Abstract
We investigate the one-dimensional Keller–Segel model where the diffusion is replaced by a non-local operator, namely the fractional diffusion with exponent 0 < α ⩽ 2. We prove some features related to the classical two-dimensional Keller–Segel system: blow-up may or may not occur depending on the initial data. More precisely a singularity appears in finite time when α < 1 and the initial configuration of cells is sufficiently concentrated. On the other hand, global existence holds true for α ⩽ 1 if the initial density is small enough in the sense of the L1/α norm.
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