MAT4350 - Spring 2009

Undervisningsplan

Dato	Undervises av	Sted	Tema	Kommentarer / ressurser
12.01.2009	Nadia S. Larsen (NL)?	B 62?	The open mapping theorem. The closed graph theorem. The principle of uniform boundedness?	Section 2.2 in Pedersen's book "Analysis Now". Exercises for January 19: E 2.2.4 and E 2.2.6 in "Analysis Now".?
16.01.2009	NL?	B62?	The principle of uniform boundedness (continued). Brief synopsis of orderings on a set.?	We finish section 2.2 in "Analysis now" and expand the hints to prove E. 2.2.4 and 2.2.6. For several purposes later we need a tool from set theory, namely Zorn's lemma, and we shall review the notation and concepts needed for its formulation (sections 1.1.1-1.1.3).?
19.01.2009	NL?	B62. NOTE TIME: 9:15-10. We take 2 hours in the afternoon.?	Minkowski functionals on real vector spaces. Fundamental lemma.?	We start on section 2.3 in "Analysis Now". ?
19.01.2009	NL?	B62. NOTE TIME: 14:15-16:00?	The Hahn-Banach extension theorem for vector spaces. Consequences. Duality ?	We continue with section 2.3.?
23.01.2009	NL?	B62?	Exercises E. 2.2.4 and 2.2.6.?	Exercises for Friday, January 30: E 2.3.1, E 2.3.2 (see also exercise 5.3 and Corollary 5.49 in Rynne-Youngson), E 2.3.4, E 2.3.5.?
26.01.2009	NL?	B62?	The adjoint operator. Topological vector spaces. Weak topologies induced from seminorms.?	Section 2.3. Sections 2.4.1-2.4.5.?
30.01.2009	NL?	B62?	Exercises.?	Exercises E 2.3.1, E 2.3.2 (see also exercise 5.3 and Corollary 5.49 in Rynne-Youngson), E 2.3.4, E 2.3.5. Exercises for Friday, February 6: E 2.3.3, E 2.4.7.?
02.02.2009	NL?	B62?	The Hahn-Banach separation theorem. The weak and weak*-topologies. ?	Section 2.4.?
06.02.2009	NL?	B62?	Exercises E. 2.3.3, E.2.4.7.?	?
09.02.2009	NL?	B62?	The weak and weak*-topologies. Alaoglu's theorem. ?	From "Analysis Now": 2.3.6, 2.4.8-2.4.12 and 2.5.1-2.5.4.?
13.02.2009	NL?	B62?	Exercises.?	Exercises E 2.3.6, E. 2.4.1, E. 2.4.4, E. 2.4.6.?
16.02.2009	NL?	B62?	Extremal boundary. The Krein-Milman theorem. Catalogue of extremal boundaries.?	Sections 2.5.3-2.5.7.?
20.02.2009	NL?	B62?	Exercises?	E 2.5.5 (a) and (b). E 2.5.7.?
23.02.2009	NL?	B62?	Banach algebras. Spectrum. Resolvent set. Spectral radius.?	Sections 4.1.1.-4.1.12.?
27.02.2009	NL?	B62?	Exercises?	E 4.1.1, E 4.1.7.?
02.03.2009	NL?	B62?	The spectrum of an element in a Banach algebra. Ideals and characters.?	Sections 4.1.10-4.1.14 and 4.1.2, 4.2.1.?
06.03.2009	NL?	B62?	Exercises?	E. 4.1.3, 4.1.8, 4.1.13.?
09.03.2009	NL?	B62?	The Gelfand transform. Examples.?	Sections 4.2.1-4.2.7.?
13.03.2009	NL?	B62?	Exercises?	E. 4.1.9, 4.2.1, 4.2.2.?
16.03.2009	NL?	B62?	The Gelfand transform on L^1(R). The Stone-Weierstrass theorem.?	Sections 4.2.8 and 4.3.1-4.3.5.?
20.03.2009	NL?	B62?	Exercises?	E 4.1.9 and E.4.2.5, 4.2.6, 4.2.11, 4.2.13.In exercise 4.2.5 by the generation property one means that the set of polynomials P(I, A1,..., An) in the variables I, A1, ..., An is dense in the given (commutative) Banach algebra.?
23.03.2009	Simen Rustad?	B62?	Involutions. C*-algebras. Normal, self-adjoint, unitary operators. ?	Sections 4.3.7-4.3.12.?
27.03.2009	?	?	No lecture today!?	?
30.03.2009	NL?	B62?	Spectral theory for commutative C*-algebras?	Sections 4.3.14-4.3.19.?
03.04.2009	NL?	B62?	Spectral theorem, spectrum and eigenvalues.?	Sections 4.4.1-4.4.7.?
06.04.2009	?	?	Easter-week. No lecture today.?	?
10.04.2009	?	?	Easter week. No lecture today.?	?
13.04.2009	?	?	Easter. No lecture today.?	?
17.04.2009	NL?	B62?	Exercises?	E 4.3.1, 4.3.6, 4.4.4, 4.4.5. ?
20.04.2009	NL?	B62?	Spectral theorem with Borel function calculus?	Section 4.5.?
24.04.2009	NL?	B62?	Spectral theorem with Borel function calculus?	Section 4.5.?
27.04.2009	NL?	B62?	Unbounded operators. Domains, extensions, graphs.?	Section 5.1.?
01.05.2009	?	?	No lecture today.?	?
04.05.2009	NL?	B62?	Unbounded operators. The Cayley transform.?	Sections 5.1 (without 5.1.10-5.1.11 and 5.1.13) and 5.2.1-4.?
08.05.2009	NL?	B62?	The Cayley transform?	Sections 5.2.4-6.?

Published Jan. 5, 2009 2:56 PM - Last modified Apr. 24, 2009 2:06 PM