401-3462-00L  Functional Analysis II

SemesterSpring Semester 2016
LecturersD. A. Salamon
Periodicityyearly recurring course
Language of instructionEnglish

Catalogue data

AbstractSobolev spaces, Calderon-Zygmund inequality,
elliptic regularity, strongly continuous semigroups,
parabolic pde's.
ObjectiveThe lecture course will begin with an introduction to Sobolev spaces
and Sobolev embedding theorems, a proof of the Calderon-Zygmund
inequality, and regularity theorems for second order elliptic operators,
followed by an introduction to the theory of strongly continuous
operator semigroups and some basic results about parabolic regularity.
Applications to geometry will be included if time allows.

Performance assessment

Performance assessment information (valid until the course unit is held again)
Performance assessment as a semester course
ECTS credits10 credits
ExaminersD. A. Salamon
Typesession examination
Language of examinationEnglish
RepetitionThe performance assessment is offered every session. Repetition possible without re-enrolling for the course unit.
Mode of examinationoral 30 minutes
This information can be updated until the beginning of the semester; information on the examination timetable is binding.

Learning materials

No public learning materials available.
Only public learning materials are listed.


401-3462-00 VFunctional Analysis II4 hrs
Mon10-12HG G 5 »
Thu13-15HG G 5 »
D. A. Salamon
401-3462-00 UFunctional Analysis II1 hrs
Mon09-10HG F 26.5 »
09-10HG G 26.3 »
Tue09-10HG F 26.5 »
D. A. Salamon


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Offered in

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