| Detailed information |
| Original study plan |
Bachelor's programme Technical Mathematics 2022W |
| Objectives |
Students will be able to handle singular integral operators and to apply them to regularity and existence for solutions to Dirichlet problems in non-smooth/fractal domains.
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| Subject |
This course presents important classes of integral operators arising frequently in pure and applied harmonic analysis, digital signal processing, optics and electrical engineering. The course covers the Hilbert transform, Riesz transforms, double layer potentials, Calderon-Zygmund operators and applies them to the regularity and existence theory for solutions of the Laplacian operator.
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| Criteria for evaluation |
Oral exam
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| Methods |
Blackbord presentation
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| Language |
English and French |
| Study material |
Course notes and weekly handouts
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| Changing subject? |
No |
| Further information |
Until term 2022S known as: TM1WAVOSING VL Singular integrals and potential theory
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| Earlier variants |
They also cover the requirements of the curriculum (from - to)
TM1WAVOSING: VO Singular integrals and potential theory (2002W-2022S)
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