New Knot and Link Tables

n=8

Generating link: 3 1,2,-2, (3 1,2,2-) (8₈³)

Family: (2k+1) 1,(2l),-(2l), k ³ l

Number of components: 3

Alexander polynomial:

å_i=1^2l+1(ⁱ/₂ + [(i²)/2])(-t)^{i - 1}+ å_i=0^l-2(2 - i² + 3 l + 3 l²)t^{3l - i} - (1 + 5l + 2l²)t^{2l + 1}]

for k=l;

å_i=1^2l+1(ⁱ/₂ + [(i²)/2])(-t)^{i - 1} + å_i=1^{k
- 2l + 1}(4l² + 4l)(-t)^{2l
+ k + 1 - i}

+ å_i=0^2l-2([(-3i)/2] - [(i²)/2] + 4 l + 4l²)(-t)^{4l
- i - 1}] for k ³ 2l;

1 - 3t + 6t² + å_i=1^k8(-t)^{k + i}] for l=1;

å_i=2^2l+1([(i²)/2] - ⁱ/₂)(-t)^{i
- 2} + å_i=0^{2k
- 2l + 1}([3i/2] - [(i²)/2] + l + 2 il + 2l²)(-t)^{2l + i - 1}

+ å_i=4l-2k^2l-k-1(2 - i² + k - k² + 2 l + 4 kl)(-t)^{2l
+ k - i}] otherwise.

Unlinking number: 2l+k+1

Signature: 2k-4l+2

Please respect the condition k ³ l

k= l=

Conway symbol:

Number of components:

3

Alexander polynomial:

Alexander polynomial:

Signature: