Convergence of the empirical two-sample -statistics with -mixing data

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Lemma 2.7. Let (c_j)_j_∈_Z be an absolutely summable sequence of real numbers such that c_j = c₋_j for all j and let 0 6 a < b 6 1. Then

lim

bbnc

b² − a²

c ;

(2.87)

n→+∞ n

^Xbc

j−i

i,j= an +1

j∈Z

bbnc

lim ¹ ^X

n→+∞ n
i,j=banc+1

i j _c			₌ b³ − a³		c .	(2.88)
		j−i			X
n	n	j−i		3	j
					j∈Z

Proof. For the first convergence, we split the sum according to the values of j − i (between
N_n − 1 and −N_n + 1 where N_n = bbnc − banc):

bbnc _i

N_n−1

bbnc

^Xbc

^cj−i ⁼

b^Xc

{j − i = k} .

(2.89)

c_k

i,j= an +1

k=−N_n+1

i= an +1

j= an +1

Pbbnc

The sum _j_=b_an_c+1 1 {j − i = k} is 1 if banc + 1 6 i + k 6 bbnc and zero otherwise; for k > 0, this constraint means banc+ 1 6 i 6 bbnc−k and for k < 0, this means banc+ 1−k 6 i 6 bbnc hence

bbnc

bbnc−k _i

^Xbc

^cj−i ⁼

1 {0 6 k 6 N_n − 1} c_k

b^Xc

ⁿ i,j= an

k∈Z

i= an

+1 ⁿ

bbnc

−

1 {−N_n + 1 6 k

6 −1} c_k

X_c

. (2.90)

k∈Z

i= an +1

For a fixed k, the convergences

−

bbnc−k _i

→

b² − a²

(2.91)

X
i=banc+1

k∈Z

bbnc

_c b² − a²

1 {− _n + 1 6

6 −1}

X_c

−

(2.92)

→ k ₂

an +1

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