Messoud Efendiev, Vitali Vougalter
Solvability of some integro-differential equations with transport and 
concentrated sources
(157K, pdf)

ABSTRACT.  The work deals with the existence of solutions of an integro-differential equation in the case of the normal diffusion and the influx/efflux term 
proportional to the Dirac delta function in the presence of the drift term. The proof of the existence of solutions relies on a fixed point technique. We use the solvability conditions for the non-Fredholm elliptic operators in unbounded domains and discuss how the introduction of the transport term influences the regularity of the solutions.