In knot theory, Willerton's fish is an unexplained relationship between the first two Vassiliev invariants of a knot. These invariants are c₂, the quadratic coefficient of the Alexander–Conway polynomial, and j₃, an order-three invariant derived from the Jones polynomial.^[1][2]

When the values of c₂ and j₃, for knots of a given fixed crossing number, are used as the x and y coordinates of a scatter plot, the points of the plot appear to fill a fish-shaped region of the plane, with a lobed body and two sharp tail fins. The region appears to be bounded by cubic curves,^[2] suggesting that the crossing number, c₂, and j₃ may be related to each other by not-yet-proven inequalities.^[1]

This shape is named after Simon Willerton,^[1] who first observed this phenomenon and described the shape of the scatterplots as "fish-like".^[3]