I believe it's not. The definition is that:
log(n) >= c*n for some n = x, and all n > x
The reason I think it's not is that the rate of growth of c*n = c. The rate of growth of log(n) = 1/n. So, as n-> infinity, the rate of growth of n approaches 0, whereas c, the rate of growth of c*n, is constant. Given that eventually log(n) will eventually grow slower than any n*c, where c > 0, n*c will outgrow log(n).
So, a few questions.
- Can I assume c > 0 from the definition of big omega?
- Is my above intuition correct?
- I'm conflicted about my proof above. Because for very small c's, log(n) = cn very early, my assumption above implies that they would intersect again, which means log(n) = cn has more than one solution, which seems wrong.
I'm very confused and appreciate the help!