Please ensure you check the module availability box for each module outline, as not all modules will run each academic year.
PHYS3711: Condensed Matter Physics 3
|Type||Open||Level||3||Credits||20||Availability||Available in 2019/20||Module Cap||None.||Location||Durham
- Foundations of Physics 2A (PHYS2581) AND Foundations of Physics 2B (PHYS2591) AND (Mathematical Methods in Physics (PHYS2611) OR Analysis in Many Variables (MATH2031))
- Foundations of Physics 3A (PHYS3621) AND Foundations of Physics 3B (PHYS3631)
Excluded Combination of Modules
- This module is designed primarily for students studying Department of Physics or Natural Sciences degree programmes.
- It illustrates the relevant physics utilised in modern condensed matter physics based on scale, symmetry and the structure of matter and contains both material on "hard" condensed matter and an introduction to topics in soft matter physics.
- Symmetry structure and excitations: Overview of energy, length and time scales in different areas of CMP. Comparison of hard CMP and soft CMP. Cohesion in solids. Introduction to symmetry and its influence on physical properties. The symmetry of crystals. Measuring structure using diffraction. Elementary excitations from a ground state: single particles and collective excitations in solids. Phonons in a system with a two atom basis: acoustic and optic branches. Anharmonic effects, soft modes. Measuring excitations using scattering and spectroscopy.
- Introduction to soft matter physics: Introduction to soft matter physics and its basic phenomenology. Polymer physics and scaling. Liquid crystals. Free energies. Diffusion (Einstein diffusion coefficients, Peclet number and Fick’s laws). Elasticity of solids.
- Broken symmetry: Symmetry breaking at phase transitions as a method of classifying the phenomena studied in CMP. Phase transitions and critical exponents. Excitations in a broken symmetry system. Generalised rigidity and order. Topological defects. How other systems fit into this framework: superconductors and superfluids; classical examples (binary fluids, polymers, liquid crystals etc.); weak interactions in the standard model, cosmological examples. Other topological objects: vortices, monopoles, skyrmions (in outline). Applications of broken symmetry systems.
- Having studied this module, students will have an understanding of the themes of modern condensed matter research, and an appreciation of role of scales, symmetry and the structure of matter. They will have become familiar with the physics of a number of examples taken from across the subject.
- They will understand the elements of soft matter structure, its dynamics, elasticity and phase transitions.
- They will understand the notion of broken symmetry and its consequences and an appreciation of the classification of phenomena in solids that this allows.
- In addition to the acquisition of subject knowledge, students will be able to apply the principles of physics to the solution of complex problems.
- They will know how to produce a well-structured solution, with clearly-explained reasoning and appropriate presentation.
Modes of Teaching, Learning and Assessment and how these contribute to the learning outcomes of the module
- Teaching will be by lectures and workshops.
- The lectures provide the means to give a concise, focused presentation of the subject matter of the module. The lecture material will be defined by, and explicitly linked to, the contents of the recommended textbooks for the module, thus making clear where students can begin private study. When appropriate, the lectures will also be supported by the distribution of written material, or by information and relevant links on DUO.
- Regular problem exercises and workshops will give students the chance to develop their theoretical understanding and problem solving skills.
- Students will be able to obtain further help in their studies by approaching their lecturers, either after lectures or at other mutually convenient times.
- Student performance will be summatively assessed through an examination and formatively assessed through problem exercises and a progress test. The examination will provide the means for students to demonstrate the acquisition of subject knowledge and the development of their problem-solving skills.
- The problem exercises and progress test provide opportunities for feedback, for students to gauge their progress and for staff to monitor progress throughout the duration of the module.
Teaching Methods and Contact Hours
|Lectures||39||2 per week||1 Hour||39|
|Preparation and Reading||144|
|Component: Examination||Component Weighting: 100%|
|Element||Length / duration||Element Weighting||Resit Opportunity|
|Written Examination||3 Hours||100%||None|
Problem exercises and self-assessment; one progress test, workshops and problems solved therein.
■ Attendance at all activities marked with this symbol will be monitored. Students who fail to attend these activities, or to complete the summative or formative assessment specified above, will be subject to the procedures defined in the University's General Regulation V, and may be required to leave the University