Aug 10, 2018 · In this paper, we give results on primal-dual shape sensitivity analysis that extends the class of shape-differentiable problems supported by ...

In this concept a vector field is introduced that deforms the unknown shape toward the optimum. We characterize the elliptic interface problems whose solutions ...

Abstract. A class of convex constrained minimization problems over polyhedral cones for geometry-dependent quadratic objective functions is considered in a ...

Shape differentiability of the primal minimization problem needs a bijective property for mapping of the primal cone. This restrictive assumption is relaxed to ...

The shape differentiability result is applied to overdetermined free-boundary and inverse problems expressed by least-square solutions. The theory is supported ...

Shape Differentiability of Lagrangians and Application to Stokes Problem · V. A. Kovtunenko, K. Ohtsuka · Published in SIAM Journal of Control and… 10 August 2018 ...

ArticlePDF Available. Shape Differentiability of Lagrangians and Application to Stokes Problem. January 2018; SIAM Journal on Control and Optimization 56(5): ...

In this paper, we give results on primal-dual shape sensitivity analysis that extends the class of shape-differentiable problems supported by an explicit ...

This paper establishes the shape derivative of geometry-dependent objective functions for use in constrained variational problems. Using a Lagrangian ...

Shape identification of the incompressible viscous Newtonian fluid flows governed by the Navier–Stokes equations has many important engineering applications [1] ...