Massive Scaling Limit of beta-Deformed Matrix Model of Selberg Type

Abstract

We consider a series of massive scaling limits m1 -> infty, q -> 0, lim m1 q = Lambda3 followed by m4 -> infty, Lambda3 -> 0, lim m4 Lambda3 = (Lambda2)2 of the beta-deformed matrix model of Selberg type (Nc=2, Nf=4) which reduce the number of flavours to Nf=3 and subsequently to Nf=2. This keeps the other parameters of the model finite, which include n=NL and N=n+NR, namely, the size of the matrix and the "filling fraction". Exploiting the method developed before, we generate instanton expansion with finite gs, epsilon1,2 to check the Nekrasov coefficients (Nf =3,2 cases) to the lowest order. The limiting expressions provide integral representation of irregular conformal blocks which contains a 2d operator lim frac1C(q) : e(1/2) α1 φ(0): (int0q dz : ebE phi(z):)n : e(1/2) alpha2 phi(q): and is subsequently analytically continued.