References
- J. Analysis v.6 Solution of Boundary Value Problems for Linear Second Order ODE's by Using Measure Theory S. Effati;A. V. Kamyad
- Rend. Sem. Mat. Univ. Politec. Torino. v.48 Existence of solutions of a boundary value problem through the solution map of a linearized type problem G. Anichini;G. Conti
- Nonlinear Anal. v.6 Existence of solutions to boundary value problems for ordinary differential equations L. H. Erbe
- J. Differential Equations v.26 Ordinary differential equations with nonlinear boundary conditions R. E. Gaines;J. Mawhin
- Pacific J. Math. v.75 Uniqueness of solutions of boundary value problems of systems of ordinary differential equations H. Gingold
- J. Math. Anal. Appl. v.73 Uniqueness criteria for second order nonlinear boundary value problems H. Gingold
- Pacific J. Math. v.74 On a theorem of S. Bernstein A. Granas;R. B. Guenther;J. W. Lee
- J. Math. Pures appl. v.70 Some general existence principles in the Caratheodory theory of nonlinear differential systems A. Granas;R. B. Guenther;J. W. Lee
- J. Differential Equations v.77 Optimality for boundary value problems for Lipschitz equations D. Hankerson;J. Henderson
- J. Differential Equations v.95 On multiple solutions of a nonlinear Neumann problem G. A. Harris
- J. Differential Equations v.26 On a class of nonlinear boundary value problems R. Kannan;J. Locker
- J. Math. Appl. v.26 On a nonlinear two-point boundary value problem A. C. Lazer;D. E. Leach
- CBMS Regional Conference Series in Mathematics v.40 Topological degree methods in nonlinear boundary value problems J. Mawhin
- Pacific J. Math. v.122 Solvability of various boundary value problems for the equation x" = f(t,x,x'x") - y W. V. Petryshyn
- J. Math. Anal. Appl. v.135 Solution of a nonlinear two-point boundary value problem with Neumann-type boundary data J. Saranen;S. Seikkala
- Siam J. Math. Anal. v.12 On the interval of disconjugacy of linear autonomous differential equations J. Troch
- Siam J. Control and optimization v.33 Neumann boundary value problems for second-order ordinary differential equations across resonance W. Huaizhong;L. Yong
- Topological vector spaces, distributions and kernels F. Treves
- Control and optimization;the linear treatment of nonlinear problems J. E. Rubio
- Lectures on analysis G. Choquet
- Linear programming S. I. Gass