LECTURE TOPICS

Math 8174: Topics in Algebra, Spring 2010

Lecture Topics

Date	What we discussed/How we spent our time
Jan 11	Will be a course on homological algebra. Grades will be based on HW. Definition of a differential R-module. A differential R-module is equivalent to a module over R[d]/(d^2), the ring of dual numbers over R. Definitions of chains, cycles, boundaries, homology modules. Examples: Computing the homology of a 1-simplex and of a 2-simplex.
Jan 13	Example: Computing the homology of the boundary of a 2-simplex (an oriented triangle without interior). Definition of homology of any finite simplicial complex. Chain complexes.
Jan 15	Description of singular homology. Relationship between simplicial and singular homology. Intuition behind cycles, boundaries and homology. Interpretation of H₀(X).
Jan 20	Categories: definition and examples. Monomorphisms, epimorphisms, isomorphisms, retractions, sections. Opposite category. Functors: definition and examples of covariant and and contravariant functors. Interpretations of `functor': (i) homomorphism, (ii) uniform construction, (iii) representation.
Jan 22	Example of a `uniform construction' that is not a functor: the construction of the center of a group. Description of the covariant and contravariant power sets functors. Full, faithful and representative functors. Natural transformations: definition. Comparison with homotopies between continuous maps. Identity transformations. Composition of natural transformations is associative. The collection D^C of functors from C to D equipped with natural transformations is a category, except that homsets Nat(F,G) may be proper classes. If C is small, then D^C is a category.
Jan 25	Natural isomorphism: definition (= invertible natural transformation). Same as natural transformation whose components are isomorphisms. Isomorphism, equivalence and duality of categories. Examples. Skeleton of a category.
Jan 27	Characterizations of equivalence. Axiom of choice for classes. Representable functors. Yoneda lemma.
Jan 29	Yoneda embedding. Natural transformations between representable functors. Natural operations on functors. Algebras and coalgebras in categories. Representable functors to categories of algebras.
Feb 1	Examples of representable functors to categories of algebras.
Feb 3	Preadditive and additive categories. A preadditive category has binary products and coproducts and a zero object iff it has finite biproducts.
Feb 5	Kernels, cokernels, normal monomorphisms, conormal epimorphisms. Kernels are monic and cokernels are epic. A monic is zero iff its domain is a zero object. If ker(φ) exists, then φ is monic iff ker(φ) = 0. Abelian categories. A group homomorphism is a monomorphism iff it is 1-1; it is a normal monomorphism iff its image is a normal subgroup.
Feb 8	Examples of abelian categories: categories of R-modules; "large" versions of categories of R-modules; compact, T₂, abelian groups (Pontrjagin duality); full subcategories of abelian categories which are closed under 0, ⊕ ker, coker; products of abelian categories; functor categories A^C with C small and A abelian.
Feb 10	Chain complexes and exact sequences in abelian categories.
Feb 12	Pullback theorems. Application to diagram chasing.
Feb 15	Snake Lemma. Diagram chasing by Swan's method. Mitchell Embedding Theorem.
Feb 17	The category of chain complexes (= a subcategory of a functor category). Proof that the category of chain complexes of objects from an abelian category A is itself an abelian category. Discussion of biproducts, kernels and cokernels in a category of chain complexes. Chain maps are monic/epic iff they are componentwise. An exact sequence of complexes is exact iff it is componentwise. Projection of complexes onto their nth components is a functor. Homology of a complex.
Feb 19	H_n is a functor. Exact homology sequence. Nullhomotopic chain maps and homotopic pairs of chain maps. Homotopic chain maps induce the same function on homology.
Feb 22	Topological background for chain homotopies: We computed the simplicial chain complexes for the circle and the cylinder, and their homology. We compared the chain maps resulting from the embeddings of the circle into the cylinder at the top and the bottom. The chain homotopy between these maps was derived from the operation of "cylindrification" of chains.
Feb 24	Definition of resolution and deleted resolution. Types of resolutions to the left include: free, projective and flat resolutions. Types of resolutions to the right include injective and flabby resolutions. Characterization of projectives: Thm. The following are equivalent for an R-module P. (1) P is projective. (2) Every SES ending at P splits. (3) P is a retract of a free module. (4) P is a direct summand of a free module. (5) The covariant hom functor represented by P maps epis to surjections. (6) The covariant hom functor represented by P is exact.
Feb 26	Hom functors are left exact. Left or right exact functors are additive. An abelian category has enough projectives if every object is an epimorphic image of a projective object. Using splicing of SES's, this is seen to be equivalent to the condition that every object has a projective resolution. Comparison Theorem Part 1: If φ A → B is a hom, P → A is a complex with all P_i projective, and Q → B is a resolution of B, then φ can be lifted to a chain map from P → A to Q → B.
Mar 1	Comparison Theorem Part 2: Any 2 liftings of φ from Part 1 are homotopic. Horseshoe Lemma. Injective resolutions. Characterizations of injectivity, including Baer's Criterion.
Mar 3	Derived functors: definition, independent of resolution, long exact sequence. Derived functors of exact functors are trivial. Derived functors of half exact functors repair exactness. Object is acyclic with respect to T if L_nT(A) = 0 for all n>0. nth derived functor of _⊗ B is called Tor_n^R(_,B).
Mar 5	We discussed a source of left exact functors: adjoints. Definition and examples of adjoint functors. Lm. A sequence in an abelian category which becomes exact after applying any covariant hom functor to it is itself exact. (This proof contained a gap, which is filled here.) Thm. A functor between abelian categories that has a left adjoint is left exact. Adjoint Associativity (= Hom and tensor are adjoints).
Mar 8	δ-functors and their morphisms. Universal δ-functors. The left derived functors of a right exact functor form a universal δ-functor. Definitions of Tor_n(A,B), tor_n(A,B), Ext_n(A,B) and ext_n(A,B). Thm. TFAE for a right R-module B. (1) B is flat. (2) Tor_n^R(A,B)=0 for all n>0 and all left R-modules A. (3) Tor₁^R(A,B)=0 for all A. We gave a presentation for the torsion product of two abelian groups. We started on the proof of: Thm. (Tor for abelian groups) (1) Tor_n(A,B)=0 for all n>1. (2) Tor₁(A,B) is the torsion product of A and B. (3) Tor₁(Q/Z,B)=t(B). (4) Tor₁(A,B)=Tor₁(t(A),t(B)). (5) B is flat iff B is torsion free.
Mar 10	We finished the proof of (1), (3), (4), (5) of: Thm. (Tor for abelian groups) (1) Tor_n(A,B)=0 for all n>1. (2) Tor₁(A,B) is the torsion product of A and B. (3) Tor₁(Q/Z,B)=t(B). (4) Tor₁(A,B)=Tor₁(t(A),t(B)). (5) B is flat iff B is torsion free. We started on the proof that Tor_n^R(A,B) = tor_n^R(A,B).
Mar 12	We finished the proof that Tor_n^R(A,B) = tor_n^R(A,B). In the course of the proof we established the Dimension Shifting Lemma.
Mar 15	We started a discussion of the behavior of derived functors and adjoints on limits and colimits.
Mar 17	More on the behavior of derived functors and adjoints on limits and colimits.
Mar 19	Colim_{_J} is a right exact functor from A^J to A. It need not be fully exact: we gave an example showing that pushouts are colimits that are not always exact. We proved that if J is filtered, then colim_{_J} is exact. Since homology commutes with exact functors, it commutes with filtered colimits. One consequence is that any directed union of flat modules is flat, in particular Q is a flat Z-module.
Mar 29	Definitions of Extⁿ(A,B) and extⁿ(A,B). Characterizing properties: to each SES is an associated LES; Ext⁰(A,_)≅ Hom(A,_); and Extⁿ(A,_) vanishes in injectives when n>0. (Dual properties for ext.) The evaluation of Extⁿ(A,B) is independent of the resolution of B. Covariant Ext preserves products, contravariant ext converts coproducts to products (not vice versa). Dimension shifting works the same way as for Tor. (Dimension shifting takes place in the second variable of Ext and the first variable of ext.) Extⁿ(A,B)≅ extⁿ(A,B). Ext for abelian groups: Extⁿ(A,B)=0 if n > 1. We showed that Ext¹(Z_n,B)=B/nB and Ext¹(A,Z_n) = A^/nA^, where A^* = Hom(A,Q/Z) is the Pontrjagin dual of A.
Mar 31	We discussed homology and cohomology with coefficients in an abelian group. We began the proof of the Universal Coefficient Theorem for Homology: Thm. Let A be a left R-module and C be a complex of flat right R-modules. Assume the boundary subcomplex consists of flat modules. There is an exact sequence 0→ H_n(C)⊗A→ H_n(C⊗A)→ Tor₁( H_n-1(C),A)→0. If R=Z, then this exact sequence splits.
Apr 2	We completed the proof of the Universal Coefficient Theorem for Homology and stated the dual theorem for cohomology: Thm. Let A be a left R-module and C be a complex of projective left R-modules. Assume the boundary subcomplex consists of projective modules. There is an exact sequence 0→ Ext¹(H_n-1(C),A) → Hⁿ(Hom(C,A)) → Hom(H_n(C),A) →0. If R=Z, then this exact sequence splits.
Apr 5	Definition of module extensions, morphisms of extensions, equivalence of extensions and ext(C,A). Example: There are only two isomorphism types of groups G for which 0 → Z_p → G → Z_p → 0 is exact, but there are p equivalence classes of extensions. Description of a map φ from e(C,A) to Ext¹(C,A). Proof that φ is well defined.
Apr 7	Construction of the inverse map ψ from Ext¹(C,A) to ext(C,A). Proof that ψ is well defined and the inverse of φ. Proof that the zero class of Ext corresponds to the class of split extensions.
Apr 9	Construction of the Baer sum. Abelian group operations on ext(C,A).
Apr 12	Summary of Yoneda Ext group extⁿ(C,A) (similarity and equivalence of n-extensions, groups operations on extⁿ(C,A)). Discussion of the evolution of group (co)homology, Lie (co)homology, and Hochschild (co)homology of associative algebras.
Apr 14	Multilinear algebras. Ideals, abelianness, exact sequences, actions of multilinear algebras on abelian ideals.
Apr 16	Presentation of enveloping algebra of a multilinear algebra.
Apr 19	Standard definitions of G-module and enveloping ring Z[G] of a group G, the adjunction Hom_{_Ring}(Z[G],R)= Hom_{_Grp}(G,R^*), module of invariants U^G consisting of all u∈U such that gu=u for all g∈G, invariants functor U → U^G, invariants functor U→Hom_{_Z[G]}(Z,U), example showing invariants functor need not be exact, coinvariants functor U→U_G, coinvariants functor U→Z ⊗_{_Z[G]} U, coinvariants functor need not be exact. Definitions: ♦ H_n(G,U) = Tor_₁^{^Z[G]}(Z,U) ♦ Hⁿ(G,U) = Ext¹_{_Z[G]}(Z,U) Standard definitions of (A,A)-bimodule and enveloping ring A ⊗ A^{^op} of an associative k-algebra A, the adjunction Hom_{_k}(A ⊗ A^{^op},R)= Hom_{_D}(A,R), module of invariants U^A consists of all u∈U such that au=ua for all a∈A, invariants functor U→U^A, invariants functor U→Hom_{_(A,A)}(A,U), coinvariants functor U→U_A, coinvariants functor U→A ⊗ U. Definitions: ♦ H_n(A,U) = Tor_₁ ^{^{A⊗ A^{^op}}}(A,U) ♦ Hⁿ(A,U) = Ext¹_{_{A⊗ A^{^op}}}(A,U) Notes. Lie definitions.
Apr 21	Described the topological motivation of the different bar resolutions for group cohomology. Discussed homogeneous versus nonhomogeneous and normalized versus nonnormalized cochains. Wrote out the cocycle identity. Defined derivations and principal derivations. Mentioned without proof the fact that cohomology groups can be calculated with normalized cochains.
Apr 23	We showed that elements of Z²(Q,K) correspond to extensions 0 → K → G → Q → 0, an extension corresponds to an element of B²(Q,K) iff it is split, and so H²(Q,K) may be interpreted as the group of equivalence classes of extensions.
Apr 26	I reviewed some of the previous lecture and filled in one gap.
Apr 28	We showed that elements of Z¹(Q,K) correspond to equivalences of 0 → K → G → Q → 0, elements of B¹(Q,K) correspond to `inner' equivalences (those given by conjugation by an element of K, and so H¹(Q,K) may be interpreted as the group of equivalences mod inner equivalences.
Apr 30	Z¹(Q,K) acts regularly on the set of complements to K in the semidirect product K×_αQ. B¹(Q,K) is the subgroup of consisting of conjugations by elements of K. Hence, when H¹(Q,K) = 0, all complements of K in K×_αQ are conjugate to one another. We proved the following restrictions on Hⁿ(Q,K): (1) Any exponent for K is an exponent for Hⁿ(Q,K) for any n. (2) The order of Q is an exponent for Hⁿ(Q,K) for n>0. (3) If the order of Q and the exponent of K are relatively prime, then Hⁿ(Q,K)=0 for n > 0. (4) If Q is finite and K is finitely generated as a Q-module, then Hⁿ(Q,K) is finite for n>0. Call a divisor d of n a Hall divisor if gcd(d,n/d)=1. We defined a subgroup H of a finite group G to be a Hall subgroup of G if \|H\| is a Hall divisor of \|G\|. Hall proved that if G is a finite solvable group and d is a Hall divisor of \|G\|, then G has a subgroup of order d and any two subgroups of order d are conjugate. Schur-Zassenhaus Theorem: If G is finite and K is a normal Hall subgroup, then K has a complement and all complements of K are conjugate.