Let $1<\alpha<\beta<3/2$. Set $$ S(n)= \sum_{i,j>0} [i^\alpha+j^\beta]^{-1}[(i+n)^\alpha+(j+n)^\beta]^{-1}. $$ One can check that $S(n)$ is finite. My question is when $n\rightarrow \infty$, what is the asymptotics of $S(n)$, e.g., if it is asymptotically a power function? If yes, what is the exponent?
Remarks:
When $\alpha=\beta$, this problem can be resolved using an integral approximation argument (rewriting the sum as a double integral by replacing $\frac{i}{n}$ with $\frac{[nx]+1}{n}$, $\frac{j}{n}$ with $\frac{[ny]+1}{n}$ and letting $n\rightarrow\infty$ through the Dominated Convergence Theorem) which yields $S(n)\sim c n^{2\alpha-2}$ for some $c>0$. But when $\alpha<\beta$, the similar argument seems difficult to apply due to the non-homogeneity of the function $g(x,y)=(x^{\alpha} +y^{\beta})^{-1}$.
It seems that if we do have $S(n)\sim cn^{2\gamma-2}$ for some $\gamma$, then $\alpha\le \gamma\le \beta$. Furthermore, by the inequality $i^\alpha+j^\beta\ge 2 (ij)^{(\alpha+\beta)/2}$ (now $g(x,y)=(xy)^{-(\alpha+\beta)/2}$ is homogeneous and an integral approximation argument applies), we should have $\gamma\le (\alpha+\beta)/2$.