The equivalence of semidefinite relaxations of polynomial 0–1 and ± 1 programs via scaling

The computational formalism of the full-potential all-electron linearized augmented plane wave plus local orbitals (FP-LAPW+lo) method has been employed to study the relaxation of the d-Pu(1 1 1) surface and the consequent effects for atomic adsorption of C, N, and O atoms on this surface. The under

A necessary and sufficient condition of regularity of \((0,1, \ldots, m-2, m)\)-interpolation on the zeros of the Jacobi polynomials \(P_{n}^{(x, \beta)}(x)(\alpha, \beta \geqslant-1)\) in a manageable form is established. Meanwhile, the explicit representation of the fundamental polynomials, when t

Neutralization of keV He + , Ne + and F + ions colliding on NaCl(0 0 1) at grazing incidence is studied by energy loss in coincidence with emitted electrons. Three closely related Auger-like mechanisms are identified. In all processes, two electrons are removed from the valence band, one is captured