divergent Fourier series in function spaces near L1[0;1]

Abstract

In this paper we generalize Bochkariev's theorem, which states that for any uniformly bounded orthonormal system , there exists a Lebesgue integrable function such that the Fourier series of it with respect to system diverge on the set of positive measure. We characterize the class of variable exponent Lebesgue spaces Lp(·)[0;1], 1<p(x)<∞ a.e. on [0;1], such that above mentioned Bochkarev's theorem is valid.