A singular Gierer–Meinhardt system of elliptic equations in

We establish the existence of solutions to a singular non-quasimonotone system of equations. Such equations are a special case of the Gierer-Meinhardt equations. In the one dimensional case, the uniqueness result is also proved.

This paper studies the existence of solutions of a nonlinear elliptic system usually called the generalized Gierer-Meinhardt equations. This type of system originally arose in studies of pattern-formation in biology, and has interesting and challenging mathematical properties, especially with Dirich

We construct multi-bump ground-state solutions for this system for all sufficiently small σ . The centers of these bumps are located at the vertices of a regular polygon, while the bumps resemble, after a suitable scaling in their A-coordinate, the unique radially symmetric solution of A similar co