The quasiclassical approximation to Dirac equation. I
スポンサーリンク
概要
- 論文の詳細を見る
The mathematical foundation to the quasi-classical approximation to the Dirac equation is discussed. After constructing the propagator $U^\kappa(t,s)$ and the quasi-classical propagator for the Dirac equation in an external electro-magnetic field, the usual quasi-classical approximation to the wave function $U^\kappa(t,s)(\exp (iS(x)/h)f)$ is obtained with error estimates in the Hilbert $L^2(R^3,C^4)$.
- Faculty of Science, The University of Tokyo,Department of Mathematics Faculty of Science University of Tokyoの論文
- 1982-03-31
Faculty of Science, The University of Tokyo,Department of Mathematics Faculty of Science University of Tokyo | 論文
- On holomorphic cusp forms on quaternion unitary groups of degree $2$
- The intermediate logics on the second slice
- On Atiyah-Patodi-Singer $\eta $-invariant for $S\sp{1}$-bundles over Riemann surfaces
- Gromov invariant and $S\sp{1}$-actions
- On the semi-discrete finite element approximation for the nonstationary Navier-Stokes equation