The convex algebraic geometry of linear inverse problems

there is a great need for more purposeful quantitative and qualitative research on effective classroom adolescent literacy practices-research that informs teachers about the kind

Maintaining himself loyal to Hegel, he accepts the rel- evance of civil society, but always subordinate to the State, the true “we”, as the interests of the civil society and the

Numerical Simulations of Viscoelastic Fluid Flows Past a Transverse Slot Using Least-Squares Finite Element Methods Hsueh-Chen Lee1.. Abstract This paper presents a least-squares

We introduce a family of DG methods for (1.1)–(1.3) based on the coupling of a DG approximation to the Vlasov equation (transport equation) with several mixed finite element methods

The proof is immediate by considering that the quadratic fidelity term and, under condition (3.10), the total functional J in (1.1), are both convex functions, hence locally

The existence of the best linear unbiased estimators (BLUE) for parametric es- timable functions in linear models is treated in a coordinate-free approach, and some relations

We shall see that this phenomenon coincides with an omnipresence of time in society where individuals, confronted with more time, in an ever more disturbing world, find refuge

The schemes are con- structed by combing a discontinuous Galerkin approximation to the Vlasov equation together with a mixed finite element method for the Poisson problem.. We