Akin to the Erdős-Rademacher problem, Linial and Morgenstern made the following conjecture in tournaments: for any \(d\in (0,1]\), among all \(n\)-vertex tournaments with \(d\binom{n}{3}\) many 3-cycles, the number of 4-cycles is asymptotically minimized by a special random blow-up of a transitive tournament. Recently, Chan, Grzesik, Král' and Noel introduced spectrum analysis of adjacency matrices of tournaments in this study, and confirmed this for \(d\geq 1/36\). In this paper, we investigate the analogous problem of minimizing the number of cycles of a given length. We prove that for integers \(\ell\not\equiv 2\mod 4\), there exists some constant \(c_\ell>0\) such that if \(d\geq 1-c_\ell\), then the number of \(\ell\)-cycles is als...