Approximate identities and convergence at Lebesgue points (Q1079995)

We prove that lim \(K_{\alpha}*f(x)=f(x)\) at all the Lebesgue points of \(f\in L^ p\) for some approximate identities \(\{K_{\alpha}\}\), and that for every approximate identity \(\{\phi_{\lambda}\}\) of dilation type defined by a nonnegative kernel \(\phi \in L^ 1\), the corresponding convergence at Lebesgue points implies that the kernel has an integrable radial majorant.