par Bonheure, Denis 
;Casteras, Jean-Baptiste ;Földes, Juraj
Référence Journal de mathématiques pures et appliquées, 134, page (204–254)
Publication Publié, 2020-01-01
;Casteras, Jean-Baptiste ;Földes, JurajRéférence Journal de mathématiques pures et appliquées, 134, page (204–254)
Publication Publié, 2020-01-01
Article révisé par les pairs
| Résumé : | We study singular radially symmetric solution of the stationary Keller-Segel equation, that is, an elliptic equation with exponential nonlinearity, which is super-critical in dimension N≥3. The solutions are unbounded at the origin and we show that they describe the asymptotics of bifurcation branches of regular solutions. It is shown that for any ball and any k≥0, there is a singular solution that satisfies Neumann boundary condition and oscillates at least k times around the constant equilibrium. Moreover, we prove that in dimension 3≤N≤9 there are regular solutions satisfying Neumann boundary conditions that are close to singular ones when the value at the origin is close to infinity. Hence, it follows that there exist regular solutions on any ball with arbitrarily fast oscillations. For generic radii, we show that the bifurcation branches of regular solutions oscillate in the bifurcation plane when 4≤N≤9 and approach to a singular solution. In dimension N>10, we show that the Morse index of the singular solution is finite, and therefore the existence of regular solutions with fast oscillations is not expected. |
