Estimating functions by partial sums of their Fourier series

In our earlier work we developed an algorithm for approximating the locations of discontinuities and the magnitudes of jumps of a bounded function by means of its truncated Fourier series. The algorithm is based on some asymptotic expansion formulas. In the present paper we give proofs for those for

## Abstract The regularity of solutions of the Dirichlet problem for the Poisson equation in three‐dimensional axisymmetric domains with reentrant edges is studied by means of Fourier series. The decomposition of the 3D problem into variational equations in 2D, __a priori__ estimates of their solut

We give uniform estimates in the whole complex plane of entire functions of exponential type less than a certain numerical constant (approximately equal to 0.44) having sufficiently small logarithmic sums. In these estimates the entire dependence on the function is through its type and logarithmic s

## Abstract Let __S__\* (__f__ be the majorant function of the partial sums of the trigonometric Fourier series of __f.__ In this paper we consider the Orlicz space __L__π and give a generalization of Soria's result [S1]. Let π (t) be a concave function with some nice properties and . If there exi