On Landau's function g(n)
Abstract
Let Sn be the symmetric group of n letters; Landau considered the function g(n) defined as the maximal order of an element of Sn. This function is non-decreasing. Let us define the sequence n1=1, n2=2, n3=3, n4=4,n5=5,n6=7, ...,nk such that g(nk) > g(nk -1). It is known that lim sup nk+1-nk =infinity. Here it is shown that $lim inf nk+1-nk is finite.
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