DegreesAndMultiplicitiesD4SO_1mod2 := [
[1, 2],
[q*Phi4^2, 2],
[1/2*Phi1^2*Phi3*Phi4, 4],
[1/2*Phi2^2*Phi4*Phi6, 4],
[Phi1^2*Phi3*Phi4, 2*q-2],
[q^2*Phi3*Phi6, 6],
[Phi2^2*Phi4*Phi6, 2*q-6],
[1/2*Phi1^2*Phi2^2*Phi3*Phi6, 2],
[1/2*Phi3*Phi4^2*Phi6, 2],
[1/2*q^3*Phi1^4*Phi3, 2],
[1/2*q*Phi1^2*Phi3*Phi4*Phi6, 4],
[1/2*q^3*Phi4^2*Phi6, 2],
[1/2*q^3*Phi3*Phi4^2, 2],
[1/2*q*Phi2^2*Phi3*Phi4*Phi6, 4],
[1/2*q^3*Phi2^4*Phi6, 2],
[Phi1^3*Phi3*Phi4^2, 1/2*(q-1)^2],
[q*Phi1^2*Phi3*Phi4*Phi6, 2*q-2],
[Phi1*Phi3*Phi4^2*Phi6, q-1],
[q*Phi3*Phi4^2*Phi6, 2],
[Phi2*Phi3*Phi4^2*Phi6, q-3],
[q*Phi2^2*Phi3*Phi4*Phi6, 2*q-6],
[Phi2^3*Phi4^2*Phi6, 1/2*(q-3)^2],
[1/2*Phi1^2*Phi3*Phi4^2*Phi6, 2*q-2],
[1/2*q^2*Phi1^2*Phi3*Phi4^2, 4],
[1/2*q^2*Phi1^2*Phi2^2*Phi3*Phi6, 4],
[1/2*Phi1^2*Phi2^2*Phi3*Phi4*Phi6, 4*q-8],
[1/2*q^2*Phi3*Phi4^2*Phi6, 4],
[1/2*q^2*Phi2^2*Phi4^2*Phi6, 4],
[1/2*Phi2^2*Phi3*Phi4^2*Phi6, 2*q-6],
[Phi1^2*Phi3*Phi4^2*Phi6, 1/2*(q-1)*(q-3)],
[q^2*Phi1^2*Phi3*Phi4^2, 2*q-2],
[q*Phi1*Phi3*Phi4^2*Phi6, 3*q-3],
[Phi1^3*Phi2^3*Phi3*Phi6, (q-1)*(q+1)],
[Phi1^2*Phi2^2*Phi3*Phi4*Phi6, (q-1)*(q-2)],
[q^6*Phi3*Phi6, 6],
[Phi1*Phi2*Phi3*Phi4^2*Phi6, (q-1)*(q-2)],
[q^2*Phi3*Phi4^2*Phi6, 2],
[q^2*Phi2^2*Phi4^2*Phi6, 2*q-6],
[q*Phi2*Phi3*Phi4^2*Phi6, 3*q-9],
[Phi2^2*Phi3*Phi4^2*Phi6, 1/2*(q-3)*(q-5)],
[1/2*Phi1^3*Phi3*Phi4^2*Phi6, q-1],
[1/2*q^3*Phi1^2*Phi3*Phi4*Phi6, 4],
[1/2*Phi1^2*Phi2*Phi3*Phi4^2*Phi6, q-3],
[1/2*Phi1*Phi2^2*Phi3*Phi4^2*Phi6, q-1],
[1/2*q^3*Phi2^2*Phi3*Phi4*Phi6, 4],
[1/2*Phi2^3*Phi3*Phi4^2*Phi6, q-3],
[q*Phi1^4*Phi3*Phi4^2, 1/2*(q-1)^2],
[Phi1^3*Phi3*Phi4^2*Phi6, 1/8*(q-3)*(q-1)^2],
[q^3*Phi1^2*Phi3*Phi4*Phi6, 2*q-2],
[q*Phi1^2*Phi3*Phi4^2*Phi6, (q-1)*(q-2)],
[Phi1^2*Phi2*Phi3*Phi4^2*Phi6, 1/8*(q-1)*(3*q^2-6*q-1)],
[q^2*Phi1*Phi3*Phi4^2*Phi6, 3*q-3],
[q*Phi1*Phi2*Phi3*Phi4^2*Phi6, 2*(q-1)*(q-2)],
[q^7*Phi4^2, 2],
[q^3*Phi3*Phi4^2*Phi6, 2],
[Phi1*Phi2^2*Phi3*Phi4^2*Phi6, 3/8*(q-3)*(q-1)^2],
[q^2*Phi2*Phi3*Phi4^2*Phi6, 3*q-9],
[q^3*Phi2^2*Phi3*Phi4*Phi6, 2*q-6],
[q*Phi2^2*Phi3*Phi4^2*Phi6, (q-3)*(q-4)],
[q*Phi2^4*Phi4^2*Phi6, 1/2*(q-3)^2],
[Phi2^3*Phi3*Phi4^2*Phi6, 1/8*(q-5)*(q-3)^2],
[1/2*Phi1^4*Phi3*Phi4^2*Phi6, 1/4*(q-1)*(q-3)],
[1/2*q*Phi1^3*Phi3*Phi4^2*Phi6, q-1],
[1/2*Phi1^3*Phi2*Phi3*Phi4^2*Phi6, 1/2*(q-1)^2],
[1/2*q^2*Phi1^2*Phi3*Phi4^2*Phi6, 2*q-2],
[1/2*q^6*Phi1^2*Phi3*Phi4, 4],
[1/2*q*Phi1^2*Phi2*Phi3*Phi4^2*Phi6, q-3],
[1/2*Phi1^3*Phi2^3*Phi3*Phi4*Phi6, (q-1)*(q+1)],
[1/2*q^4*Phi1^2*Phi2^2*Phi3*Phi6, 2],
[1/2*q^2*Phi1^2*Phi2^2*Phi3*Phi4*Phi6, 4*q-8],
[1/2*Phi1^2*Phi2^2*Phi3*Phi4^2*Phi6, 1/2*(3*q-5)*(q-3)],
[1/2*q^4*Phi3*Phi4^2*Phi6, 2],
[1/2*q^6*Phi2^2*Phi4*Phi6, 4],
[1/2*q*Phi1*Phi2^2*Phi3*Phi4^2*Phi6, q-1],
[1/2*Phi1*Phi2^3*Phi3*Phi4^2*Phi6, 1/2*(q-1)^2],
[1/2*q^2*Phi2^2*Phi3*Phi4^2*Phi6, 2*q-6],
[1/2*q*Phi2^3*Phi3*Phi4^2*Phi6, q-3],
[1/2*Phi2^4*Phi3*Phi4^2*Phi6, 1/4*(q-3)*(q-5)],
[Phi1^4*Phi3*Phi4^2*Phi6, 1/192*(q-5)*(q-1)*(q-3)*(q+1)],
[q*Phi1^3*Phi3*Phi4^2*Phi6, 1/8*(q-3)*(q-1)^2],
[q^3*Phi1^3*Phi3*Phi4^2, 1/2*(q-1)^2],
[Phi1^3*Phi2*Phi3*Phi4^2*Phi6, 1/16*(q+1)*(q-1)^3],
[q^2*Phi1^2*Phi3*Phi4^2*Phi6, 1/2*(q-1)*(q-3)],
[Phi1^4*Phi2^2*Phi3*Phi4^2, 1/6*q*(q-1)*(q+1)^2],
[q^6*Phi1^2*Phi3*Phi4, 2*q-2],
[q*Phi1^2*Phi2*Phi3*Phi4^2*Phi6, 1/8*(q-1)*(3*q^2-6*q-1)],
[q^3*Phi1*Phi3*Phi4^2*Phi6, q-1],
[Phi1^4*Phi2^4*Phi3*Phi6, 1/16*(q-1)*(q+1)*(q^2-5)],
[q^2*Phi1^3*Phi2^3*Phi3*Phi6, (q-1)*(q+1)],
[Phi1^3*Phi2^3*Phi3*Phi4*Phi6, 1/8*(q-1)*(q+1)*(3*q^2-7)],
[q^2*Phi1^2*Phi2^2*Phi3*Phi4*Phi6, (q-1)*(q-2)],
[q^12, 2],
[Phi1^2*Phi2^2*Phi3*Phi4^2*Phi6, 1/32*(q-1)*(q-3)*(3*q^2-19)],
[q^2*Phi1*Phi2*Phi3*Phi4^2*Phi6, (q-1)*(q-2)],
[Phi1^2*Phi2^4*Phi4^2*Phi6, 1/6*q*(q+1)*(q-1)^2],
[q^6*Phi2^2*Phi4*Phi6, 2*q-6],
[q*Phi1*Phi2^2*Phi3*Phi4^2*Phi6, 3/8*(q-3)*(q-1)^2],
[q^3*Phi2*Phi3*Phi4^2*Phi6, q-3],
[Phi1*Phi2^3*Phi3*Phi4^2*Phi6, 1/16*(q-3)*(q-1)^3],
[q^3*Phi2^3*Phi4^2*Phi6, 1/2*(q-3)^2],
[q^2*Phi2^2*Phi3*Phi4^2*Phi6, 1/2*(q-3)*(q-5)],
[q*Phi2^3*Phi3*Phi4^2*Phi6, 1/8*(q-5)*(q-3)^2],
[Phi2^4*Phi3*Phi4^2*Phi6, 1/192*(q-5)*(q-1)*(q-7)*(q-3)]
];