All-orders asymptotics of tensor model observables from symmetries of restricted partitions

Abstract: The counting of the dimension of the space of U (N ) × U (N ) × U (N ) polynomial invariants of a complex 3-index tensor as a function of degree n is known in terms of a sum of squares of Kronecker coefficients. For n ≤ N , the formula can be expressed in terms of a sum of symmetry factors of partitions of n denoted Z 3 (n). We derive the large n all-orders asymptotic formula for Z 3 (n) making contact with high order results previously obtained numerically. The derivation relies on the dominance in the sum, o… Show more

“…Here A and Ā are respectively the rectangular matrix and its conjugate. The rank r ≥ 3 tensor model, in contrast, contains many non-trivial operators, and therefore the enumeration problem of the operators is more nontrivial [8,[15][16][17][18]. In the previous paper [19], we have demonstrated the OP/FD/dessin correspondence.…”

Review on the Operator/Feynman diagram/Dessins d'enfant Correspondence in Tensor Model

“…Here A and Ā are respectively the rectangular matrix and its conjugate. The rank r ≥ 3 tensor model, in contrast, contains many non-trivial operators, and therefore the enumeration problem of the operators is more nontrivial [8,[15][16][17][18]. In the previous paper [19], we have demonstrated the OP/FD/dessin correspondence.…”

Review on the Operator/Feynman diagram/Dessins d'enfant Correspondence in Tensor Model