Category:Proofread
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Category for pages that need proofreading.
Make sure you check the Talk page of the article you are going to proofread to see what points have already been raised.
Subcategories
This category has the following 2 subcategories, out of 2 total.
D
N
Pages in category "Proofread"
The following 200 pages are in this category, out of 893 total.
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- Abel's Test for Uniform Convergence
- Absolute Net Convergence Equivalent to Absolute Convergence
- Absolute Net Convergence Equivalent to Absolute Convergence/Absolute Convergence implies Absolute Net Convergence
- Absolute Net Convergence Equivalent to Absolute Convergence/Absolute Net Convergence implies Absolute Convergence
- Absolute Value of Function is Composite with Absolute Value Function
- Absolutely Convergent Generalized Sum Converges to Supremum
- Absolutely Convergent Generalized Sum over Union of Disjoint Index Sets
- Acceleration of Particle moving in Circle at Constant Speed/Proof 2
- Addition of Integers is Primitive Recursive
- Additive Inverse in Ring of Bounded Continuous Real-Valued Functions
- Additive Inverse in Ring of Continuous Mappings
- Additive Inverse in Ring of Continuous Real-Valued Functions
- Definition:Adjoint (Norm Theory)
- Adjunction Induces Counit of Adjunction
- Adjunction Induces Unit of Adjunction
- Definition:Aleph Mapping
- All Bases of Matroid have same Cardinality/Corollary
- Alternating Group is Simple except on 4 Letters/Lemma 3
- Analytic Continuations to Two Sets do not necessarily Agree on Intersection
- Angle is not Invariant under Affine Transformation
- Definition:Antilexicographic Order/Family
- Archimedes' Cattle Problem/Difficult Version
- Area between Radii and Whorls of Archimedean Spiral
- Area of Surface of Revolution/Polar Form
- Arens-Fort Space is not First-Countable
- Arrow Paradox
- Definition:Asymptotic Stability
- Definition:Atom of Measure/Definition 2
- Axiom:Axiom of Continuity
- Axiom of Specification from Replacement and Empty Set
- Axiom:Axiom of Triangle Existence
- Axioms of Hilbert Proof System Instance 1 for Predicate Logic are Tautologies
B
- Banach-Alaoglu Theorem
- Banach-Alaoglu Theorem/Proof 2
- Banach-Tarski Paradox/Proof 2
- Binomial Theorem/Multiindex
- Boolean Lattice is Heyting Lattice
- Boolean Prime Ideal Theorem
- Boubaker's Theorem
- Boubaker's Theorem/Proof of Uniqueness
- Bounded Generalized Sum is Absolutely Convergent
- Burnout Height of Upward Rocket under Constant Gravity
- Bézout's Identity/Euclidean Domain
C
- Canonical Bijection from Completely Prime Filters to Frame Homomorphisms
- Canonical Bijection from Completely Prime Filters to Meet Irreducible Elements
- Canonical Bijection from Frame Homomorphisms to Continuous Maps
- Canonical Mapping of Locale to Powerset of Points is Frame Homomorphism
- Canonical P-adic Expansion of Rational is Eventually Periodic/Lemma 1
- Canonical P-adic Expansion of Rational is Eventually Periodic/Lemma 11
- Canonical P-adic Expansion of Rational is Eventually Periodic/Lemma 2
- Canonical P-adic Expansion of Rational is Eventually Periodic/Necessary Condition
- Cantor-Dedekind Hypothesis
- Carroll Paradox
- Category CLat is Subcategory of Frm
- Category DLat is Full Subcategory of Lat
- Category of Complete Lattices is Category
- Category of Distributive Lattices is Category
- Category of Frames is Category
- Category of Lattices is Category
- Category of Locales is Category
- Category of Locales with Localic Mappings is Category
- Category of Locales with Localic Mappings is Isomorphic to Category of Locales
- Category of Locales with Localic Mappings is Isomorphic to Category of Locales/Lemma 1
- Category of Locales with Localic Mappings is Isomorphic to Category of Locales/Lemma 2
- Category of Locales with Localic Mappings is Isomorphic to Category of Locales/Lemma 3
- Category of Locales with Localic Mappings is Isomorphic to Category of Locales/Lemma 4
- Category of Semilattices is Category
- Chain Rule for Real-Valued Functions
- Characteristic of Ordered Integral Domain is Zero
- Characterization for Topological Evaluation Mapping to be Embedding
- Characterization for Topological Evaluation Mapping to be Embedding/Necessary Condition
- Characterization of Adjunction Using Counit of Adjunction
- Characterization of Adjunction Using Left Adjuncts of Commutative Squares
- Characterization of Adjunction Using Left Adjuncts of Compositions
- Characterization of Adjunction Using Left Adjuncts of Morphisms
- Characterization of Adjunction Using Left Adjuncts of Triple Compositions
- Characterization of Adjunction Using Right Adjuncts of Commutative Squares
- Characterization of Adjunction Using Right Adjuncts of Compositions
- Characterization of Adjunction Using Right Adjuncts of Morphisms
- Characterization of Adjunction Using Right Adjuncts of Triple Compositions
- Characterization of Adjunction Using Unit of Adjunction
- Characterization of Adjunction via Triangle Identities
- Characterization of Adjunction via Triangle Identities/Lemma 1
- Characterization of Adjunction via Triangle Identities/Lemma 2
- Characterization of Adjunction via Triangle Identities/Lemma 3
- Characterization of Adjunction via Triangle Identities/Lemma 4
- Characterization of Adjunction via Triangle Identities/Necessary Condition
- Characterization of Adjunction via Triangle Identities/Sufficient Condition
- Characterization of Bifunctor Induced By One-Variable Functors
- Characterization of Bifunctor Induced By One-Variable Functors/Necessary Condition
- Characterization of Bifunctor Induced By One-Variable Functors/Sufficient Condition
- Characterization of Closed Set by Open Cover
- Characterization of Compact Element in Complete Lattice
- Characterization of Compact Element in Complete Lattice/Statement 1 implies Statement 3
- Characterization of Compact Element in Complete Lattice/Statement 2 implies Statement 1
- Characterization of Compact Element in Complete Lattice/Statement 3 implies Statement 2
- Characterization of Compact Element in Frame or Locale
- Characterization of Completely Prime Filter in Complete Lattice
- Characterization of Completely Prime Filter in Complete Lattice/Necessary Condition
- Characterization of Completely Prime Filter in Complete Lattice/Sufficient Condition
- Characterization of Completely Prime Ideal in Complete Lattice
- Characterization of Even Cover
- Characterization of Existence of Bifunctor Induced By One-Variable Functors
- Characterization of Existence of Bifunctor Induced By One-Variable Functors/Necessary Condition
- Characterization of Existence of Bifunctor Induced By One-Variable Functors/Sufficient Condition
- Characterization of Generalized Hilbert Sequence Space
- Characterization of Generalized Hilbert Sequence Space/Necessary Condition
- Characterization of Generalized Hilbert Sequence Space/Sufficient Condition
- Characterization of Hom Bifunctor with Left Functor as Composition of Functors
- Characterization of Hom Bifunctor with Right Functor as Composition of Functors
- Characterization of Homeomorphic Topological Spaces
- Characterization of Homeomorphic Topological Spaces/Necessary Condition
- Characterization of Homeomorphic Topological Spaces/Sufficient Condition
- Characterization of Isomorphism in Loc*
- Characterization of Isomorphism in Loc*/Isomorphism iff Lower Adjoint is Frame Isomorphism
- Characterization of Isomorphism in Loc*/Order Isomorphism iff Lower Adjoint is Order Isomorphism
- Characterization of Join Irreducible Element
- Characterization of Locale
- Characterization of Locale/Statement 5 Implies Statement 3
- Characterization of Localic Mapping Induced by Continuous Mapping
- Characterization of Matroid Independent Sets in Terms of Bases
- Characterization of Meet Irreducible Element
- Characterization of Meet-Irreducible Open Set
- Characterization of Minimal Element
- Characterization of Natural Transformation Between Bifunctors
- Characterization of Natural Transformation Between Bifunctors/Necessary Condition
- Characterization of Natural Transformation Between Bifunctors/Proof 1
- Characterization of Natural Transformation Between Bifunctors/Proof 1 Necessary Condition
- Characterization of Natural Transformation Between Bifunctors/Proof 1 Sufficient Condition
- Characterization of Natural Transformation Between Bifunctors/Proof 2
- Characterization of Natural Transformation Between Bifunctors/Proof 2 Necessary Condition
- Characterization of Natural Transformation Between Bifunctors/Proof 2 Sufficient Condition
- Characterization of Natural Transformation Between Bifunctors/Sufficient Condition
- Characterization of Open Set by Open Cover
- Characterization of Paracompactness in T3 Space/Lemma 1
- Characterization of Paracompactness in T3 Space/Lemma 10
- Characterization of Paracompactness in T3 Space/Lemma 11
- Characterization of Paracompactness in T3 Space/Lemma 12
- Characterization of Paracompactness in T3 Space/Lemma 13
- Characterization of Paracompactness in T3 Space/Lemma 14
- Characterization of Paracompactness in T3 Space/Lemma 16
- Characterization of Paracompactness in T3 Space/Lemma 17
- Characterization of Paracompactness in T3 Space/Lemma 18
- Characterization of Paracompactness in T3 Space/Lemma 19
- Characterization of Paracompactness in T3 Space/Lemma 2
- Characterization of Paracompactness in T3 Space/Lemma 20
- Characterization of Paracompactness in T3 Space/Lemma 21
- Characterization of Paracompactness in T3 Space/Lemma 3
- Characterization of Paracompactness in T3 Space/Lemma 4
- Characterization of Paracompactness in T3 Space/Lemma 5
- Characterization of Paracompactness in T3 Space/Lemma 7
- Characterization of Paracompactness in T3 Space/Lemma 8
- Characterization of Paracompactness in T3 Space/Lemma 9
- Characterization of Paracompactness in T3 Space/Statement 1 implies Statement 2
- Characterization of Paracompactness in T3 Space/Statement 2 implies Statement 3
- Characterization of Paracompactness in T3 Space/Statement 3 implies Statement 1
- Characterization of Paracompactness in T3 Space/Statement 3 implies Statement 4
- Characterization of Paracompactness in T3 Space/Statement 4 implies Statement 5
- Characterization of Paracompactness in T3 Space/Statement 5 implies Statement 6
- Characterization of Paracompactness in T3 Space/Statement 6 implies Statement 2
- Characterization of Pointwise Maximum of Real-Valued Functions
- Characterization of Pointwise Minimum of Real-Valued Functions
- Characterization of Rational P-adic Integer
- Characterization of Rational P-adic Unit
- Characterization of Set Equals Union of Sets
- Characterization of Strictly Increasing Mapping on Woset
- Characterization of Supremum Precedes Element
- Characterization of T1 Space using Basis
- Characterization of T1 Space using Neighborhood Basis
- Circuits of Matroid iff Matroid Circuit Axioms
- Circuits of Matroid iff Matroid Circuit Axioms/Circuits of Matroid implies Formulation 1
- Circuits of Matroid iff Matroid Circuit Axioms/Formulation 2 implies Circuits of Matroid
- Circuits of Matroid iff Matroid Circuit Axioms/Lemma 1
- Circuits of Matroid iff Matroid Circuit Axioms/Lemma 2
- Circuits of Matroid iff Matroid Circuit Axioms/Lemma 3
- Circuits of Matroid iff Matroid Circuit Axioms/Lemma 4
- Circuits of Matroid iff Matroid Circuit Axioms/Lemma 5
- Definition:Class (Class Theory)/Zermelo-Fraenkel
- Classical Probability is Probability Measure
- Classification of Compact One-Manifolds
- Classification of Compact One-Manifolds/Corollary
- Classification of Compact One-Manifolds/Lemma 1
- Classification of Compact One-Manifolds/Lemma 2
- Classification of Compact One-Manifolds/Lemma 3
- Closed Ball in Metric Space is Closed Neighborhood
- Closed Ball is Connected
- Closed Ball is Path-Connected
- Closed Unit Interval is not Countably Infinite Union of Disjoint Closed Sets
- Closures of Elements of Locally Finite Set is Locally Finite
- Definition:Coincident/Mappings
- Combination Theorem for Bounded Continuous Real-Valued Functions
- Combination Theorem for Bounded Continuous Real-Valued Functions/Difference Rule
- Combination Theorem for Bounded Continuous Real-Valued Functions/Maximum Rule
- Combination Theorem for Bounded Continuous Real-Valued Functions/Minimum Rule
- Combination Theorem for Bounded Continuous Real-Valued Functions/Multiple Rule
- Combination Theorem for Bounded Continuous Real-Valued Functions/Negation Rule
- Combination Theorem for Bounded Continuous Real-Valued Functions/Product Rule
- Combination Theorem for Bounded Continuous Real-Valued Functions/Sum Rule
- Combination Theorem for Bounded Real-Valued Functions
- Combination Theorem for Bounded Real-Valued Functions/Difference Rule