A note on Gronwall-Bellman integral inequality (Q2723982)

In the present paper the author proves that the inequalityNEWLINENEWLINENEWLINENEWLINE\[NEWLINEu(t) \geq g(t) + \Biggl( \int_a ^t k(t,s) u^p(s) ds \Biggr)^{1/p},NEWLINE\]NEWLINE where \(u(t), g(t), k(t,s), k_t(t,s)\) are nonnegative continuous functions and \(p \leq 1\), implies NEWLINE\[NEWLINE u(t) \geq g(t) + {{(\int_a ^t \varepsilon (s) g^p(s)R(s) ds)^{1/p}} \over {1 - (1 \varepsilon (t))^{1/p}}}NEWLINE\]NEWLINE where \(\varepsilon (t) = e^{\int_a^t k(t,s) ds}\), \(a \leq s \leq t \leq b\), and \(R(t) = k(t,t) + \int_a^t k_t(t,s) ds\). NEWLINENEWLINENEWLINEThis result generalizes some earlier results of Willett and Wong.