“On the Computational Complexity of the Jones and Tutte Polynomials”, F. Jaeger, D. L. Vertigan, D. J. A. Welsh1990-07-01 (algorithms, math; backlinks)⁠:

We show that determining the Jones polynomial of an alternating link is #P-hard. This is a special case of a wide range of results on the general intractability of the evaluation of the Tutte polynomial T(M; x, y) of a matroid M except for a few listed special points and curves of the (x, y)-plane.

In particular the problem of evaluating the Tutte polynomial of a graph at a point in the (x, y)-plane is #P-hard except when (x − 1)(y − 1) = 1 or when (x, y) equals (1, 1), (−1, −1), (0, −1), (−1, 0), (i, −i), (−i, 1), (j, j²), (j², j) where j = e^2πi/3.

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