On L1-Convergence of Fourier Series Under MVBV Condition

Abstract

Let f∈ L2π be a real-valued even function with its Fourier series a02+Σn=1∞an nx, and let Sn(f,x), n≥ 1, be the n-th partial sum of the Fourier series. It is well-known that if the nonnegative sequence \an\ is decreasing and n ∞an=0, then n ∞ f-Sn(f)L=0 if and only if n ∞an n=0. We weaken the monotone condition in this classical result to the so-called mean value bounded variation (MVBV) condition. The generalization of the above classical result in real-valued function space is presented as a special case of the main result in this paper which gives the L1% -convergence of a function f∈ L2π in complex space. We also give results on L1-approximation of a function f∈ L2π under the % MVBV condition.