# Spectral Sequences in Homotopy Type Theory Formalization project of the CMU HoTT group to formalize the Serre spectral sequence. *Update July 16*: The construction of the Serre spectral sequence has been completed. The result is `serre_convergence` in `cohomology.serre`. The main algebra part is in `algebra.exact_couple`. This repository also contains the contents of the MRC group on formalizing homology in Lean. #### Participants Jeremy Avigad, Steve Awodey, Ulrik Buchholtz, Floris van Doorn, Clive Newstead, Egbert Rijke, Mike Shulman. ## Resources - [Mike's blog posts on ncatlab](https://ncatlab.org/homotopytypetheory/show/spectral+sequences). - The [Licata-Finster article](http://dlicata.web.wesleyan.edu/pubs/lf14em/lf14em.pdf) about Eilenberg-Mac Lane spaces. - We learned about the Serre spectral sequence from [Hatcher's chapter about spectral sequences](https://www.math.cornell.edu/~hatcher/SSAT/SSATpage.html). - Lang's algebra (revised 3rd edition) contains a chapter on general homology theory, with a section on spectral sequences. Thus, we can use this book at least as an outline for the algebraic part of the project. - Mac Lane's Homology contains a lot of homological algebra and a chapter on spectral sequences, including exact couples. ## Contents for Lean spectral sequences project ### Outline These projects are done - Given a sequence of spectra and maps, indexed over `ℤ`, we get an exact couple, indexed over `ℤ × ℤ`. - We can derive an exact couple. - If the exact couple is bounded, we repeat this process to get a convergent spectral sequence. - We construct the Atiyah-Hirzebruch and Serre spectral sequences for cohomology. ### Future directions - Hurewicz Theorem and Hurewicz theorem modulo a Serre class. There is a proof in Hatcher. Also, [this](http://www.math.uni-frankfurt.de/~johannso/SkriptAll/SkriptTopAlg/SkriptTopCW/homotop12.pdf) might be useful. - Homological Serre spectral sequence. - Interaction between steenrod squares and cup product with spectral sequences - ... ### Algebra #### To do - Constructions: tensor, hom, projective, Tor (at least on groups) - Finite groups, Finitely generated groups, torsion groups - Serre classes - [vector spaces](http://ncatlab.org/nlab/show/vector+space), #### In Progress #### Done - groups, rings, fields, [R-modules](http://ncatlab.org/nlab/show/module), graded R-modules. - Constructions on groups and abelian groups:: subgroup, quotient, product, free groups. - Constructions on ablian groups: direct sum, sequential colimi. - exact sequences, short and long. - [chain complexes](http://ncatlab.org/nlab/show/chain+complex) and [homology](http://ncatlab.org/nlab/show/homology). - [exact couples](http://ncatlab.org/nlab/show/exact+couple) graded over an arbitrary indexing set. - spectral sequence of an exact couple. - [convergence of spectral sequences](http://ncatlab.org/nlab/show/spectral+sequence#ConvergenceOfSpectralSequences). ### Topology #### To do - cofiber sequences + Hom'ing out gives a fiber sequence: if `A → B → coker f` cofiber sequences, then `X^A → X^B → X^(coker f)` is a fiber sequence. - fiber and cofiber sequences of spectra, stability + limits are levelwise + colimits need to be spectrified - long exact sequence from cofiber sequences of spectra + indexed on ℤ, need to splice together LES's - Cup product on cohomology groups - Parametrized and unreduced homology - Steenrod squares - ... #### To do (short-term easy projects) - Compute cohomology groups of `K(ℤ, n)` - Compute cohomology groups of `ΩSⁿ` - Show that all fibration sequences between spheres are of the form `Sⁿ → S²ⁿ⁺¹ → Sⁿ⁺¹`. - Compute fiber of `K(φ, n)` for group hom `φ` in general and if it's injective/surjective - [Steve] Prove `Σ (X × Y) ≃* Σ X ∨ Σ Y ∨ Σ (X ∧ Y)`, where `Σ` is suspension. See `homotopy.susp_product` #### In Progress - [prespectra](http://ncatlab.org/nlab/show/spectrum+object) and [spectra](http://ncatlab.org/nlab/show/spectrum), indexed over an arbitrary type with a successor + think about equivariant spectra indexed by representations of `G` - [spectrification](http://ncatlab.org/nlab/show/higher+inductive+type#spectrification) + adjoint to forgetful + as sequential colimit, prove induction principle + connective spectrum: `is_conn n.-2 Eₙ` - Postnikov towers of spectra. + basic definition already there + fibers of Postnikov sequence unstably and stably - [parametrized spectra](http://ncatlab.org/nlab/show/parametrized+spectrum), parametrized smash and hom between types and spectra. - Check Eilenberg-Steenrod axioms for reduced homology. #### Done - Most things in the HoTT Book up to Section 8.9 (see [this file](https://github.com/leanprover/lean/blob/master/hott/book.md)) - pointed types, maps, homotopies and equivalences - [Eilenberg-MacLane spaces](http://ncatlab.org/nlab/show/Eilenberg-Mac+Lane+space) and EM-spectrum - fiber sequence + already have the LES + need shift isomorphism + Hom'ing into a fiber sequence gives another fiber sequence. - long exact sequence of homotopy groups of spectra, indexed on ℤ - exact couple of a tower of spectra + need to splice together LES's ## Contributing - We will try to make sure that this repository compiles with the newest version of Lean 2. - Installation instructions for Lean 2 can be found [here](https://github.com/leanprover/lean2). - Some notes on the Emacs mode can be found [here](https://github.com/leanprover/lean2/blob/master/src/emacs/README.md) (for example if some unicode characters don't show up, or increase the spacing between lines by a lot). - If you contribute, please use rebase instead of merge (e.g. `git pull -r`). - We try to separate the repository into the folders `algebra`, `homotopy`, `homology`, `cohomology` and `colimit`. Homotopy theotic properties of types which do not explicitly mention homotopy, homology or cohomology groups (such as `A ∧ B ≃* B ∧ A`) are part of `homotopy`.