Relations between periodic and nonperiodic moduli of smoothness (Q1206266)

If \(f\) is a \(2 \pi\)-periodic real function in \(L_ p\) then \[ \sup_{0 \leq h \leq \delta} \| \Delta^ k_ hf(x) \|_ p,\;\delta \geq 0,\quad\text{and}\quad\sup_{0 \leq h \leq \delta} \bigl\{ \int^{2 \pi- h}_ 0 | \Delta^ k_ hf(x) |^ pdx \bigr\}^{1/p},\;0 \leq \delta<{2 \pi \over k}, \] is the \(k\)th order periodic and, respectively, nonperiodic modulus of smoothness of \(f\). The author obtains a relation between them for \(k=1\) and \(0<p \leq 1\).