Mathematica: Difference between revisions
From phys813
Jump to navigationJump to search
No edit summary |
|||
| Line 6: | Line 6: | ||
== Mathematics for Quantum Physics == | == Mathematics for Quantum Physics == | ||
*[https://arxiv.org/abs/1403.7050 R. Schmied, ''Using Mathematica for Quantum Mechanics: A Student’s Manual''] | *[https://arxiv.org/abs/1403.7050 R. Schmied, ''Using Mathematica for Quantum Mechanics: A Student’s Manual''] | ||
*[https://www.wolframcloud.com/obj/wolframquantumframework/DeployedResources/Paclet/Wolfram/QuantumFramework/Documentation/tutorial/GettingStarted.html Wolfram Quantum Framework] | *[https://www.wolframcloud.com/obj/wolframquantumframework/DeployedResources/Paclet/Wolfram/QuantumFramework/Documentation/tutorial/GettingStarted.html Wolfram Quantum Framework] | ||
*[https://resources.wolframcloud.com/FunctionRepository/resources/MatrixPartialTrace/ Matrix Partial Trace] calling via ResourceFunction | *[https://resources.wolframcloud.com/FunctionRepository/resources/MatrixPartialTrace/ Matrix Partial Trace] calling via ResourceFunction | ||
*[http://nrgljubljana.ijs.si/sneg/ SNEG package for Dirac notation and second quantization calculations] | |||
== Hands-on Tutorials by the Instructor == | == Hands-on Tutorials by the Instructor == | ||
Revision as of 18:20, 4 February 2025
Hands-on Tutorials by Wolfram
- Wolfram Screencast: Hands-on start to Mathematica
- Fast Introduction for Math Students
- Wolfram Mathematica Tutorial Collection: Mathematics and Algorithms
Mathematics for Quantum Physics
- R. Schmied, Using Mathematica for Quantum Mechanics: A Student’s Manual
- Wolfram Quantum Framework
- Matrix Partial Trace calling via ResourceFunction
- SNEG package for Dirac notation and second quantization calculations
Hands-on Tutorials by the Instructor
Mathematica Notebooks for Statistical Mechanics
- Black-body radiation: Classical vs. quantum statistical mechanics approach
- Essential quantum concepts using spin examples: Quantum states (vectors or density matrices), operators as observables, probabilities and expectation values
- Sommerfeld expansion
- B. Cowan, On the chemical potential of ideal Fermi and Bose gases, J. Low Temp. Phys. 197, 412 (2019). | [PDF and Mathematica notebooks]
