unit 11 review
Sheaves and sheaf cohomology are powerful tools in algebraic topology, bridging local and global properties of topological spaces. They provide a unified framework for various cohomology theories, allowing mathematicians to study complex structures through the lens of abelian groups and their relationships.
This unit covers the foundations of sheaf theory, including presheaves, sheaves, and their operations. It then delves into cohomology basics, Čech cohomology, and derived functor cohomology, culminating in applications to de Rham and Dolbeault cohomology. Problem-solving techniques for computing sheaf cohomology are also discussed.
Key Concepts and Definitions
- Presheaf $\mathcal{F}$ assigns to each open set $U$ of a topological space $X$ an abelian group $\mathcal{F}(U)$
- Sheaf extends the concept of a presheaf by requiring local information to uniquely determine global information
- Restriction maps $\rho_{V,U}: \mathcal{F}(U) \to \mathcal{F}(V)$ for each inclusion $V \subseteq U$ of open sets
- Restriction maps satisfy the composition property $\rho_{W,V} \circ \rho_{V,U} = \rho_{W,U}$ for $W \subseteq V \subseteq U$
- Stalks $\mathcal{F}_x$ at a point $x \in X$ consist of germs, equivalence classes of sections over neighborhoods of $x$
- Exact sequence is a sequence of morphisms between objects (abelian groups or sheaves) where the image of each morphism equals the kernel of the next
- Short exact sequence $0 \to A \to B \to C \to 0$ captures essential information about the objects and their relationships
- Cohomology measures the global properties of a topological space by associating abelian groups to the space
Topological Foundations
- Topological space $(X, \tau)$ consists of a set $X$ and a collection $\tau$ of subsets of $X$ called open sets satisfying certain axioms
- $\emptyset$ and $X$ are open
- Arbitrary union of open sets is open
- Finite intersection of open sets is open
- Basis $\mathcal{B}$ for a topology is a collection of open sets such that every open set can be expressed as a union of elements in $\mathcal{B}$
- Continuous function $f: X \to Y$ between topological spaces preserves open sets, i.e., the preimage of an open set is open
- Hausdorff space is a topological space where any two distinct points have disjoint neighborhoods
- Compact space is a topological space where every open cover has a finite subcover
- Heine-Borel theorem characterizes compact subsets of Euclidean space as closed and bounded sets
- Paracompact space is a Hausdorff space where every open cover has a locally finite open refinement
Introduction to Sheaves
- Sheaf $\mathcal{F}$ on a topological space $X$ assigns an abelian group $\mathcal{F}(U)$ to each open set $U \subseteq X$
- Elements of $\mathcal{F}(U)$ are called sections over $U$
- Sheaf axioms ensure local information uniquely determines global information
- (Identity) For every open set $U$, the restriction map $\rho_{U,U}$ is the identity on $\mathcal{F}(U)$
- (Locality) If ${U_i}$ is an open cover of $U$ and $s, t \in \mathcal{F}(U)$ such that $\rho_{U_i,U}(s) = \rho_{U_i,U}(t)$ for all $i$, then $s = t$
- (Gluing) If ${U_i}$ is an open cover of $U$ and $s_i \in \mathcal{F}(U_i)$ with $\rho_{U_i \cap U_j, U_i}(s_i) = \rho_{U_i \cap U_j, U_j}(s_j)$, then there exists a unique $s \in \mathcal{F}(U)$ such that $\rho_{U_i,U}(s) = s_i$ for all $i$
- Constant sheaf $\underline{A}$ assigns the abelian group $A$ to every open set with identity restriction maps
- Locally constant sheaf assigns a fixed abelian group to each connected component of the space
Sheaf Operations and Properties
- Morphism of sheaves $\varphi: \mathcal{F} \to \mathcal{G}$ is a collection of group homomorphisms $\varphi(U): \mathcal{F}(U) \to \mathcal{G}(U)$ for each open set $U$ that commute with restriction maps
- Sheaf morphisms form a category with sheaves as objects and morphisms as arrows
- Kernel sheaf $\ker(\varphi)$ assigns to each open set $U$ the subgroup $\ker(\varphi(U)) \subseteq \mathcal{F}(U)$
- Image sheaf $\operatorname{im}(\varphi)$ assigns to each open set $U$ the subgroup $\operatorname{im}(\varphi(U)) \subseteq \mathcal{G}(U)$
- Cokernel sheaf $\operatorname{coker}(\varphi)$ assigns to each open set $U$ the quotient group $\mathcal{G}(U) / \operatorname{im}(\varphi(U))$
- Exact sequence of sheaves $0 \to \mathcal{F} \to \mathcal{G} \to \mathcal{H} \to 0$ induces a long exact sequence of cohomology groups
- Direct sum of sheaves $\mathcal{F} \oplus \mathcal{G}$ assigns to each open set $U$ the direct sum of abelian groups $\mathcal{F}(U) \oplus \mathcal{G}(U)$
- Tensor product of sheaves $\mathcal{F} \otimes \mathcal{G}$ assigns to each open set $U$ the tensor product of abelian groups $\mathcal{F}(U) \otimes \mathcal{G}(U)$
Cohomology Basics
- Cochain complex is a sequence of abelian groups $C^i$ and homomorphisms (differentials) $d^i: C^i \to C^{i+1}$ such that $d^{i+1} \circ d^i = 0$
- Cocycles $Z^i = \ker(d^i)$ and coboundaries $B^i = \operatorname{im}(d^{i-1})$ satisfy $B^i \subseteq Z^i$
- Cohomology groups $H^i(C^\bullet) = Z^i / B^i$ measure the "gap" between cocycles and coboundaries
- Cochain map $f: C^\bullet \to D^\bullet$ between cochain complexes is a collection of homomorphisms $f^i: C^i \to D^i$ that commute with the differentials
- Cochain maps induce homomorphisms on cohomology $H^i(f): H^i(C^\bullet) \to H^i(D^\bullet)$
- Short exact sequence of cochain complexes $0 \to A^\bullet \to B^\bullet \to C^\bullet \to 0$ induces a long exact sequence in cohomology
- Connecting homomorphism $\delta: H^i(C^\bullet) \to H^{i+1}(A^\bullet)$ measures the obstruction to lifting cocycles
- Homotopy equivalence between cochain complexes induces isomorphisms on cohomology
- Cohomology with coefficients in an abelian group $G$ is defined by applying the functor $\operatorname{Hom}(-, G)$ to a chain complex
Sheaf Cohomology Theory
- Sheaf cohomology $H^i(X, \mathcal{F})$ associates abelian groups to a sheaf $\mathcal{F}$ on a topological space $X$
- Measures the global obstructions to solving local problems related to $\mathcal{F}$
- Čech cohomology is defined using Čech cochains, functions assigning sections to intersections of open sets in a cover
- Čech differential $\delta: \check{C}^i(\mathcal{U}, \mathcal{F}) \to \check{C}^{i+1}(\mathcal{U}, \mathcal{F})$ is defined by alternating sums of restrictions
- Čech cohomology groups $\check{H}^i(\mathcal{U}, \mathcal{F}) = \ker(\delta^i) / \operatorname{im}(\delta^{i-1})$
- Refined covers lead to isomorphic Čech cohomology groups, defining the Čech cohomology $\check{H}^i(X, \mathcal{F})$
- Derived functor cohomology is defined using injective resolutions and right derived functors
- Injective sheaf $\mathcal{I}$ satisfies the lifting property for sheaf morphisms
- Injective resolution $0 \to \mathcal{F} \to \mathcal{I}^0 \to \mathcal{I}^1 \to \cdots$ allows the computation of right derived functors $R^i\Gamma(X, \mathcal{F})$
- Čech and derived functor cohomology agree for paracompact Hausdorff spaces and lead to the same abstract cohomology theory
- Cohomology of a constant sheaf $\underline{A}$ recovers the singular cohomology $H^i(X, A)$ with coefficients in $A$
Applications in Algebraic Topology
- Sheaf cohomology provides a unified framework for various cohomology theories in algebraic topology
- de Rham theorem relates de Rham cohomology (defined using differential forms) to singular cohomology
- de Rham complex $\Omega^\bullet(X)$ of smooth differential forms on a manifold $X$ computes the de Rham cohomology $H^i_{dR}(X)$
- de Rham sheaf $\mathcal{A}^i$ assigns to each open set $U$ the vector space of smooth $i$-forms on $U$
- Poincaré lemma states that the de Rham complex is locally exact, implying that $\mathcal{A}^\bullet$ is a resolution of the constant sheaf $\underline{\mathbb{R}}$
- de Rham theorem: $H^i_{dR}(X) \cong H^i(X, \mathbb{R})$ for smooth manifolds $X$
- Dolbeault theorem relates Dolbeault cohomology (defined using complex differential forms) to sheaf cohomology on complex manifolds
- Dolbeault complex $A^{p,q}(X)$ of $(p,q)$-forms on a complex manifold $X$ computes the Dolbeault cohomology $H^{p,q}_{\bar{\partial}}(X)$
- Dolbeault sheaf $\mathcal{O}^{p,q}$ assigns to each open set $U$ the vector space of $(p,q)$-forms on $U$
- Dolbeault theorem: $H^{p,q}_{\bar{\partial}}(X) \cong H^q(X, \Omega^p)$, where $\Omega^p$ is the sheaf of holomorphic $p$-forms
- Hodge theorem decomposes the cohomology of a compact Kähler manifold into a direct sum of Dolbeault cohomology groups
- Sheaf cohomology also plays a role in the study of vector bundles, characteristic classes, and intersection theory
Problem-Solving Techniques
- Compute sheaf cohomology using Čech cochains and covers
- Choose a suitable open cover of the space and calculate the Čech complex
- Determine the kernels and images of the Čech differentials to find the cohomology groups
- Use injective resolutions to compute derived functor cohomology
- Find an injective resolution of the sheaf and apply the global section functor
- Calculate the cohomology of the resulting complex
- Exploit the long exact sequence in cohomology induced by a short exact sequence of sheaves
- Break down a complicated sheaf into simpler pieces using short exact sequences
- Use the induced long exact sequence to relate the cohomology groups of the sheaves
- Apply the Mayer-Vietoris sequence to compute cohomology using a cover of the space
- Decompose the space into simpler pieces using a suitable cover
- Use the Mayer-Vietoris sequence to relate the cohomology of the space to the cohomology of the pieces and their intersections
- Utilize spectral sequences to compute cohomology in stages
- Set up a spectral sequence (Leray, Serre, etc.) that converges to the desired cohomology groups
- Compute the terms of the spectral sequence and analyze the differentials to determine the limit terms
- Identify vanishing theorems and cohomological dimension to simplify computations
- Use theorems like Cartan's theorem B, Kodaira vanishing, or Grauert's theorem to deduce the vanishing of certain cohomology groups
- Determine the cohomological dimension of the space to limit the range of non-zero cohomology groups