In this work, we consider the problem of optimal design of an acoustic cloak under
uncertainty and develop scalable approximation and optimization methods to solve this …

We study an optimal control problem under uncertainty, where the target function is the
solution of an elliptic partial differential equation with random coefficients, steered by a …

Uncertainty is inevitable when solving science and engineering application problems. In the
face of uncertainty, it is essential to determine robust and risk-averse solutions. In this work …

In this work we review a reduced basis method for the solution of uncertainty quantification
problems. Based on the basic setting of an elliptic partial differential equation with random …

We present a method for optimal control of systems governed by partial differential
equations (PDEs) with uncertain parameter fields. We consider an objective function that …

A learning approach for optimal feedback gains for nonlinear continuous time control
systems is proposed and analysed. The goal is to establish a rigorous framework for …

Uncertainty is ubiquitous in virtually all engineering applications, and, for such problems, it is
inadequate to simulate the underlying physics without quantifying the uncertainty in …

Our times can be characterized by, among many other attributes, the seemingly increasing
speed of everything. Within science, it has led to the publication explosion, which reflects the …

We consider the numerical approximation of an optimal control problem for an elliptic Partial
Differential Equation (PDE) with random coefficients. Specifically, the control function is a …

We present a numerical method to efficiently solve optimization problems governed by large-
scale nonlinear systems of equations, including discretized partial differential equations …