Numerical integration over the solid angle and volume of the brillouin zone

## Abstract A new method is proposed for the calculation of integrals over the two‐dimensional Brillouin zone (BZ) such as the density of states. The BZ is subdivided into triangles, in which quadratic interpolation over six points for the integrands in wave vector is used, and further subdivision

Angle-resolved photoemission spectra were measured for an oriented film of a model compound of polyethylene (hexatriacontane n-CH,( CH2) s4CH3) using synchrotron radiation. The photon energy (hv) dependence of the normal emission spectra was confirmed to be due to intramolecular energy-band dispersi

An essentially best possible estimate for the order of magnitude of the integration error occurring by numerically integrating multivariate Walsh series in a prime power base b by means of digital (t, m, s)-nets constructed over the finite field ‫ކ‬ b is given.

This article proposes a numerical solution of the diffusion equation for solids obtained by revolution of arbitrarily shaped plane surfaces for the description of heat transfer or mass transport. The diffusion equation is discretized and solved using the finite volume method with fully implicit form