Traveling waves for a lattice dynamical system arising in a diffusive endemic model

In contrast to the KP-I equation, now we show that the spectrum of A a (ℓ) is purely imaginary when ℓ and a sufficiently small, i.e., the small periodic waves of the KP-II equation

Existence and stability of traveling wave fronts in reaction advection diffusion equations with nonlocal delay. Theory and Applications of Partial Functional Differential

Our propose is to study monotone traveling waves for the coupled reaction- diffusion and difference system (8) by reducing the problem to the existence of an admissible pair of

In particular, in Sections 6 and 7 we provide explicit conditions for traveling wave solutions which do not satisfy the continuity condition; in some other cases, such a condition

More precisely, given an initial data close to some ground state traveling wave solution for the Schrödinger equation on the Heisenberg group, we want to construct a weak

Gérard, Lenzmann, Pocovnicu and Raphaël [17] deduced the invertibility of the linearized operator for the half-wave equation around the profiles Q β when β is close enough to 1,

We prove the multidimensional stability of planar traveling waves for scalar nonlocal Allen-Cahn equations using semigroup estimates... Note that with Hypothesis (H2) for the kernel

That is why it would be also very interesting to study the stability of the above solitons under a perturbation of the quadratic Szegő equation itself, as was done in [12] for