On complete convergence for weighted sums of \(\varphi \)-mixing random variables (Q607959)

Let \(\{X_n: n\geq 1\}\) be a sequence of \(\varphi\)-mixing random variables and \(\{a_{ni}: n\geq 1\), \(i\geq 1\}\) an infinite matrix of real numbers satisfying the so-called Toeplitz conditions, that is, \[ \lim_{n\to \infty} a_{ni}= 0\text{ for each }i\geq 1,\quad\text{and }\sum^\infty_{i=1} a_{ni}|\leq C\text{ for all }n\geq 1, \] where \(C\) is a constant. The authors prove five theorems in which known results on the complete convergence of weighted sums \(\sum^\infty_{i=1} a_{ni} X_i\) in the case of i.i.d.r.v.'s are extended to the case of \(\varphi\)-mixing r.v.'s.