A lower bound for the largest prime divisor of an integer

Question

I have often heard it stated that Erdős conjectured the following:

For any integer $n > 1$, there exists a prime divisor $p$ of $n$ such that
$$p > c \cdot \log \log n,$$
where $c > 0$ is a universal constant.

However, I have been unable to locate a precise reference to confirm this. Is this statement indeed true? If so, could someone provide a reference or further details about the conjecture and its context?

Thank you!

Answer 1

The statement is false, e.g. $n=2^k$ does not have a prime factor exceeding $2$. On the other hand, if $n$ is square-free, with largest prime factor $P$, then (see here) $$\log n=\sum_{p\mid n}\log p\leq\sum_{p\leq P}\log p=\theta(P)<1.00000002P,$$ so that $P>0.99999998\log n$ by comparing the two sides. Moreover, by the Prime Number Theorem, the constant $0.99999998$ can be replaced by $1-\varepsilon$ for $n\geq n_0(\varepsilon)$ square-free; here $\varepsilon>0$ is arbitrary. ${}{}{}{}$