For a given $t\geq4$, does the following system of equations have a solution over the integers? $$ax^2+by^2=2^{2^t-t}$$$$cx^2+dy^2=1$$$$0<|ta|^2,|tb|^2,|tc|^2,|td|^2<|x|,|y|$$
If so, how to parametrize the solutions and find them?
For a given $x,y:|x|,|y|<B$, how many such $a,b,c,d$ are there?
Is $gcd(a,b)=1$ possible?
I think it have. Probably infinitely many.
\begin{aligned} x =& 6882627592338442563 \\ y =& 4866752642924153522 \\ a =& 4096 \\ b =& -8192 \\ c =& 1 \\ d =& -2 \\ t =& 4 \\ \end{aligned}
Found this way.
Fix $c=1,d=-2$ and solve the Pell equation with large $x,y$.
Then $a=2^{2^t-t}$ and $b= -2 \cdot 2^{2^t-t}$ solves the first equation.
Added
So $x^2 - 2 y^2=1$ have arbitrary large solutions. Fix $t$.
Then $ 2^{2^t-t} (x^2 - 2 y^2) = 2^{2^t-t}$.
