| 摘 要: | In this paper we study the Robin boundary value problem with a small parameterεy″=f(t, y, ω(ε)y′, ε),a_0y(0) +b_0y′(0)=(ε), a_1y(1)+b_1y′(1)=η(ε),where the function ω(ε) is continuous on ε≥0 with ω(0)=0. Assuming all known functions are suitably smooth, f satisfies Nagumo's condition, f_y>0, a_t~2-b_t~2≠0, (-1)~ia_ib_i≤0 (i=0, 1) and the reduced equation 0=f(t, y, 0, 0) has a solution y(t) (0≤t≤1), we prove the existence and the uniqueness of the solution for the boundary value problem and givo an asymptotic expansion of the solution in the power ε~(1/2) which is uniformly valid on 0≤t≤1.
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