Basic theory of differential equations with linear perturbations of second type on time scales
Boundary Value Problems, 2019 In this paper, we develop the theory of differential equations with linear perturbations of second type on time scales. An existence theorem for differential equations with linear perturbations of second type on time scales is given under D $\mathscr{D}$
Yige Zhao +3 more
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Gaussian Processes for Data Fulfilling Linear Differential Equations
Proceedings, 2019 A method to reconstruct fields, source strengths and physical parameters based on Gaussian process regression is presented for the case where data are known to fulfill a given linear differential equation with localized sources.
Christopher G. Albert
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Fast-forwarding quantum algorithms for linear dissipative differential equations [PDF]
QuantumWe establish improved complexity estimates of quantum algorithms for linear dissipative ordinary differential equations (ODEs) and show that the time dependence can be fast-forwarded to be sub-linear.
Dong An, Akwum Onwunta, Gengzhi Yang
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Wavelets based physics informed neural networks to solve non-linear differential equations. [PDF]
Sci Rep, 2023 Uddin Z, Ganga S, Asthana R, Ibrahim W.
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Note on the Application of Divergent Series for Finding a Particular Solution to a Nonhomogeneous Linear Ordinary Differential Equation with Constant Coefficients [PDF]
, 2021 Jozef Fecenko
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On the Stability and Null-Controllability of an Infinite System of Linear Differential Equations. [PDF]
J Dyn Control Syst, 2023 Azamov A +3 more
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Simple Equations Method and Non-Linear Differential Equations with Non-Polynomial Non-Linearity. [PDF]
Entropy (Basel), 2021 Vitanov NK, Dimitrova ZI.
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Lyapunov-type inequalities for third-order linear differential equations
Electronic Journal of Differential Equations, 2017 In this article, we establish new Lyapunov-type inequalities for third-order linear differential equations $$ y'''+q( t) y=0, $$ under the three-point boundary conditions $$ y( a) =y( b) =y( c) =0 $$ and $$ y( a) =y''( d) =y( b) =0 $$ by ...
Mustafa Fahri Aktas, Devrim Cakmak
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Notes on oscillation of linear delay differential equations
Advances in Difference Equations, 2018 This paper deals with the oscillation criteria for the linear delay differential equations. We present new sufficient conditions for the oscillation of all solutions of such equations.
Božena Dorociaková +2 more
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A Sharp Existence and Uniqueness Theorem for Linear Fuchsian Partial Differential Equations [PDF]
, 2001 Jose Ernie C. Lope
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