On strong uniform distribution III

Let a = ( a i i=1 ∞ be a strictly increasing sequence of natural numbers and let A be a space of Lebesgue measurable functions defined on [0,1). Let < y> denote the fractional part of the real number y. We say that a is an A ∗ sequence if for each f ϵ A lim N→∞ 1 N ∑ i=1 N f(<a ix>)= ∫ 0...

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Vydáno v:	Indagationes mathematicae Ročník 14; číslo 2; s. 233 - 240
Hlavní autor:	Nair, R.
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Elsevier B.V 23.06.2003
ISSN:	0019-3577, 1872-6100
On-line přístup:	Získat plný text
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Shrnutí:	Let a = ( a i i=1 ∞ be a strictly increasing sequence of natural numbers and let A be a space of Lebesgue measurable functions defined on [0,1). Let < y> denote the fractional part of the real number y. We say that a is an A ∗ sequence if for each f ϵ A lim N→∞ 1 N ∑ i=1 N f(<a ix>)= ∫ 0 1 f(t)dt, almost everywhere with respect to Lebesgue measure. Let a i=(a 1,i) ∞ i=1, …,a k=(a k,i) ∞ i=1, denote finitely many ( L 1) ∗ sequences, and for a sequence a, let G a(u)=\|{i:a i ≤ u}\|, where for a finite set A we have used \| A\| to denote its cardinality. Also let a 1 ∘ … ∘ a k denote the set {b 1…b k : b 1ϵa k}, counted with multiplicity and ordered by absolute value. Suppose there exists K > 0 such that for all u ≥ 1 \|G a 1 (u)\|…\|G a k (u)\|≤\|G a 1 compfn;…compfn; a k (u)\|. Then if log +\| x\| = log max(1,\| x\|) we show that a 1 ∘ … ∘ a k is an ( L( log + L) k−1 ) ∗ sequence.
ISSN:	0019-3577 1872-6100
DOI:	10.1016/S0019-3577(03)90007-3