TY - JOUR
T1 - The fastest evolutionary trajectory
AU - Traulsen, Arne
AU - Iwasa, Yoh
AU - Nowak, Martin A.
PY - 2007/12/7
Y1 - 2007/12/7
N2 - Given two mutants, A and B, separated by n mutational steps, what is the evolutionary trajectory which allows a homogeneous population of A to reach B in the shortest time? We show that the optimum evolutionary trajectory (fitness landscape) has the property that the relative fitness increase between any two consecutive steps is constant. Hence, the optimum fitness landscape between A and B is given by an exponential function. Our result is precise for small mutation rates and excluding back mutations. We discuss deviations for large mutation rates and including back mutations. For very large mutation rates, the optimum fitness landscape is flat and has a single peak at type B.
AB - Given two mutants, A and B, separated by n mutational steps, what is the evolutionary trajectory which allows a homogeneous population of A to reach B in the shortest time? We show that the optimum evolutionary trajectory (fitness landscape) has the property that the relative fitness increase between any two consecutive steps is constant. Hence, the optimum fitness landscape between A and B is given by an exponential function. Our result is precise for small mutation rates and excluding back mutations. We discuss deviations for large mutation rates and including back mutations. For very large mutation rates, the optimum fitness landscape is flat and has a single peak at type B.
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U2 - 10.1016/j.jtbi.2007.08.012
DO - 10.1016/j.jtbi.2007.08.012
M3 - Article
C2 - 17900629
AN - SCOPUS:35748951638
SN - 0022-5193
VL - 249
SP - 617
EP - 623
JO - Journal of Theoretical Biology
JF - Journal of Theoretical Biology
IS - 3
ER -