--- name: compactness description: "Problem-solving strategies for compactness in topology" allowed-tools: [Bash, Read] --- # Compactness ## When to Use Use this skill when working on compactness problems in topology. ## Decision Tree 1. **Is X compact?** - If X subset R^n: Is X closed AND bounded? (Heine-Borel) - If X is metric: Does every sequence have convergent subsequence? - General: Does every open cover have finite subcover? - `z3_solve.py prove "bounded_and_closed"` 2. **Compactness Tests** - Heine-Borel (R^n): closed + bounded = compact - Sequential: every sequence has convergent subsequence - `sympy_compute.py limit "a_n" --var n` to check convergence 3. **Product Spaces** - Tychonoff: product of compact spaces is compact - Finite products preserve compactness directly 4. **Consequences of Compactness** - Continuous image of compact is compact - Continuous real function on compact attains max/min - `sympy_compute.py maximum "f(x)" --var x --domain "[a,b]"` ## Tool Commands ### Z3_Bounded_Closed ```bash uv run python -m runtime.harness scripts/z3_solve.py prove "bounded_and_closed" ``` ### Sympy_Limit ```bash uv run python -m runtime.harness scripts/sympy_compute.py limit "a_n" --var n --at oo ``` ### Sympy_Maximum ```bash uv run python -m runtime.harness scripts/sympy_compute.py maximum "f(x)" --var x --domain "[a,b]" ``` ## Key Techniques *From indexed textbooks:* - [Topology (Munkres, James Raymond) (Z-Library)] CompactSpaces163 164ConnectednessandCompactnessCh. Itisnotasnaturalorintuitiveastheformer;somefamiliaritywithitisneededbeforeitsusefulnessbecomesapparent. AcollectionAofsubsetsofaspaceXissaidtocoverX,ortobeacoveringofX,iftheunionoftheelementsofAisequaltoX. - [Real Analysis (Halsey L. Royden, Patr... (Z-Library)] If X contains more than one point, show that the only possible extreme points of B have norm 1. If X = Lp[a, b], 1 < p < ∞, show that every unit vector in B is an extreme point of B. If X = L∞[a, b], show that the extreme points of B are those functions f ∈ B such that |f | = 1 almost everywhere on [a, b]. - [Topology (Munkres, James Raymond) (Z-Library)] ShowthatinthenitecomplementtopologyonR,everysubspaceiscom-pact. IfRhasthetopologyconsistingofallsetsAsuchthatR−AiseithercountableorallofR,is[0,1]acompactsubspace? ShowthataniteunionofcompactsubspacesofXiscompact. - [Real Analysis (Halsey L. Royden, Patr... (Z-Library)] The Eberlein-ˇSmulian Theorem . Metrizability of Weak Topologies . X is reexive; (ii) B is weakly compact; (iii) B is weakly sequentially compact. - [Topology (Munkres, James Raymond) (Z-Library)] SupposethatYiscompactandA={Aα}α∈JisacoveringofYbysetsopeninX. Thenthecollection{Aα∩Y|α∈J}isacoveringofYbysetsopeninY;henceanitesubcollection{Aα1∩Y,. Aαn}isasubcollectionofAthatcoversY. ## Cognitive Tools Reference See `.claude/skills/math-mode/SKILL.md` for full tool documentation.