Generic hyperbolicity in one-dimensional reaction- diffusion equations with general boundary conditions

This paper presents a continuous adjoint-based optimization theory for a general closed-loop transport hyperbolic model controlled via a periodic boundary control to minimize a cost functional. The periodic boundary control is subject to a nonlinear differential equation constraint, thus resulting i

Semilinear hyperbolic and parabolic initial-boundary value problems are studied. Criteria for solutions of a semilinear hyperbolic equation and a parabolic equation with general forcing term and general boundary condition to blow up in finite time are obtained.

## Abstract In this paper we prove unique solvability of the generalized Stokes resolvent equations in an infinite layer Ω~0~ = ℝ^__n__ –1^ × (–1, 1), __n__ ≥ 2, in __L^q^__ ‐Sobolev spaces, 1 < __q__ < ∞, with slip boundary condition of on the “upper boundary” ∂Ω^+^~0~ = ℝ^__n__ –1^ × {1} and non‐

In this paper, we study delayed reaction-diffusion fuzzy neural networks with general boundary conditions. By using topology degree theory and constructing suitable Lyapunov functional, some sufficient conditions are given to ensure the existence, uniqueness and globally exponential stability of the