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Abstract
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By using fixed point results on cones, we study the existence of solutions for the
singular nonlinear fractional boundary value problem
cDαu(t) = f (t, u(t), u�(t), cDβu(t)),
u(0) = au(1), u�(0) = b cDβu(1), u��(0) = u���(0) = u(n–1)(0) = 0,
where n ≥ 3 is an integer, α ∈ (n – 1, n), 0 < β < 1, 0 < a < 1, 0 < b < �(2 – β), f is an
Lq-Caratheodory function, q > 1
α–1 and f (t, x, y, z) may be singular at value 0 in one
dimension of its space variables x, y, z. Here, cD stands for the Caputo fractional
derivative.
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