Lattice points on determinant surfaces and the spectrum of the automorphic Laplacian

We obtain an asymptotic formula with an error term for counting integer points $(a, b, c, d)$ in an expanding box $ [-X, X]^4$ that lie on the determinant surface $xy-zw=r$ for $r\neq 0$. The method involves Poisson summation formula, stationary phase analysis, Kuznetsov formula, Weyl law and large sieve inequality for the twisted coefficients $ρ_j(n)n^{iκ_j}$.