Equal-charge projection of the N=4 index: exact large-N formula and finite-rank U(3) coefficients

Abstract

The equal-charge branch of supersymmetric rotating AdS5 black holes has Q1=Q2=Q3. The corresponding microcanonical sector of the N=4 superconformal index is obtained by projecting to equal charges, or equivalently by extracting the constant term in the two charge-difference fugacities. We prove that for the large-N multigraviton sector the projected index factorizes exactly as \[ I eqQ∞(x,p) =Πk1(1-pkx3k)(1-p-kx3k) Σn0p(n)3x6n, \] where p(n) is the partition function. This factorization gives, for every spin sector, an explicit onset energy below which the large-N coefficient is zero. Exact U(3) computations show that finite-rank coefficients can nevertheless appear at energies where the large-N coefficient vanishes, including beyond the classical U(3) black-hole bound. We also determine the full line j=6JR+6. In particular, with j*(JR) denoting this large-N onset energy, \[ d3 eqQ(87,272)=1, j*(272)-87=1554, \] and the first giant-graviton sector already contributes one unit at this point. All coefficients are coefficients of the (-1)F-graded index, not positive degeneracies. The main conclusion is that the high-spin tail survives the exact equal-charge projection.

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