MathDB

Let

\lambda_i \;(i=1,2,...)

be a sequence of distinct positive numbers tending to infinity. Consider the set of all numbers representable in the form

\mu= \sum_{i=1}^{\infty}n_i\lambda_i ,

where

n_i \geq 0

are integers and all but finitely many

n_i

are

0

. Let

L(x)= \sum _{\lambda_i \leq x} 1 \;\textrm{and}\ \;M(x)= \sum _{\mu \leq x} 1 \ .

(In the latter sum, each

\mu

occurs as many times as its number of representations in the above form.) Prove that if

\lim_{x\rightarrow \infty} \frac{L(x+1)}{L(x)}=1,

then

\lim_{x\rightarrow \infty} \frac{M(x+1)}{M(x)}=1.

G. Halasz

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