Nonsmooth Exact Penalization Second-order Methods for incompressible Bingham flows

Abstract

We consider the exact penalization of the incompressibility condition div(u)=0 for the velocity field of a Bingham fluid in terms of the L1-norm. This penalization procedure results in a nonsmooth optimization problem for which we propose an algorithm using generalized second-order information. Our method solves the resulting nonsmooth problem by considering the steepest descent direction and extra generalized second-order information associated to the nonsmooth term. This method has the advantage that the divergence-free property is enforced by the descent direction proposed by the method without the need of build-in divergence-free approximation schemes. The inexact penalization approach, given by the L2-norm, is also considered in our discussion and comparison.