Let $f(x,y)=0$ be (irreducible) elliptic curve over the rationals.

Is there $f$ for which:

> 1 Both $x,y$ are squares infinitely often, i.e. infinitely many rational points of the form  $(u^2,v^2)$?

> 2 Both $x,y$ are (arbitrary) large powers infinitely often,
i.e. infinitely many rational points $(u^k,v^m)$ for some $k,m \ge 2$ (the larger the better)?


For large $k,m$ the n-conjecture implies the number of monomials
can't be too small.