Some remarks concerning unique continuation for the Dirac operator

Let M be a connected Riemannian manifold and let D be a Dirac type operator acting on smooth compactly supported sections in a Hermitian vector bundle over M. Suppose D has a self-adjoint extension A in the Hilbert space of square-integrable sections. We show that any L 2 -section ϕ contained in a c

One of the key issues in the theory of ordered-weighted averaging (OWA) operators is the determination of their associated weights. To this end, numerous weighting methods have appeared in the literature, with their main difference occurring in the objective function used to determine the weights. A

In this paper we prove the uniqueness of positive weak solutions to the problem Here is a bounded domain in R N (N 3) with smooth boundary j , p denotes the p-Laplacian operator defined by p z = div(|∇z| p-2 ∇z); p > 1, g(x, 0) = 0, for a.e. x ∈ , and g(x, u) is a Caratheodory function. We provide

We consider the linearized operators, denoted L d; 1 , of the Ginzburg-Landau operator u + u(1 -|u| 2 ) in R 2 , about the radial solutions u d; 1 (x) = f d (r)e id , for all d ¿ 1. We state the correspondence between the real vector space of the bounded solutions of the equation L d; 1 w=0 and the