Existence of time periodic solutions for the Nicholson's blowflies model with Newtonian diffusion

E,H obeys Maxwell's equations 1.4 , 1.5 , and 1.6 . The unknown Ž . w . functions , , E, H depend on t, x g 0, ϱ , where t, x denote the time 1 2 and space variable resp. ⍀ ; ‫ޒ‬ 3 is a bounded Lipschitz-domain with Ѩ ⍀ s ⌫ j ⌫ , where ⌫ , ⌫ are disjoint subsets of Ѩ ⍀. ⌫ represents the D N D N D pe

## Abstract In this short note, we study a strongly coupled system of partial differential equations which models the dynamics of a two‐predator‐one‐prey ecosystem in which the prey exercises defense switching and the predators collaboratively take advantage of the prey's strategy. We prove the exi

We consider a 3-component Lotka-Volterra model with diffusion which describes the dynamics of the population of two competing prey and one predator, and we discuss the existence of positive stationary solutions and their stability property. To do this, the singular perturbation method and the associ

We prove global existence of weak solutions of the drift diffusion model for semiconductors coupled with Maxwell's equations for the electromagnetic field by using a Galerkin method. The recombinations term for the density of electrons and holes may depend on the densities, the gradient of the densi