MFKnockoffs.knocks.solve_asdp: Optimization for SDP knockoffs

The solution \(s\) to the semidefinite programming problem defined above

Solves the following two-step semidefinite programming problem:

(step 1) $$ \mathrm{maximize} \; \mathrm{sum}(s) \quad \mathrm{subject} \; \mathrm{to:} \; 0 <= s <= 1, \; 2 \Sigma_{\mathrm{approx}} - \mathrm{diag}(s) >= 0$$

(step 2) $$ \mathrm{maximize} \; \gamma \quad \mathrm{subject} \; \mathrm{to:} \; \mathrm{diag}(\gamma s) <= 2 \Sigma$$

If the matrix Sigma supplied by the user is a non-scaled covariance matrix (i.e. its diagonal entries are not all equal to 1), then the appropriate scaling is applied before solving the SDP defined above. The result is then scaled back before being returned, as to match the original scaling of the covariance matrix supplied by the user.