Approximation properties of the Picard singular integral in exponential weighted spaces (Q677826)

The singular integral indicated in the title is of the form \[ P_r(f;x): ={1\over 2r} \int^\infty_{-\infty} f(x+t) \exp \bigl(-|t |/r \bigr)dt, \] where \(x\in R\), \(r>0\), and the function \(f\) belongs to an exponential weighted space or some generalized Hölder space. Direct approximation theorems and inverse theorems are proved when \(f\) is approximated by \(P_r(f)\) as \(r\downarrow 0\).