Self-Similar Grooving Solutions to the Mullins' Equation

Abstract: In 1957, Mullins proposed surface diffusion motion as a model for thermal grooving. By adopting a small slope approximation, he reduced the model to the Mullins' linear surface diffusion equation, (ME)yt + Byxxxx = 0, known also more simply as the Mullins' equation. Mullins sought selfsimilar solutions to (ME) for planar initial conditions, prescribing boundary conditions at the thermal groove, as well as far field decay. He found explicit series solutions which are routinely used in analyzing thermal grooving… Show more