We establish a criterion for the existence of solutions of linear inhomogeneous boundary-value problems in a Banach space. We obtain conditions for the normal solvability of such problems and consider their special cases, namely, countable-dimensional boundary-value problems.
Statement of the ProblemIn a Banach space B 1 , we consider the differential equationwhere1 ) is the Banach space of vector functions continuous on [a; b], and A(t) is an operator function that acts from the Banach space B 1 into itself, is strongly continuous [1, p. 141], and has the norm |||A||| = sup t∈[a;b]Then a solution x(t) of the equationds is continuously differentiable at every point t ∈ [a; b] and satisfies Eq. (1) everywhere on [a; b]. Thus, we seek a solution x(t) of Eq. (1) in the space C 1 ([a; b], B 1 ) of functions continuously differentiable on [a; b] and taking values in the Banach space B 1 . Together with the operator equation (1), we consider the boundary condition
We obtain a criterion for the existence of solutions of degenerate inhomogeneous Fredholm boundaryvalue problems for a system of ordinary differential equations under the assumption that the degenerate system of differential equations can be reduced to the central canonical form. The results are illustrated by examples.
Statement of the ProblemConsider the problem of finding conditions for the existence of a solution x(t) ∈ C 1 [a; b] of the degenerate linear inhomogeneous boundary-value problemwhere A(t) and B(t) are n×n matrices whose components are real functions continuous on [a; b], A(t), B(t) ∈ C[a; b], detB(t) = 0, f(t) is an n-dimensional column vector from the space C[a; b], α is an m-dimensional column vector of constants, and l is a linear vector functional defined on the space of n-dimensional vector functions continuous on [a; b], namely, l = col (l 1 , . . . , l m ) : C[a; b] → R m , l i : C[a; b] → R [1]. We assume that system (1) can be reduced to the central canonical form by a nondegenerate linear transformation [2].Parallel with the inhomogeneous boundary-value problem (1), (2), we consider the homogeneous boundaryvalue problemAccording to [3, p. 62; 4], a general solution of the system of linear differential equations (1) has the form x(t, c) = X n−s (t)c +x(t) ∀c ∈ R n−s ,
UDC 517.9We obtain necessary and sufficient conditions for the existence of solutions of weakly nonlinear boundaryvalue problems for differential equations in a Banach space. A convergent iterative procedure is proposed for the determination of solutions. We also establish a relationship between necessary and sufficient conditions.
Statement of the Problem and Preliminary ResultsIn a Banach space B 1 ; we consider a boundary-value problem for a nonlinear differential equation with small nonnegative parameter " of the form(1)x. / D˛C "J.x. ; "/; "/;where the vector function f .t / acts from a segment OEaI b into the Banach space B 1 ; i.e.,t2OEaIb kf .t/k ½ ; C.OEaI b; B 1 / is the Banach space of vector functions continuous on OEaI b; the operator function A.t/ acts from the Banach space B 1 into itself for every t 2 OEaI b; is strongly continuous [1, p. 141], and has the norm jjjAjjj D sup t 2OEaIbkA.t/k < 1;Z.x; t; "/ is a nonlinear vector function continuously differentiable with respect to x in the neighborhood of a generating solution and continuous in t and "; i.e., Z. ; t; "/ 2 C 1 OEkx x 0 k Ä q; Z.x; ; "/ 2 C .OEaI b; B 1 / ; Z.x; t; / 2 C OE0I " 0 ;q and " 0 are sufficiently small constants,˛is an element of the space B 2 ; i.e.,˛2 B 2 ; and J.x. ; "/; "/ is a nonlinear bounded vector functional continuously differentiable in the sense of Fréchet with respect to x and
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