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Spherical Spline Solutions of an Inhomogeneous Biharmonic Equation
Computational Mathematics and Mathematical PhysicsAn inhomogeneous biharmonic equation is considered on the unit sphere in three-dimensional space. The solution of this equation, belonging to the Sobolev space on the sphere, is approximated by a sequence of solutions of the same equation but with specific right-hand sides, represented as linear combinations of shifts of the Dirac delta function. It is
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Scattering of radial solutions to the inhomogeneous nonlinear Schrödinger equation
Nonlinear Analysis: Theory, Methods & Applications, 2021Luccas Campos
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Notes on the Inhomogeneous Schrödinger Equation
1986In [1] and [2] we discussed the solution of the homogeneous Schrfidinger equation \(\left( {\frac{\Delta } {2} + q} \right )u = 0 \) with boundary condition. It is customary in classical analysis to treat this problem as equivalent to the solution of the corresponding inhomogeneous equation \(\left( {\frac{\Delta }{2} + q} \right)u = 0\) with vanishing
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Fujita exponents for an inhomogeneous parabolic equation with variable coefficients
Mathematical Methods in the Applied Sciences, 2022Bingchen Liu, Fengjie Li
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Hölder gradient regularity for the inhomogeneous normalized p(x)-Laplace equation
Journal of Mathematical Analysis and Applications, 2022Jarkko Siltakoski
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A convergent Born series for solving the inhomogeneous Helmholtz equation in arbitrarily large media
Journal of Computational Physics, 2016Gerwin Osnabrugge +2 more
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On the inhomogeneous biharmonic nonlinear Schrödinger equation: Local, global and stability results
Nonlinear Analysis: Real World Applications, 2020Ademir Pastor
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