Tauberian theorems for the weighted means of measurable functions of several variables (Q636070)

Let \(f,w\) denote complex Lebesgue measurable functions of \(n\) nonnegative variables. The weighted mean of \(f\) at \(x\) is defined by \(T_{w}f(x)=W^{-1}(x)\int_{0}^{x}f(y)w(y)dy\), where \( W(x)=\int_{0}^{x}w(y)dy\). The function \(f\) is called \((N,w)\) summable to \(l\) if \(T_{w}f(x)\rightarrow l\) as \(x {{}^\circ}=\min (x_{1},x_{2},\dots,x_{n})\rightarrow \infty\). Notation: \(f\rightarrow l(N,w)\). A function \(g\) is statistically convergent to \(l\) if for all \( \epsilon >0\), we have \(\left| \left\{ u:0\leq u\leq x,\left| g(u)-l\right| >\epsilon \right\} \right| /(x_{1}x_{2}\cdots x_{n})\rightarrow 0\), as \(x{{}^\circ}\rightarrow \infty \). Notation: \(g\rightarrow l(st)\). In the paper the authors formulate conditions of slow oscillation and slow decrease to prove Tauberian theorems of the following type: \(f\rightarrow l(st)\Longrightarrow f\rightarrow l\); \(T_{w}f\rightarrow l(st)\Longrightarrow f\rightarrow l\) and \(T_{w}f\rightarrow l(st)\Longrightarrow f\rightarrow l(st)\). Throughout the paper the authors show by examples that the conditions cannot be weakened. In the case where \(f\) takes real values, a typical Tauberian condition on \(f\) is the following: \(\inf_{0<\rho <1}\left\{ \lim \sup_{x{{}^\circ}\rightarrow \infty }\left( \sup_{\rho x<u<x}\left| f(x)-f(u)\right| \right) \right\} =0\).