Aula Conversi (Dip. di Fisica - Edificio G. Marconi)
Aula Conversi
Dip. di Fisica - Edificio G. Marconi
Description
The dynamics of quantum many-body systems poses a major challenge to
computational physicists and chemists. While the Schroedinger equation
contains the formal solution of the problem, physical understanding requires that
we develop effective equations of motion for the variables of interest. At
stake is the possibility of understanding processes like ionization, dissociation,
tunneling, scattering, and chemical reactions. Time-dependent density functional
theory(TDDFT) has long offered a relatively simple method for including
many-body effects in the description of the dynamics. However, in recent years some
limitations of TDDFT have come to light, which have prompted the
introduction of a higher version of the theory, the so-called time-dependent current
density functional theory (TDCDFT). In this talk I review the original
motivation and early successes of TDCDFT. I then proceed to describe a very recent
spinoff of this theory, which we call Quantum Continuum Mechanics. Classical
continuum mechanics is a theory of the dynamics of classical liquids and
solids in which the state of the body is described by a small set of collective
fields, such as the displacement field in elasticity theory; density, velocity, and
temperature in hydrodynamics. A similar description is possible for quantum
many-body systems, and indeed its existence is guaranteed by the basic theorems of
time dependent current density functional theory. In this talk I show how the
exact Heisenberg equation of motion for the current density of a many-body
system can be closed by expressing the quantum stress tensor as a functional of
the current density. Several approximation schemes for this functional are
discussed. The simplest scheme allows us to bypass the solution of the
time-dependent Schroedinger equation, resulting in an equation of motion for the
displacement field that requires only ground-state properties as an input. This
approach may have significant advantages over conventional density- and
current-density functional approaches for large systems, particularly for systems that
exhibit strongly collective behavior. I illustrate the formalism by applying it
to the calculation of excitation energies in simple one- and two-electron
systems.
