Team:Paris/Modeling/f8
From 2008.igem.org
At the steady-state, we haveand
so the expression
gives
and
and for calculated values of the TF,
and
param | signification | unit | value |
[expr(pFlhB)] | expression rate of pFlhB with RBS E0032 | nM.s-1 | see "findparam" need for 20 + 20 measures and 5x5 measures for the SUM? |
γGFP | dilution-degradation rate of GFP(mut3b) | s-1 | ln(2)/3600 |
[GFP] | GFP concentration at steady-state | nM | need for 20 + 20 measures and 5x5 measures for the SUM? |
(fluorescence) | value of the observed fluorescence | au | need for 20 + 20 measures and 5x5 measures for the SUM? |
conversion | conversion ration between fluorescence and concentration | nM.au-1 | (1/79.429) |
param | signification corresponding parameters in the equations | unit | value |
β57 | production rate of FlhDC-pFlgB with RBS E0032 β57 | nM.s-1 | |
(K51/{coefflhDC}n51) | activation constant of FlhDC-pFlgB K51 | nMn51 | |
n51 | complexation order of FliA-pFlgB n51 | no dimension | |
β58 | production rate of FliA-pFlgB with RBS E0032 β52 | nM.s-1 | |
(K52/{coeffliA}n52) | activation constant of FliA-pFlgA K52 | nMn52 | |
n52 | complexation order of FliA-pFlgB n52 | no dimension |
Then, if we have time, we want to verify the expected relation