From: A method for determining the robustness of bio-molecular oscillator models
Reaction | Rate expression (R i ) | Rate constant |
---|---|---|
R1(x) | k1x5x1 - k-1x2 | K1 = 5.0 × 107M-1s-1 |
 |  | k-1 = 58s-1 |
R2(x) | k 2 x 2 x 8 | k2 = 1.0 × 107M-1s-1 |
R3(x) | k 3 x 3 x 8 | k3 = 4.0 × 103M-1s-1 |
R4(x) | k 4 x 1 x 6 | k4 = 2.0 × 107M-1s-1 |
R5(x) |
| k5 = 1.0 × 107M-1s-1 |
R6(x) | k 6 x 4 x 6 | k6 = 1.0 × 105M-1s-1 |
R7(x) | k 7 x 10 x 14 | k7 = 1M-1s-1 |
R8(x) | k 8 x 11 x 14 | k8 = 5.0 × 107M-1s-1 |
R9(x) |
| k9 = 5.0 × 108M-1s-1 |
R10(x) | k 10 x 16 x 10 | k10 = 1.0 × 107M-1s-1 |
R11(x) |
| k11 = 6.0 × 107M-1s-1 |
R12(x) | k 12 | k12 = 3.0 × 10-5M-1s-1 |
R13(x) | k13- k-13x 14 | k13 = 1.25 × 10-5M-1s-1 |
 |  | k-13 = 4.5 × 10-2M-1s-1 |
R14(x) | k14(x7-x14) | k14 = 30s-1 |
R15(x) | k15(x5-x12) | k15 = 30s-1 |
R16(x) | k16(x8-x15) | k16 = 10s-1 |
R17(x) | k17(x9-x16) | k17 = 10s-1 |
R18(x) | k18(x6-x13) | k18 = 0.01s-1 |
R19(x) |
| V = 288 × 10-6M-1s-1 |
 |  | L = 550 |
 |  | k0 = 1.5 × 10-6M |
 |  | k N = 60 × 10-6M |