Some functional relations for two point boundary value problems. II: The inhomogeneous case
DOI10.1016/0096-3003(75)90007-7zbMath0339.34014OpenAlexW2079904315MaRDI QIDQ1230890
Publication date: 1975
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0096-3003(75)90007-7
Nonlinear boundary value problems for ordinary differential equations (34B15) Estimation and detection in stochastic control theory (93E10) Numerical solution of boundary value problems involving ordinary differential equations (65L10) Linear boundary value problems for ordinary differential equations (34B05) Scattering theory of linear operators (47A40) Boundary value problems for linear first-order PDEs (35F15) Hamilton-Jacobi theories (49L99)
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Cites Work
- Unnamed Item
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- A note on invariant imbedding and generalized semigroups
- Invariant embedding and nonvariational principles in analytical dynamics
- A numerical algorithm suggested by problems of transport in periodic media
- A generalized invariant imbedding equation
- Functional relationships for Fredholm integral equations arising from pseudo-transport problems
- A generalized invariant imbedding equation. II
- Some invariance principles for two-point boundary value problems
- Optimal linear filtering theory and radiative transfer: Comparisons and interconnections
- Initial value methods in detection and communication theory
- Riccati differential equations
- Generalized trigonometric identities and invariant imbedding
- A numerical algorithm suggested by problems of transport in periodic media: The matrix case
- Some functional relations for two point boundary value problems
- Sur un problème du calcul de probabilité (I) (Le mouvement d'une molécule sur une droite)
- On a Certain Linear Fractional Transformation
- On the Relation of Transmission-Line Theory to Scattering and Transfer
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