A generalized mixed width inequality and a generalized dual mixed radial inequality (Q2311972)

The width is a basic concept in the theory of convex bodies, and there are many inequalities associated with it. In [Am. Math. Mon. 76, 34--35 (1969; Zbl 0175.19501)], \textit{P. R. Chernoff} obtained an inequality that involves the area and width of convex curves. In [Isr. J. Math. 28, 249--253 (1977; Zbl 0363.52009)], \textit{E. Lutwak} established some inequalities for mixed width integrals which correspond to mixed volumes. \par In the paper under review, the authors obtain a generalized Lutwak's inequality. More precisely, using $k$-order width function introduced by \textit{K. Ou} and \textit{S. Pan} [Pac. J. Math. 248, No. 2, 393--401 (2010; Zbl 1211.52003)] and Fourier series of a periodic function, the authors prove a generalized mixed width inequality. In particular, their generalized mixed width inequality includes the symmetric mixed isoperimetric inequality which was obtained by \textit{C. Zeng} et al. [Acta Math. Sin., Chin. Ser. 55, No. 2, 355--362 (2012; Zbl 1265.52003)]. In the last section, the authors obtain a generalized dual mixed radial inequality by the same approach.