Exact objectives of random linear programs and mean widths of random polyhedrons

Abstract

We consider random linear programs (rlps) as a subclass of random optimization problems (rops) and study their typical behavior. Our particular focus is on appropriate linear objectives which connect the rlps to the mean widths of random polyhedrons/polytopes. Utilizing the powerful machinery of random duality theory (RDT) StojnicRegRndDlt10, we obtain, in a large dimensional context, the exact characterizations of the program's objectives. In particular, for any α=n→∞mn∈(0,∞), any unit vector c∈ Rn, any fixed a∈ Rn, and A∈ Rm× n with iid standard normal entries, we have eqnarray* n→∞ PA ( (1-ε) opt(α;a) ≤ Ax≤ acTx ≤ (1+ε) opt(α;a) ) 1, eqnarray* where equation* opt(α;a) x>0 x2- x2 n→∞ Σi=1m ( 12 ( ( aix )2 + 1 ) erfc( aix2 ) - aix e-ai22x22π ) n . equation* For example, for a=1, one uncovers equation* opt(α) = x>0 x2- x2 α ( 12 ( 1x2 + 1 ) erfc ( 1x2 ) - 1x e-12x22π ) . equation* Moreover, 2 opt(α) is precisely the concentrating point of the mean width of the polyhedron \x|Ax ≤ 1\.