I am interested in the following questions:
given:
$G(n) = \left(\frac12 + \frac23 + \frac34 + \frac45 + \cdots + \frac{n-1}n\right)n$
what is a $F(n)$ which could be an upper bound (clearly as tight as possible) for $G(n)$ for $n$ arbitrarily large ?
Does the series: $\frac12 + \frac23 + \frac34 + \frac45 + \cdots + \frac{n-1}n$ have a "name" and a sum (any reference)?