Table of Contents
Force-Balance Approach To Functional Approximations
The purpose of this wiki is to create a more or less consistent nomenclature within this project for all participants. Additionally, this is a way to create a collection of relevant sources:
- Framework of the project
- Citations
- Additional information
- Numerical calculations with code or prompt
- Open Questions
- etc.
Overview
Starting with the Hamiltonian \begin{equation} \hat{H} (t) = \hat{H}_0 (t) + H_{\text{int}} (t) \end{equation} describing electorns in an external Potential $V(r,t)$ and an external vectorpotential \vector{A}(\vector{r},t). Here the singele particle part of the Hamiltonian is \begin{equation} H_0 (t) = \sum_{\sigma^\prime, \sigma^{\prime\prime}} \int \!\mathrm{d}r^\prime \hat{\Psi}^{\dagger}(\vec{r}^\prime,\sigma^\prime) h_{\sigma^\prime, \sigma^{\prime\prime}} (\vec{r},-i\nabla,\vec{s},t) \hat{\Psi}(\vec{r}^\prime,\sigma^{\prime\prime}) \quad , \end{equation} with \begin{equation} h_{\sigma^\prime, \sigma^{\prime\prime}} (\vec{r},-i\nabla,\vec{s},t) = \dots \end{equation} and the interaction part of the Hamiltonian is \begin{equation} H_{\text{int}} (t) = \frac{1}{2} \int \!\mathrm{d}x^{\prime} \int \!\mathrm{d}x^{\prime\prime} \nu (\vec{r}^\prime,\vec{r}^{\prime\prime}) \hat{\Psi}^{\dagger}(x^{\prime}) \hat{\Psi}^{\dagger}(x^{\prime\prime}) \hat{\Psi} (x^{\prime\prime}) \hat{\Psi} (x^\prime) \quad . \end{equation} From this the equation of motion(EoM) of the electron current $\frac{\partial}{\partial t}J(\vec{r},t)$ can be derived.
TODO: Main ideas, formulas (→ with additional “calculations nodes”), variables (→ “definition node”), Hamiltonian [1] and linkts to “assumption nodes”
Overview on the used nodes.
Goal
The aim of the project is to describe the KS-DFT as well as the TDDFT by force fields. The functionals to solve the system are described analytically by the force fields. This analytical description cannot be solved numerically so far. Therefore, these force fields are subdivided, some parts of which are solvable and others not. … “theorem nodes” for important pages
References, abbreviations and important variables
Introductory literature can be found here. (Be more precice where to find wich idea) TODO: Short overview on the main formulas variables and abbreviations. Further abbreviations can be found here and important variables can be found here. “complementary nodes”
Abandoned Links
- equation of moiton