Yesterday I read the Quanta article How a Strange Grid Reveals Hidden Connections Between Simple Numbers about the sum-product problem:
Let $A$ be a set of integers. Erdös and Szemerédi conjectured that for any $\epsilon>0$, there exists a $c_{\epsilon}>0$ such that
$\max\{|A+A|,|A \cdot A| \}\geq c_{\epsilon}|A|^{2-\epsilon}$.
The Quanta article talks about recent progress in proving this conjecture. While I was reading the article, I was inspired to try to use the identity
$xy=((x+y)^2-x^2-y^2)/2$
to try to prove this conjecture, since I see squaring and adding numbers as more primitive operations than multiplying two numbers. Using this identity and the fact that $|(A+A)^2|=|A+A|$, I found that:
$|A \cdot A|+|A+A| = |A \cdot A|+|(A+A)^2|=|\{x^2+y^2-(x+y)^2:x,y \in A\}|+|\{(x+y)^2:x,y \in A\}| \geq |\{x^2+y^2:x,y \in A\}| = |A^2+A^2|$.
So to prove the conjecture, it suffices to prove that for any $\epsilon>0$, there exists a $c_{\epsilon}>0$ such that
$|A^2+A^2|=|\{x^2+y^2: x,y \in A\}|\geq c_{\epsilon}|A|^{2-\epsilon}$.
A lot is known about the sum of two squares. Not every number can be expressed as the sum of two squares, but many can. My question is is there a known number $n \leq 2$ such that for any $\epsilon>0$, there exists a $c_{\epsilon}>0$ such that
$|A^2+A^2|\geq c_{\epsilon}|A|^{n-\epsilon}$?
Has this strategy been tried before?
