Key points are not available for this paper at this time.
The character table of the symmetric group Sₙ, of permutations of n objects, is of fundamental interest in theoretical physics, combinatorics as well as computational complexity theory. We investigate the implications of an identity, which has a geometrical interpretation in combinatorial topological field theories, relating the column sum of normalised central characters of Sₙ to a sum of structure constants of multiplication in the centre of the group algebra of Sₙ. The identity leads to the proof that a combinatorial computation of the column sum belongs to complexity class. The sum of structure constants has an interpretation in terms of the counting of branched covers of the sphere. This allows the identification of a tractable subset of the structure constants related to genus zero covers. We use this subset to prove that the column sum for a conjugacy class labelled by partition is non-vanishing if and only if the permutations in the conjugacy class are even. This leads to the result that the determination of the vanishing or otherwise of the column sum is in complexity class. The subset gives a positive lower bound on the column sum for any even. For any disjoint decomposition of as ₁ ₂ we obtain a lower bound for the column sum at in terms of the product of the column sums for ₁ and₂. This can be expressed as a super-additivity property for the logarithms of column sums of normalized characters.
Geloun et al. (Tue,) studied this question.