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23 April 2024
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N 08:36 | Definition:Reducible Polynomial/Definition 2 2 changes history +551 [Prime.mover (2×)] | |||
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08:36 (cur | prev) −2 Prime.mover talk contribs | |||
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08:03 (cur | prev) +553 Prime.mover talk contribs (Created page with "== Definition == <onlyinclude> Let $K$ be a field. A '''irreducible polynomial over $K$''' is a polynomial over $K$ that can be expressed as the product of two nonconstant polynomials. </onlyinclude> == Also see == * Equivalence of Definitions of Reducible Polynomial over Field...") |
08:12 | Definition:Irreducible Polynomial/Definition 1 diffhist +38 Prime.mover talk contribs |
08:11 | Definition:Irreducible Polynomial/Definition 3 diffhist +38 Prime.mover talk contribs |
N 08:02 | Definition:Reducible Polynomial/Definition 1 diffhist +652 Prime.mover talk contribs (Created page with "== Definition == <onlyinclude> Let $K$ be a field. A '''reducible polynomial over $K$''' is a nonconstant polynomial over $K$ that can be expressed as the product of two polynomials over $K$ of smaller degree. <...") |
07:42 | Definition:Reducible G-Module diffhist +92 Prime.mover talk contribs |
19 April 2024
m 10:54 | Definition:Curvature/Polar Form diffhist +1 Prime.mover talk contribs |
10:23 | Definition:Left Adjoint Functor diffhist +57 Leigh.Samphier talk contribs |
N 10:22 | Definition:Right Adjoint Functor diffhist +516 Leigh.Samphier talk contribs (Created page with "== Definition == Let $\mathbf C$, $\mathbf D$ be locally small categories. Let $F : \mathbf D \to \mathbf C$ and $G : \mathbf C \to \mathbf D$ be functors. $G$ is a '''right adjoint functor''' of $F$ {{iff}} there exists an adjunction $\struct {F, G, \alpha}$. == Also see == * Definition:Left Adjoint Functor == Sources == {{NoSources}}...") |
18 April 2024
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17:04 | Definition:Commutative Square 2 changes history +48 [Prime.mover; Leigh.Samphier] | |||
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17:04 (cur | prev) +31 Prime.mover talk contribs | |||
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10:24 (cur | prev) +17 Leigh.Samphier talk contribs |
10:21 | Definition:Homomorphism of Complexes diffhist +17 Leigh.Samphier talk contribs |
09:29 | Definition:Product (Category Theory)/General Definition diffhist +17 Leigh.Samphier talk contribs |