Data:K14n12518/Kauffman Polynomial

[math]\displaystyle{ \text{QuantumGroups$\grave{ }$a}^3 z^{11}+\text{QuantumGroups$\grave{ }$a} z^{11}+\text{QuantumGroups$\grave{ }$a}^6 z^{10}+2 \text{QuantumGroups$\grave{ }$a}^4 z^{10}+2 \text{QuantumGroups$\grave{ }$a}^2 z^{10}+z^{10}+2 \text{QuantumGroups$\grave{ }$a}^7 z^9+2 \text{QuantumGroups$\grave{ }$a}^5 z^9-8 \text{QuantumGroups$\grave{ }$a}^3 z^9-8 \text{QuantumGroups$\grave{ }$a} z^9+\text{QuantumGroups$\grave{ }$a}^8 z^8-6 \text{QuantumGroups$\grave{ }$a}^6 z^8-17 \text{QuantumGroups$\grave{ }$a}^4 z^8-17 \text{QuantumGroups$\grave{ }$a}^2 z^8-7 z^8-13 \text{QuantumGroups$\grave{ }$a}^7 z^7-15 \text{QuantumGroups$\grave{ }$a}^5 z^7+20 \text{QuantumGroups$\grave{ }$a}^3 z^7+24 \text{QuantumGroups$\grave{ }$a} z^7+2 z^7 $Failed^{-1} -6 \text{QuantumGroups$\grave{ }$a}^8 z^6+9 \text{QuantumGroups$\grave{ }$a}^6 z^6+47 \text{QuantumGroups$\grave{ }$a}^4 z^6+51 \text{QuantumGroups$\grave{ }$a}^2 z^6+z^6 $Failed^{-1} +20 z^6+25 \text{QuantumGroups$\grave{ }$a}^7 z^5+31 \text{QuantumGroups$\grave{ }$a}^5 z^5-19 \text{QuantumGroups$\grave{ }$a}^3 z^5-34 \text{QuantumGroups$\grave{ }$a} z^5-9 z^5 $Failed^{-1} +10 \text{QuantumGroups$\grave{ }$a}^8 z^4-5 \text{QuantumGroups$\grave{ }$a}^6 z^4-57 \text{QuantumGroups$\grave{ }$a}^4 z^4-69 \text{QuantumGroups$\grave{ }$a}^2 z^4-5 z^4 $Failed^{-1} -32 z^4-16 \text{QuantumGroups$\grave{ }$a}^7 z^3-22 \text{QuantumGroups$\grave{ }$a}^5 z^3+4 \text{QuantumGroups$\grave{ }$a}^3 z^3+19 \text{QuantumGroups$\grave{ }$a} z^3+9 z^3 $Failed^{-1} -4 \text{QuantumGroups$\grave{ }$a}^8 z^2+5 \text{QuantumGroups$\grave{ }$a}^6 z^2+31 \text{QuantumGroups$\grave{ }$a}^4 z^2+39 \text{QuantumGroups$\grave{ }$a}^2 z^2+6 z^2 $Failed^{-1} +23 z^2+3 \text{QuantumGroups$\grave{ }$a}^7 z+5 \text{QuantumGroups$\grave{ }$a}^5 z+\text{QuantumGroups$\grave{ }$a}^3 z-3 \text{QuantumGroups$\grave{ }$a} z-2 z $Failed^{-1} -2 \text{QuantumGroups$\grave{ }$a}^6-6 \text{QuantumGroups$\grave{ }$a}^4-8 \text{QuantumGroups$\grave{ }$a}^2-2 $Failed^{-1} -5 }[/math]