We establish the logarithmic Bramson correction to the position of solutions to the Fisher--KPP equation with nonlocal diffusion. Solutions with step-like initial data typically resemble a front at position $c_{*} t - \frac{3}{2 \lambda_{*}} \log t + \mathcal{O}(1)$ for explicit constants $c_{*}$ and $\lambda_{*}$. However, certain singular diffusions exhibit more exotic behavior.
Propagation dynamics of Fisher-KPP equation with time delay and free boundaries
Biological invasions and epidemics with nonlocal diffusion along a line
Long-time dynamics of a competition model with nonlocal diffusion and free boundaries: Vanishing and spreading of the invader
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