... +i<jcov(Xi, Xj) nk=1D(Xk).1 {Xn, n ≥ 1}1n2ni=1DXi→ 0 khi n → ∞ {Xn}1nni=1Xi−ni=1EXiP−→ 0 khi n → ∞.ε > 0P|1nni=1Xi−1nni=1EXi| ≥ εD(1nni=1Xi)ε2=D(ni=1Xi)n2ε2ni=1DXin2ε2.1n2ni=1DXi→ ... εD(1nni=1Xi)ε2=D(ni=1Xi)n2ε2ni=1DXin2ε2.1n2ni=1DXi→ 0 khi n → ∞ limn→∞P|1nni=1Xi−1nni=1EXi| ≥ ε= 0.1nni=1Xi−ni=1EXiP−→ 0 khi n → ∞.=nk=1|E(eitXnk− 1 − ... {Xn, n ≥ 1}C > 0 DXn C n ≥ 1 {Xn}3 {Xn, n ≥ 1}EX1= a DX1= σ2ni=1XiP−→ a khi n → ∞.3 X1, , Xn|Φ(r1, , rm) −mj=1Φj(rj)| mk,l=1|rkrlcov(Xk, Xl)|Φ(r1,...