# Table of Contents - [`[2019-04-24]` charts and atlases](#chrtsndtlss) - [chart – homeomorphism from an open subset of manifold to some other space (not necessarily eucledian generally)](#chrthmmrphsmfrmnpnsbstfmnthrspcntncssrlycldngnrlly) - [atlas – collection of charts, covering the whole space](#tlscllctnfchrtscvrngthwhlspc) - [`[2019-04-24]` think of Earth as the space and atlas as a set of flat maps](#thnkfrthsthspcndtlssstffltmps) - [if codomain of atlas is eucledian, the space is a manifold](#fcdmnftlsscldnthspcsmnfld) - [local chart for manifold introduces curvilinear coordinates (coming from eucledian space)](#lclchrtfrmnfldntrdcscrvlnrcrdntscmngfrmcldnspc) - [`[2019-04-24]` https://en.wikipedia.org/wiki/Atlas\_(topology)](#snwkpdrgwktlstplgy) - [`[2019-04-24]` identification of circles etc](#dntfctnfcrclstc) - [`[2019-04-24]` https://math.stackexchange.com/a/433969/15108 antipodal gluing of circle is circle again. nice gif](#smthstckxchngcmntpdlglngfcrclscrclgnncgf) - [`[2019-04-24]` antipodal identification of circle (S¹) is { circle }](#ntpdldntfctnfcrclsscrcl) [[drill]] - [`[2019-04-24]` identificaiton of 2D disk: right – it's exactly the first diagram here! https://en.wikipedia.org/wiki/Real\_projective\_plane if you draw disk as a square.](#dntfctnfddskrghttsxctlythwkrlprjctvplnfydrwdskssqr) - [`[2019-04-24]` this also kinda makes sense if you draw for a bit https://math.stackexchange.com/a/1391731/15108](#thslskndmkssnsfydrwfrbtsmthstckxchngcm) - [`[2019-04-24]` antipodal identificaiton of disk (D²) is { RP² }](#ntpdldntfctnfdskdsrp) [[drill]] - [`[2019-04-24]` https://mathcurve.com/surfaces.gb/planprojectif/planprojectif.shtml](#smthcrvcmsrfcsgbplnprjctfplnprjctfshtml) - [`[2019-01-23]` (2) Gluing a Sphere - YouTube](#glngsphrytb) [[topology]] - [`[2019-01-23]` Union of two simply connected open subsets with path-connected intersection is simply connected - Topospaces](#nnftwsmplycnnctdpnsbstswtntrsctnssmplycnnctdtpspcs) [[topology]] - [Data type topology](#dttyptplgy) [[topology]] - [`[2019-01-26]` Infinite compact sets](#nfntcmpctsts) - [`[2019-01-26]` Compactness](#cmpctnss) - [`[2019-01-26]` Equality](#qlty) - [`[2019-01-26]` Topology of Data Types](#tplgyfdttyps) - [`[2019-01-26]` References and further reading](#rfrncsndfrthrrdng) - [`[2019-01-26]` A Logical Interpretation of Some Bits of Topology – XOR’s Hammer](#lgclntrprttnfsmbtsftplgyxrshmmr) [[logic]] - [`[2019-04-24]` mm, not sure how this can be useful now…](#mmntsrhwthscnbsflnw) - [Tweet from John Carlos Baez (@johncarlosbaez), at Mar 16, 01:18](#twtfrmjhncrlsbzjhncrlsbztmr) - [old zim notes](#ldzmnts) - [`[2016-06-18]` compactness](#cmpctnss) - [`[2016-06-20]` connectedness](#cnnctdnss) - [`[2015-06-14]` Extracting topology from convergence](#xtrctngtplgyfrmcnvrgnc) - [`[2016-06-18]` hausdorff spaces](#hsdrffspcs) [[topology]] - [`[2019-01-23]` (2) bothmer - YouTube](#bthmrytb) [[topology]] [[viz]] [[inspiration]] - [`[2019-02-24]` some topology visualisations](#smtplgyvslstns) - [`[2019-01-23]` Long line (topology) - Wikipedia](#lnglntplgywkpd) - [`[2019-01-23]` N-sphere is simply connected for n greater than 1 - Topospaces](#nsphrssmplycnnctdfrngrtrthntpspcs) - [`[2019-01-26]` open set = semidecidable property](#pnstsmdcdblprprty) [[drill]] [[topology]] # `[2019-04-24]` charts and atlases ## chart – homeomorphism from an open subset of manifold to some other space (not necessarily eucledian generally) ## atlas – collection of charts, covering the whole space ### `[2019-04-24]` think of Earth as the space and atlas as a set of flat maps ## if codomain of atlas is eucledian, the space is a manifold ### local chart for manifold introduces curvilinear coordinates (coming from eucledian space) ## `[2019-04-24]` One often desires more structure on a manifold than simply the topological structure. For example, if one would like an unambiguous notion of differentiation of functions on a manifold, then it is necessary to construct an atlas whose transition functions are differentiable. Such a manifold is called differentiable. Given a differentiable manifold, one can unambiguously define the notion of tangent vectors and then directional derivatives. # `[2019-04-24]` identification of circles etc ## `[2019-04-24]` antipodal gluing of circle is circle again. nice gif ### `[2019-04-24]` antipodal identification of circle (S¹) is { circle } [[drill]] ## `[2019-04-24]` identificaiton of 2D disk: right – it's exactly the first diagram here! if you draw disk as a square. ### `[2019-04-24]` this also kinda makes sense if you draw for a bit ### `[2019-04-24]` antipodal identificaiton of disk (D²) is { RP² } [[drill]] ### `[2019-04-24]` Here are classic models of the projective plane: - The set of vectors of R³ with the natural topology - A (real affine) plane completed by a projective line (line at infinity) - A sphere where the antipodal points are identified - A closed disk where the antipodal points of the circumference are identified # `[2019-01-23]` (2) Gluing a Sphere - YouTube [[topology]] Often the fundamental group of the glued object can be calculated from the pieces (here two rectangles) and the glue (here a circle). The mathematical tool to do this is called the Seifert-van Kampen Theorem. # `[2019-01-23]` Union of two simply connected open subsets with path-connected intersection is simply connected - Topospaces [[topology]] Both and are trivial, so we get is an amalgamated free product of two trivial groups, hence it must be trivial. # Data type topology [[topology]] ## `[2019-01-26]` Infinite compact sets one-point compactification of ℕ ## `[2019-01-26]` Compactness Compact set = Set that can be exhaustively searched ## `[2019-01-26]` Equality Discrete space = Semidecidable equality ## `[2019-01-26]` Topology of Data Types ## `[2019-01-26]` References and further reading Other materials at http://www.cs.bham.ac.uk/~mhe/ # `[2019-01-26]` A Logical Interpretation of Some Bits of Topology – XOR’s Hammer [[logic]] - State "DONE" from `[2019-04-24]` ## `[2019-04-24]` mm, not sure how this can be useful now… # Tweet from John Carlos Baez (@johncarlosbaez), at Mar 16, 01:18 @zariskitopology So "compact" doesn't mean "small": it means "doesn't have any fuzzy edges". # old zim notes ## `[2016-06-18]` compactness - usual axioms of real numbers: forall a, b: a + b = b + a, forall x, y. exists z. x \* z > y, so on - add constant eps - infinite number of axioms for each n: eps < 1/n - eps > 0 for each finite subset of eps axioms there clearly is a model with \bbR for infinite set: no model with \bbR as domain! Nonstandard real numbers, hyperreals ## `[2016-06-20]` connectedness Connected: can't be represented as a union of two disjoint open sets. Locally connected at x: for every open V(x), there is connected open U(x) ⊂ V(x). X is locally connected if locally connected at every point. Local connectedness and connectedness are unrelated! Path connected: there is a path joining every pair of points. Locally path connected at x: for every open V(x), there is connected open U(x) \subseteq V(x). X is locally path connected if locally path connected at every point. Simply connected: path-connected and fundamental group is trivial. Locally simply connected: admits a base of simply connected sets. Also locally path-connected and locally connected. ## `[2015-06-14]` Extracting topology from convergence f_n -> weak(\*) f if forall x. f_n(x) -> f(x) How to develop intuition abut the open sets? f_n converges weakly to f if it converges pointwise f_n converges weakly to f: forall O(f). exists N. forall n > N. f_n ∈ O What is O? finite number of points do not converge? # `[2016-06-18]` hausdorff spaces [[topology]] Hausdorff if any two points can be separated by neighborhoods (diagonal is closed in product topology). Space X is Hausdorff iff its apartness map ≠ : X x X -> S (x, y) -> { x ≠ y } is continuous Space is discrete if every singleton is open (or if its diagonal is open) Space is discrete iff its equality map \eq : X x X -> S (x, y) -> { x = y } is continuous # `[2019-01-23]` (2) bothmer - YouTube [[topology]] [[viz]] [[inspiration]] ## `[2019-02-24]` some topology visualisations # `[2019-01-23]` Long line (topology) - Wikipedia # `[2019-01-23]` N-sphere is simply connected for n greater than 1 - Topospaces # `[2019-01-26]` open set = semidecidable property [[drill]] [[topology]]