Table of Alexander polynomials

3₁: 1 [-1] 1
4₁: -1 [3] -1
5₁: 1 -1 [1] -1 1
5₂: 2 [-3] 2
6₁: -2 [5] -2
6₂: -1 3 [-3] 3 -1
6₃: 1 -3 [5] -3 1
7₁: 1 -1 1 [-1] 1 -1 1
7₂: 3 [-5] 3
7₃: 2 -3 [3] -3 2
7₄: 4 [-7] 4
7₅: 2 -4 [5] -4 2
7₆: -1 5 [-7] 5 -1
7₇: 1 -5 [9] -5 1
8₁: -3 [7] -3
8₂: -1 3 -3 [3] -3 3 -1
8₃: -4 [9] -4
8₄: -2 5 [-5] 5 -2
8₅: -1 3 -4 [5] -4 3 -1
8₆: -2 6 [-7] 6 -2
8₇: 1 -3 5 [-5] 5 -3 1
8₈: 2 -6 [9] -6 2
8₉: -1 3 -5 [7] -5 3 -1
8₁₀: 1 -3 6 [-7] 6 -3 1
8₁₁: -2 7 [-9] 7 -2
8₁₂: 1 -7 [13] -7 1
8₁₃: 2 -7 [11] -7 2
8₁₄: -2 8 [-11] 8 -2
8₁₅: 3 -8 [11] -8 3
8₁₆: 1 -4 8 [-9] 8 -4 1
8₁₇: -1 4 -8 [11] -8 4 -1
8₁₈: -1 5 -10 [13] -10 5 -1
8₁₉: 1 -1 0 [1] 0 -1 1
8₂₀: 1 -2 [3] -2 1
8₂₁: -1 4 [-5] 4 -1
9₁: 1 -1 1 -1 [1] -1 1 -1 1
9₂: 4 [-7] 4
9₃: 2 -3 3 [-3] 3 -3 2
9₄: 3 -5 [5] -5 3
9₅: 6 [-11] 6
9₆: 2 -4 5 [-5] 5 -4 2
9₇: 3 -7 [9] -7 3
9₈: -2 8 [-11] 8 -2
9₉: 2 -4 6 [-7] 6 -4 2
9₁₀: 4 -8 [9] -8 4
9₁₁: -1 5 -7 [7] -7 5 -1
9₁₂: -2 9 [-13] 9 -2
9₁₃: 4 -9 [11] -9 4
9₁₄: 2 -9 [15] -9 2
9₁₅: -2 10 [-15] 10 -2
9₁₆: 2 -5 8 [-9] 8 -5 2
9₁₇: 1 -5 9 [-9] 9 -5 1
9₁₈: 4 -10 [13] -10 4
9₁₉: 2 -10 [17] -10 2
9₂₀: -1 5 -9 [11] -9 5 -1
9₂₁: -2 11 [-17] 11 -2
9₂₂: 1 -5 10 [-11] 10 -5 1
9₂₃: 4 -11 [15] -11 4
9₂₄: -1 5 -10 [13] -10 5 -1
9₂₅: -3 12 [-17] 12 -3
9₂₆: 1 -5 11 [-13] 11 -5 1
9₂₇: -1 5 -11 [15] -11 5 -1
9₂₈: 1 -5 12 [-15] 12 -5 1
9₂₉: 1 -5 12 [-15] 12 -5 1
9₃₀: -1 5 -12 [17] -12 5 -1
9₃₁: 1 -5 13 [-17] 13 -5 1
9₃₂: 1 -6 14 [-17] 14 -6 1
9₃₃: -1 6 -14 [19] -14 6 -1
9₃₄: -1 6 -16 [23] -16 6 -1
9₃₅: 7 [-13] 7
9₃₆: -1 5 -8 [9] -8 5 -1
9₃₇: 2 -11 [19] -11 2
9₃₈: 5 -14 [19] -14 5
9₃₉: -3 14 [-21] 14 -3
9₄₀: 1 -7 18 [-23] 18 -7 1
9₄₁: 3 -12 [19] -12 3
9₄₂: -1 2 [-1] 2 -1
9₄₃: -1 3 -2 [1] -2 3 -1
9₄₄: 1 -4 [7] -4 1
9₄₅: -1 6 [-9] 6 -1
9₄₆: -2 [5] -2
9₄₇: 1 -4 6 [-5] 6 -4 1
9₄₈: -1 7 [-11] 7 -1
9₄₉: 3 -6 [7] -6 3
10₁: -4 [9] -4
10₂: -1 3 -3 3 [-3] 3 -3 3 -1
10₃: -6 [13] -6
10₄: -3 7 [-7] 7 -3
10₅: 1 -3 5 -5 [5] -5 5 -3 1
10₆: -2 6 -7 [7] -7 6 -2
10₇: -3 11 [-15] 11 -3
10₈: -2 5 -5 [5] -5 5 -2
10₉: -1 3 -5 7 [-7] 7 -5 3 -1
10₁₀: 3 -11 [17] -11 3
10₁₁: -4 11 [-13] 11 -4
10₁₂: 2 -6 10 [-11] 10 -6 2
10₁₃: 2 -13 [23] -13 2
10₁₄: -2 8 -12 [13] -12 8 -2
10₁₅: 2 -6 9 [-9] 9 -6 2
10₁₆: -4 12 [-15] 12 -4
10₁₇: 1 -3 5 -7 [9] -7 5 -3 1
10₁₈: -4 14 [-19] 14 -4
10₁₉: 2 -7 11 [-11] 11 -7 2
10₂₀: -3 9 [-11] 9 -3
10₂₁: -2 7 -9 [9] -9 7 -2
10₂₂: -2 6 -10 [13] -10 6 -2
10₂₃: 2 -7 13 [-15] 13 -7 2
10₂₄: -4 14 [-19] 14 -4
10₂₅: -2 8 -14 [17] -14 8 -2
10₂₆: -2 7 -13 [17] -13 7 -2
10₂₇: 2 -8 16 [-19] 16 -8 2
10₂₈: 4 -13 [19] -13 4
10₂₉: 1 -7 15 [-17] 15 -7 1
10₃₀: -4 17 [-25] 17 -4
10₃₁: 4 -14 [21] -14 4
10₃₂: -2 8 -15 [19] -15 8 -2
10₃₃: 4 -16 [25] -16 4
10₃₄: 3 -9 [13] -9 3
10₃₅: 2 -12 [21] -12 2
10₃₆: -3 13 [-19] 13 -3
10₃₇: 4 -13 [19] -13 4
10₃₈: -4 15 [-21] 15 -4
10₃₉: -2 8 -13 [15] -13 8 -2
10₄₀: 2 -8 17 [-21] 17 -8 2
10₄₁: 1 -7 17 [-21] 17 -7 1
10₄₂: -1 7 -19 [27] -19 7 -1
10₄₃: -1 7 -17 [23] -17 7 -1
10₄₄: 1 -7 19 [-25] 19 -7 1
10₄₅: -1 7 -21 [31] -21 7 -1
10₄₆: -1 3 -4 5 [-5] 5 -4 3 -1
10₄₇: 1 -3 6 -7 [7] -7 6 -3 1
10₄₈: 1 -3 6 -9 [11] -9 6 -3 1
10₄₉: 3 -8 12 [-13] 12 -8 3
10₅₀: -2 7 -11 [13] -11 7 -2
10₅₁: 2 -7 15 [-19] 15 -7 2
10₅₂: 2 -7 13 [-15] 13 -7 2
10₅₃: 6 -18 [25] -18 6
10₅₄: 2 -6 10 [-11] 10 -6 2
10₅₅: 5 -15 [21] -15 5
10₅₆: -2 8 -14 [17] -14 8 -2
10₅₇: 2 -8 18 [-23] 18 -8 2
10₅₈: 3 -16 [27] -16 3
10₅₉: 1 -7 18 [-23] 18 -7 1
10₆₀: -1 7 -20 [29] -20 7 -1
10₆₁: -2 5 -6 [7] -6 5 -2
10₆₂: 1 -3 6 -8 [9] -8 6 -3 1
10₆₃: 5 -14 [19] -14 5
10₆₄: -1 3 -6 10 [-11] 10 -6 3 -1
10₆₅: 2 -7 14 [-17] 14 -7 2
10₆₆: 3 -9 16 [-19] 16 -9 3
10₆₇: -4 16 [-23] 16 -4
10₆₈: 4 -14 [21] -14 4
10₆₉: 1 -7 21 [-29] 21 -7 1
10₇₀: 1 -7 16 [-19] 16 -7 1
10₇₁: -1 7 -18 [25] -18 7 -1
10₇₂: -2 9 -16 [19] -16 9 -2
10₇₃: 1 -7 20 [-27] 20 -7 1
10₇₄: -4 16 [-23] 16 -4
10₇₅: -1 7 -19 [27] -19 7 -1
10₇₆: -2 7 -12 [15] -12 7 -2
10₇₇: 2 -7 14 [-17] 14 -7 2
10₇₈: -1 7 -16 [21] -16 7 -1
10₇₉: 1 -3 7 -12 [15] -12 7 -3 1
10₈₀: 3 -9 15 [-17] 15 -9 3
10₈₁: -1 8 -20 [27] -20 8 -1
10₈₂: -1 4 -8 12 [-13] 12 -8 4 -1
10₈₃: 2 -9 19 [-23] 19 -9 2
10₈₄: 2 -9 20 [-25] 20 -9 2
10₈₅: 1 -4 8 -10 [11] -10 8 -4 1
10₈₆: -2 9 -19 [25] -19 9 -2
10₈₇: -2 9 -18 [23] -18 9 -2
10₈₈: -1 8 -24 [35] -24 8 -1
10₈₉: 1 -8 24 [-33] 24 -8 1
10₉₀: -2 8 -17 [23] -17 8 -2
10₉₁: 1 -4 9 -14 [17] -14 9 -4 1
10₉₂: -2 10 -20 [25] -20 10 -2
10₉₃: 2 -8 15 [-17] 15 -8 2
10₉₄: -1 4 -9 14 [-15] 14 -9 4 -1
10₉₅: 2 -9 21 [-27] 21 -9 2
10₉₆: -1 7 -22 [33] -22 7 -1
10₉₇: -5 22 [-33] 22 -5
10₉₈: -2 9 -18 [23] -18 9 -2
10₉₉: 1 -4 10 -16 [19] -16 10 -4 1
10₁₀₀: 1 -4 9 -12 [13] -12 9 -4 1
10₁₀₁: 7 -21 [29] -21 7
10₁₀₂: -2 8 -16 [21] -16 8 -2
10₁₀₃: 2 -8 17 [-21] 17 -8 2
10₁₀₄: 1 -4 9 -15 [19] -15 9 -4 1
10₁₀₅: 1 -8 22 [-29] 22 -8 1
10₁₀₆: -1 4 -9 15 [-17] 15 -9 4 -1
10₁₀₇: -1 8 -22 [31] -22 8 -1
10₁₀₈: 2 -8 14 [-15] 14 -8 2
10₁₀₉: 1 -4 10 -17 [21] -17 10 -4 1
10₁₁₀: 1 -8 20 [-25] 20 -8 1
10₁₁₁: -2 9 -17 [21] -17 9 -2
10₁₁₂: -1 5 -11 17 [-19] 17 -11 5 -1
10₁₁₃: 2 -11 26 [-33] 26 -11 2
10₁₁₄: -2 10 -21 [27] -21 10 -2
10₁₁₅: -1 9 -26 [37] -26 9 -1
10₁₁₆: -1 5 -12 19 [-21] 19 -12 5 -1
10₁₁₇: 2 -10 24 [-31] 24 -10 2
10₁₁₈: 1 -5 12 -19 [23] -19 12 -5 1
10₁₁₉: -2 10 -23 [31] -23 10 -2
10₁₂₀: 8 -26 [37] -26 8
10₁₂₁: 2 -11 27 [-35] 27 -11 2
10₁₂₂: -2 11 -24 [31] -24 11 -2
10₁₂₃: 1 -6 15 -24 [29] -24 15 -6 1
10₁₂₄: 1 -1 0 1 [-1] 1 0 -1 1
10₁₂₅: 1 -2 2 [-1] 2 -2 1
10₁₂₆: 1 -2 4 [-5] 4 -2 1
10₁₂₇: -1 4 -6 [7] -6 4 -1
10₁₂₈: 2 -3 1 [1] 1 -3 2
10₁₂₉: 2 -6 [9] -6 2
10₁₃₀: 2 -4 [5] -4 2
10₁₃₁: -2 8 [-11] 8 -2
10₁₃₂: 1 -1 [1] -1 1
10₁₃₃: -1 5 [-7] 5 -1
10₁₃₄: 2 -4 4 [-3] 4 -4 2
10₁₃₅: 3 -9 [13] -9 3
10₁₃₆: -1 4 [-5] 4 -1
10₁₃₇: 1 -6 [11] -6 1
10₁₃₈: 1 -5 8 [-7] 8 -5 1
10₁₃₉: 1 -1 0 2 [-3] 2 0 -1 1
10₁₄₀: 1 -2 [3] -2 1
10₁₄₁: -1 3 -4 [5] -4 3 -1
10₁₄₂: 2 -3 2 [-1] 2 -3 2
10₁₄₃: 1 -3 6 [-7] 6 -3 1
10₁₄₄: -3 10 [-13] 10 -3
10₁₄₅: 1 1 [-3] 1 1
10₁₄₆: 2 -8 [13] -8 2
10₁₄₇: -2 7 [-9] 7 -2
10₁₄₈: 1 -3 7 [-9] 7 -3 1
10₁₄₉: -1 5 -9 [11] -9 5 -1
10₁₅₀: -1 4 -6 [7] -6 4 -1
10₁₅₁: 1 -4 10 [-13] 10 -4 1
10₁₅₂: 1 -1 -1 4 [-5] 4 -1 -1 1
10₁₅₃: 1 -1 -1 [3] -1 -1 1
10₁₅₄: 1 0 -4 [7] -4 0 1
10₁₅₅: -1 3 -5 [7] -5 3 -1
10₁₅₆: 1 -4 8 [-9] 8 -4 1
10₁₅₇: -1 6 -11 [13] -11 6 -1
10₁₅₈: -1 4 -10 [15] -10 4 -1
10₁₅₉: 1 -4 9 [-11] 9 -4 1
10₁₆₀: -1 4 -4 [3] -4 4 -1
10₁₆₁: 1 0 -2 [3] -2 0 1
10₁₆₂: -3 9 [-11] 9 -3
10₁₆₃: 1 -5 12 [-15] 12 -5 1
10₁₆₄: 3 -11 [17] -11 3
10₁₆₅: -2 10 [-15] 10 -2

Alexander Stoimenow,
stoimeno_stoimenov.net