ZBL MS 63/6Satco, Bianca-Renata; Turcu, Corneliu-Octavian Henstock-Kurzweil-Pettis integral and weak topologies in nonlinear integral equations on time scalesMathematica Slovaca, volume 63 (2013)\no 6 pp. 1347-1360

The authors prove an existence result for a nonlinear integral equation on time scales under weak topology assumption in the target Banach space. In the setting of vector valued functions on time scales they consider the Henstock-Kurzweil-Pettis $\Delta$-integral which is a kind of Henstock integral recently introduced by Cichon, M. [Commun. Math. Anal. 11 (2011), no. 1, 94�110].In this framework they show the existence of weakly continuous solutions for an integral equationx(t)= f(t, x(t))+ (HKP)\int_0^t g(t,s,x(s)) \Delta sgoverned by the sum of two operators: a continuous operator and an integral one.The main tool to get the solutions is a generalization of Krasnosel'skii fixed point theorem obtained in sequentially complete locally convex spaces by Vladimirescu, C. [Libertas Math. 28 (2008), 61�67]. Reviewed by L. Di Piazza