This shows you the differences between two versions of the page.
Both sides previous revision Previous revision Next revision | Previous revision Next revision Both sides next revision | ||
week2 [2014/07/21 09:33] bogner |
week2 [2014/07/23 10:52] schunck [Wednesday, July 23] |
||
---|---|---|---|
Line 11: | Line 11: | ||
* [[peter3|Peter Ring 3]]: Nuclear forces: Invariance properties | * [[peter3|Peter Ring 3]]: Nuclear forces: Invariance properties | ||
==== Tuesday, July 22 ==== | ==== Tuesday, July 22 ==== | ||
- | * [[nicolas1|Nicolas Schunck 1]]: Phenomenological nuclear forces: Skyrme and Gogny forces, concept of energy density functional (EDF), effective pseudopotentials, experimental constraints | + | * [[nicolas1|Nicolas Schunck 1]]: Phenomenological nuclear forces: Skyrme and Gogny forces, concept of energy density functional (EDF), effective pseudopotentials, experimental constraints. |
+ | |||
+ | Slides can be found {{cours1.pdf|here}}. A detailed demonstration of the contribution to the energy density coming from the $t_{0}$ term of the Skyrme potential is presented {{demo.pdf|here}}. If I were you, I would check that the derivation is correct, since I actually forgot some important summations in class... | ||
==== Wednesday, July 23 ==== | ==== Wednesday, July 23 ==== | ||
- | * [[nicolas2|Nicolas Schunck 2]]: Density functional theory (DFT): Existence theorems, Kohn-Sham schemes, local density approximation, gradient exchanges, exchange-correlation, self-interaction | + | * [[nicolas2|Nicolas Schunck 2]]: Density functional theory (DFT): Existence theorems, Kohn-Sham scheme in electronic structure theory; the energy density functional (EDF) framework in nuclear structure. Lecture notes can be found {{cours2.pdf|here}}. |
==== Thursday, July 24 ==== | ==== Thursday, July 24 ==== | ||
* [[bogner3|Scott Bogner 3]]: Realistic nuclear potentials: Introduction to chiral effective field theory, diagrammatic expansions, power counting | * [[bogner3|Scott Bogner 3]]: Realistic nuclear potentials: Introduction to chiral effective field theory, diagrammatic expansions, power counting |