann

“…We consider the third-order nonlocal boundary value problem \begin{eqnarray*} &&u'''(t) = f(t, u(t)), \quad \mbox{a.e. in } (0, 1),\\ &&u(0) = 0, \, u'(\rho) = 0,\\ &&u''(1) = \lambda[u''], \end{eqnarray*} where $0 < \rho < 1,$ the nonlinear term $f$ satisfies Carath\'{e}odory conditions with respect to $L^1[0, T]$, $\lambda [v] = \int_0^1 \! …”
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An inverse boundary value problem for transverse vibrations of a bar by Yashar T. Mehraliyev, M. J. Huntul, Aysel T. Ramazanova, Mohammad Tamsir, Homan Emadifar

“…Boundary Value Problems…”
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