摘要: Green-Osher不等式是一般严格凸函数的曲率积分不等式，本文则考虑一些常见的特殊凸函数在Green-Osher不等式中得到的曲率积分不等式，本文通过在Green-Osher不等式中，取平面闭凸曲线四类凸函数，得到了关于这些凸函数在曲率积分的精确下界，这些下界仅与弧长和面积有关。

Abstract: Green-Osher inequality is the integral of curvature for strictly convex functions in general, some special convex functions get curvature integral inequalities in Green-Osher inequality. In this paper, we apply four types of convex functions of plane closed convex curve to Green-Osher inequality. We get some exact lower bounds on the integration of these convex functions over the curvature. These lower bounds depend only on arc length and area.