\(Q\)-conditional symmetries and exact solutions of nonlinear reaction-diffusion systems (Q2406252)

Summary: A wide range of reaction-diffusion systems with constant diffusivities that are invariant under \(Q\)-conditional operators is found. Using the symmetries obtained, the reductions of the corresponding systems to the systems of ODEs are conducted in order to find exact solutions. In particular, the solutions of some reaction-diffusion systems of the Lotka-Volterra type in an explicit form and satisfying Dirichlet boundary conditions are obtained. An biological interpretation is presented in order to show that two different types of interaction between biological species can be described.