Let $f$ be an $\alpha$-Holder function. Anyone help me to show that
$f(0) = \frac{1}{\sigma}\int_{0}^{\sigma}f(s) ds - \int_{0}^{\sigma}\frac{1}{t^2}(\int_{0}^{t}f(t)-f(s)ds) dt $ for all $\sigma > 0$
Let $f$ be an $\alpha$-Holder function. Anyone help me to show that
0 thành viên, 2 khách, 0 thành viên ẩn danh