I have a set of equations involving two anti periodic functions $f(t+T)=-f(t)$ and $g(t+T)=-g(t)$
\begin{cases} f(t)&=J^2g(t)^3 \\ \mathcal{F}[g](\omega_n)&=\frac{1}{-i\omega_n-\mathcal{F}[f](\omega_n)} \end{cases}
Where $\mathcal{F}[f](\omega_n)$ is the Fourier transform of the function $f$ and $\omega_n =\frac{\pi(2n-1)}{T}$. I would like to numerically solve these equations to obtain $f(t)$ and $g(t)$ but I'm not sure what function in Mathematica to use. The Fourier series can be recast as an integral, which is why I thought DSolve or NDSolve would work. However, none of these worked.
NDSolveorDSolvewould be relevant. Please provide more details by editing your post and including all necessary relevant information. $\endgroup$