Research Article
Existence of a Conserved Quantity and Stability of In Vitro Virus Infection Dynamics Models with Absorption Effect
Table 4
Normalized conserved quantity for each of the postinoculation time periods.
| | Conserved quantity | t = 0 | t = 1 | t = 2 | t = 3 | t = 4 | t = 5 | t = 6 | t = 7 | t = 8 | t = 9 | -value |
| | Basic model without absorption | 1.0000 | 1.0858 | 0.9977 | 1.0212 | 0.8475 | 0.8552 | 0.8254 | 0.7994 | 0.8185 | 0.8257 | 0.022 | | Latent model without absorption | 1.0000 | 1.0858 | 0.9979 | 1.0216 | 0.8491 | 0.8649 | 0.8667 | 0.9005 | 0.9537 | 0.9694 | 0.078 | | Basic model with absorption | 1.0000 | 1.1222 | 1.0000 | 1.0372 | 0.8281 | 0.9850 | 1.1113 | 1.0283 | 0.9945 | 0.9898 | 0.714 | | Latent model with absorption | 1.0000 | 1.0872 | 0.9980 | 1.0222 | 0.8487 | 0.8727 | 0.8855 | 0.9141 | 0.9615 | 0.9759 | 0.102 |
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