Orthonormal Bernstein Galerkin technique for computations of higher order eigenvalue problems. [PDF]
MethodsX, 2023 Farzana H +3 more
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Solving inverse Sturm-Liouville problems: theory and practice
, 2017 Theoretical results on the solution of inverse Sturm-Liouville problems generally consider only idealized problems requiring much more data than is available in real applications.
Andrew, Alan
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Positive Solutions of Nabla Fractional Sturm–Liouville Problems
Известия Иркутского государственного университета: Серия "Математика"This article discusses the existence of positive solutions to Sturm–Liouville boundary value problems for Riemann–Liouville nabla fractional difference equations. The results obtained here shall generalize the existing ones.
J. M. Jonnalagadda, J. E. N. Vald´es
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Inverse problems for discrete Hermite nabla difference equation
Applied Mathematics in Science and EngineeringInverse problems are studied for discrete Hermite equations with nabla difference including initial value, terminal value and Sturm–Liouville problems. A quantitative study is conducted to obtain the solution.
B. Shiri, Y. Guang, D. Baleanu
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DeepGreen: deep learning of Green's functions for nonlinear boundary value problems. [PDF]
Sci Rep, 2021 Gin CR, Shea DE, Brunton SL, Kutz JN.
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Heat kernel asymptotics for operator valued Sturm-Liouville problems
, 1988 Heat kernel asymptotics for operator valued Sturm-Liouville problems. - In: Analysis. 8. 1988. S.
Brüning, Jochen
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A high-speed method for eigenvalue problems. IV. Sturm-Liouville-type differential equations
, 2019 We present a new version MEV4 of the program package MEV3 by Milne's method generalized for the eigenvalue problem of the linear differential equation of the Sturm-Liouville-type.
T. Yano (8091596) +7 more
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Laguerre Wavelet Approach for a Two-Dimensional Time-Space Fractional Schrödinger Equation. [PDF]
Entropy (Basel), 2022 Bekiros S +5 more
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Two Chebyshev Spectral Methods for Solving Normal Modes in Atmospheric Acoustics. [PDF]
Entropy (Basel), 2021 Wang Y, Tu H, Liu W, Xiao W, Lan Q.
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A New Angle on Sturm-Liouville Problems
Rocky Mountain Journal of Mathematics, 1995 In this note Sturm Liouville problems \(- (py')' + qy = \lambda ry\), where \(p > 0\), \(r > 0\), \({1 \over p}, q,r \in L_1 ([0,1], \mathbb{R})\), with boundary conditions \(y(0) \cos \beta_0 = (py') (0) \sin \beta_0\), \(0 \leq \beta_0 < \pi\), \((a \lambda + b) y(0) = (c \lambda + d) (py') (0)\), where \(0 \neq (a,b,c,d) \in \mathbb{R}^4\), are ...
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