Theory and Modern Applications
Table 2 The values of \(\mathcal{R}_{0}\) and \(\mathcal{R}_{1}\) for system (2) with different values of τ
From: Stability of delayed pathogen dynamics models with latency and two routes of infection
Ï„ | Steady state | \(\mathcal{R}_{0}\) | \(\mathcal{R}_{1}\) |
|---|---|---|---|
0.0 | \(\Omega_{2}= ( 768.22,2.10709,2.52851,2.5,30.5702 ) \) | 2.29091 | 2.52851 |
0.1 | \(\Omega_{2}=(781.675,1.7959,2.15508,2.5,18.99995)\) | 1.932 | 1.95 |
0.3 | \(\Omega_{2}=(802.817,1.32797,1.59356,2.5,3.61083)\) | 1.38295 | 1.18054 |
0.35 | \(\Omega_{2}=(807.127,1.2356,1.48271,2.5,0.897031)\) | 1.27384 | 1.04485 |
0.368091 | \(\Omega_{1}=(808.604,1.20415,1.44498,2.5,0)\) | 1.2367 | 1 |
0.4 | \(\Omega_{1}=(851.774,0.903263,1.08392,1.81643,0)\) | 1.17402 | 0.92589 |
0.45 | \(\Omega_{1}=(923.657,0.442529,0.531034,0.846506,0)\) | 1.08265 | 0.82142 |
0.499367 | \(\Omega_{0}=(1000,0,0,0,0)\) | 1 | 0.73062 |
0.5 | \(\Omega_{0}=(1000,0,0,0,0)\) | 0.99899 | 0.72953 |
0.6 | \(\Omega_{0}=(1000,0,0,0,0)\) | 0.85209 | 0.57720 |