Analogs of the arcsine distribution for sequences linearly generated by independent random variables

Let {ξ_k}, kz ...?1,0,1, ..., be a sequence of independent identically distributed random variables with . Let {C_k} be a numerical sequence such that \(\Sigma _{ - \infty }^\infty c_k^2< \infty \) Let $$X_n = \sum\limits_{ - \infty }^\infty {c_{k - n} \xi _k } , S_n = \sum\limits_1^n {X_k } $$ . This article investigates the limit behavior of the distributions of functionals of the following type: $$\mathcal{V}_n = \tfrac{1}{n}\sum\limits_1^n {h\left( {S_k } \right)} $$ , where h is a bounded function on R¹.