Density of sequences of the form xn=f(n)n in [0,1]
Abstract
In 2013, Strauch asked how various sequences of real numbers defined from trigonometric functions such as xn=( n)n distributed themselves 1. Strauch's inquiry is motivated by several such distribution results. For instance, Luca proved that the sequence xn=( α n)n 1 is dense in [0,1] for any fixed real number α such that α/π is irrational. Here we generalise Luca's results to other sequences of the form xn=f(n)n 1. We also examine the size of the set |\n≤ N:r<|(nπα)|n\| where 0<r<1 and α are fixed such that α/π is irrational.
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