Uniqueness of solutions for a fractional thermostat model

In this paper, we present a sufficient condition for the uniqueness of solutions to a nonlocal fractional boundaryvalue problem which can be considered as the fractional version to the thermostat model. As application of ourresult, we study the eigenvalues problem associated and, moreover, we get a Lyapunov-type inequality.

A plate oscillating across a liquid interface: effects of contact-angle hysteresis

We consider the oscillatory motion of a solid plate into and out of a bath of liquid. Assuming that the displacement amplitude of the plate motion is small and that the capillary number is small, the problem reduces to solving an interfacial boundaryvalue problem for the response of the contact line. The characteristic contact angle versus contact-line speed relationship includes contact-angle hysteresis which is assumed small and comparable to the amplitude of the plate motion. Sinusoidal and square-wave plate motions are considered. We find that the contact line moves with the plate if the contact line is fixed, but has relative motion otherwise. It would then advance part of the time, recede part of the time, and remain stationary in the transition periods. Further, we find that both contact-angle hysteresis and steepening of the contact angle with increasing contact-line speed are dissipative effects.