HomeTheorem List (p. 197 of 435)
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| Type | Label | Description |
|---|---|---|
| Statement | ||
| Theorem | 2idlval 19601 | Definition of a two-sided ideal. (Contributed by Mario Carneiro, 14-Jun-2015.) |
| ⊢ 𝐼 = (LIdeal‘𝑅) & ⊢ 𝑂 = (oppr‘𝑅) & ⊢ 𝐽 = (LIdeal‘𝑂) & ⊢ 𝑇 = (2Ideal‘𝑅) ⇒ ⊢ 𝑇 = (𝐼 ∩ 𝐽) | ||
| Theorem | 2idlcpbl 19602 | The coset equivalence relation for a two-sided ideal is compatible with ring multiplication. (Contributed by Mario Carneiro, 14-Jun-2015.) |
| ⊢ 𝑋 = (Base‘𝑅) & ⊢ 𝐸 = (𝑅 ~QG 𝑆) & ⊢ 𝐼 = (2Ideal‘𝑅) & ⊢ · = (.r‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝑆 ∈ 𝐼) → ((𝐴𝐸𝐶 ∧ 𝐵𝐸𝐷) → (𝐴 · 𝐵)𝐸(𝐶 · 𝐷))) | ||
| Theorem | qus1 19603 | The multiplicative identity of the quotient ring. (Contributed by Mario Carneiro, 14-Jun-2015.) |
| ⊢ 𝑈 = (𝑅 /s (𝑅 ~QG 𝑆)) & ⊢ 𝐼 = (2Ideal‘𝑅) & ⊢ 1 = (1r‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝑆 ∈ 𝐼) → (𝑈 ∈ Ring ∧ [ 1 ](𝑅 ~QG 𝑆) = (1r‘𝑈))) | ||
| Theorem | qusring 19604 | If 𝑆 is a two-sided ideal in 𝑅, then 𝑈 = 𝑅 / 𝑆 is a ring, called the quotient ring of 𝑅 by 𝑆. (Contributed by Mario Carneiro, 14-Jun-2015.) |
| ⊢ 𝑈 = (𝑅 /s (𝑅 ~QG 𝑆)) & ⊢ 𝐼 = (2Ideal‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝑆 ∈ 𝐼) → 𝑈 ∈ Ring) | ||
| Theorem | qusrhm 19605* | If 𝑆 is a two-sided ideal in 𝑅, then the "natural map" from elements to their cosets is a ring homomorphism from 𝑅 to 𝑅 / 𝑆. (Contributed by Mario Carneiro, 15-Jun-2015.) |
| ⊢ 𝑈 = (𝑅 /s (𝑅 ~QG 𝑆)) & ⊢ 𝐼 = (2Ideal‘𝑅) & ⊢ 𝑋 = (Base‘𝑅) & ⊢ 𝐹 = (𝑥 ∈ 𝑋 ↦ [𝑥](𝑅 ~QG 𝑆)) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝑆 ∈ 𝐼) → 𝐹 ∈ (𝑅 RingHom 𝑈)) | ||
| Theorem | crngridl 19606 | In a commutative ring, the left and right ideals coincide. (Contributed by Mario Carneiro, 14-Jun-2015.) |
| ⊢ 𝐼 = (LIdeal‘𝑅) & ⊢ 𝑂 = (oppr‘𝑅) ⇒ ⊢ (𝑅 ∈ CRing → 𝐼 = (LIdeal‘𝑂)) | ||
| Theorem | crng2idl 19607 | In a commutative ring, a two-sided ideal is the same as a left ideal. (Contributed by Mario Carneiro, 14-Jun-2015.) |
| ⊢ 𝐼 = (LIdeal‘𝑅) ⇒ ⊢ (𝑅 ∈ CRing → 𝐼 = (2Ideal‘𝑅)) | ||
| Theorem | quscrng 19608 | The quotient of a commutative ring by an ideal is a commutative ring. (Contributed by Mario Carneiro, 15-Jun-2015.) |
| ⊢ 𝑈 = (𝑅 /s (𝑅 ~QG 𝑆)) & ⊢ 𝐼 = (LIdeal‘𝑅) ⇒ ⊢ ((𝑅 ∈ CRing ∧ 𝑆 ∈ 𝐼) → 𝑈 ∈ CRing) | ||
| Syntax | clpidl 19609 | Ring left-principal-ideal function. |
| class LPIdeal | ||
| Syntax | clpir 19610 | Class of left principal ideal rings. |
| class LPIR | ||
| Definition | df-lpidl 19611* | Define the class of left principal ideals of a ring, which are ideals with a single generator. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ LPIdeal = (𝑤 ∈ Ring ↦ ∪ 𝑔 ∈ (Base‘𝑤){((RSpan‘𝑤)‘{𝑔})}) | ||
| Definition | df-lpir 19612 | Define the class of left principal ideal rings, rings where every left ideal has a single generator. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ LPIR = {𝑤 ∈ Ring ∣ (LIdeal‘𝑤) = (LPIdeal‘𝑤)} | ||
| Theorem | lpival 19613* | Value of the set of principal ideals. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ 𝑃 = (LPIdeal‘𝑅) & ⊢ 𝐾 = (RSpan‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ (𝑅 ∈ Ring → 𝑃 = ∪ 𝑔 ∈ 𝐵 {(𝐾‘{𝑔})}) | ||
| Theorem | islpidl 19614* | Property of being a principal ideal. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ 𝑃 = (LPIdeal‘𝑅) & ⊢ 𝐾 = (RSpan‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ (𝑅 ∈ Ring → (𝐼 ∈ 𝑃 ↔ ∃𝑔 ∈ 𝐵 𝐼 = (𝐾‘{𝑔}))) | ||
| Theorem | lpi0 19615 | The zero ideal is always principal. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ 𝑃 = (LPIdeal‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ (𝑅 ∈ Ring → { 0 } ∈ 𝑃) | ||
| Theorem | lpi1 19616 | The unit ideal is always principal. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ 𝑃 = (LPIdeal‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ (𝑅 ∈ Ring → 𝐵 ∈ 𝑃) | ||
| Theorem | islpir 19617 | Principal ideal rings are where all ideals are principal. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ 𝑃 = (LPIdeal‘𝑅) & ⊢ 𝑈 = (LIdeal‘𝑅) ⇒ ⊢ (𝑅 ∈ LPIR ↔ (𝑅 ∈ Ring ∧ 𝑈 = 𝑃)) | ||
| Theorem | lpiss 19618 | Principal ideals are a subclass of ideal. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ 𝑃 = (LPIdeal‘𝑅) & ⊢ 𝑈 = (LIdeal‘𝑅) ⇒ ⊢ (𝑅 ∈ Ring → 𝑃 ⊆ 𝑈) | ||
| Theorem | islpir2 19619 | Principal ideal rings are where all ideals are principal. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ 𝑃 = (LPIdeal‘𝑅) & ⊢ 𝑈 = (LIdeal‘𝑅) ⇒ ⊢ (𝑅 ∈ LPIR ↔ (𝑅 ∈ Ring ∧ 𝑈 ⊆ 𝑃)) | ||
| Theorem | lpirring 19620 | Principal ideal rings are rings. (Contributed by Stefan O'Rear, 24-Jan-2015.) |
| ⊢ (𝑅 ∈ LPIR → 𝑅 ∈ Ring) | ||
| Theorem | drnglpir 19621 | Division rings are principal ideal. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ (𝑅 ∈ DivRing → 𝑅 ∈ LPIR) | ||
| Theorem | rspsn 19622* | Membership in principal ideals is closely related to divisibility. (Contributed by Stefan O'Rear, 3-Jan-2015.) (Revised by Mario Carneiro, 6-May-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 𝐾 = (RSpan‘𝑅) & ⊢ ∥ = (∥r‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝐺 ∈ 𝐵) → (𝐾‘{𝐺}) = {𝑥 ∣ 𝐺 ∥ 𝑥}) | ||
| Theorem | lidldvgen 19623* | An element generates an ideal iff it is contained in the ideal and all elements are right-divided by it. (Contributed by Stefan O'Rear, 3-Jan-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 𝑈 = (LIdeal‘𝑅) & ⊢ 𝐾 = (RSpan‘𝑅) & ⊢ ∥ = (∥r‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝐼 ∈ 𝑈 ∧ 𝐺 ∈ 𝐵) → (𝐼 = (𝐾‘{𝐺}) ↔ (𝐺 ∈ 𝐼 ∧ ∀𝑥 ∈ 𝐼 𝐺 ∥ 𝑥))) | ||
| Theorem | lpigen 19624* | An ideal is principal iff it contains an element which right-divides all elements. (Contributed by Stefan O'Rear, 3-Jan-2015.) (Revised by Wolf Lammen, 6-Sep-2020.) |
| ⊢ 𝑈 = (LIdeal‘𝑅) & ⊢ 𝑃 = (LPIdeal‘𝑅) & ⊢ ∥ = (∥r‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝐼 ∈ 𝑈) → (𝐼 ∈ 𝑃 ↔ ∃𝑥 ∈ 𝐼 ∀𝑦 ∈ 𝐼 𝑥 ∥ 𝑦)) | ||
| Syntax | cnzr 19625 | The class of nonzero rings. |
| class NzRing | ||
| Definition | df-nzr 19626 | A nonzero or nontrivial ring is a ring with at least two values, or equivalently where 1 and 0 are different. (Contributed by Stefan O'Rear, 24-Feb-2015.) |
| ⊢ NzRing = {𝑟 ∈ Ring ∣ (1r‘𝑟) ≠ (0g‘𝑟)} | ||
| Theorem | isnzr 19627 | Property of a nonzero ring. (Contributed by Stefan O'Rear, 24-Feb-2015.) |
| ⊢ 1 = (1r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ (𝑅 ∈ NzRing ↔ (𝑅 ∈ Ring ∧ 1 ≠ 0 )) | ||
| Theorem | nzrnz 19628 | One and zero are different in a nonzero ring. (Contributed by Stefan O'Rear, 24-Feb-2015.) |
| ⊢ 1 = (1r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ (𝑅 ∈ NzRing → 1 ≠ 0 ) | ||
| Theorem | nzrring 19629 | A nonzero ring is a ring. (Contributed by Stefan O'Rear, 24-Feb-2015.) |
| ⊢ (𝑅 ∈ NzRing → 𝑅 ∈ Ring) | ||
| Theorem | drngnzr 19630 | All division rings are nonzero. (Contributed by Stefan O'Rear, 24-Feb-2015.) |
| ⊢ (𝑅 ∈ DivRing → 𝑅 ∈ NzRing) | ||
| Theorem | isnzr2 19631 | Equivalent characterization of nonzero rings: they have at least two elements. (Contributed by Stefan O'Rear, 24-Feb-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ (𝑅 ∈ NzRing ↔ (𝑅 ∈ Ring ∧ 2o ≼ 𝐵)) | ||
| Theorem | isnzr2hash 19632 | Equivalent characterization of nonzero rings: they have at least two elements. Analogous to isnzr2 19631. (Contributed by AV, 14-Apr-2019.) |
| ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ (𝑅 ∈ NzRing ↔ (𝑅 ∈ Ring ∧ 1 < (♯‘𝐵))) | ||
| Theorem | opprnzr 19633 | The opposite of a nonzero ring is nonzero. (Contributed by Mario Carneiro, 17-Jun-2015.) |
| ⊢ 𝑂 = (oppr‘𝑅) ⇒ ⊢ (𝑅 ∈ NzRing → 𝑂 ∈ NzRing) | ||
| Theorem | ringelnzr 19634 | A ring is nonzero if it has a nonzero element. (Contributed by Stefan O'Rear, 6-Feb-2015.) (Revised by Mario Carneiro, 13-Jun-2015.) |
| ⊢ 0 = (0g‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝑋 ∈ (𝐵 ∖ { 0 })) → 𝑅 ∈ NzRing) | ||
| Theorem | nzrunit 19635 | A unit is nonzero in any nonzero ring. (Contributed by Mario Carneiro, 6-Oct-2015.) |
| ⊢ 𝑈 = (Unit‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ ((𝑅 ∈ NzRing ∧ 𝐴 ∈ 𝑈) → 𝐴 ≠ 0 ) | ||
| Theorem | subrgnzr 19636 | A subring of a nonzero ring is nonzero. (Contributed by Mario Carneiro, 15-Jun-2015.) |
| ⊢ 𝑆 = (𝑅 ↾s 𝐴) ⇒ ⊢ ((𝑅 ∈ NzRing ∧ 𝐴 ∈ (SubRing‘𝑅)) → 𝑆 ∈ NzRing) | ||
| Theorem | 0ringnnzr 19637 | A ring is a zero ring iff it is not a nonzero ring. (Contributed by AV, 14-Apr-2019.) |
| ⊢ (𝑅 ∈ Ring → ((♯‘(Base‘𝑅)) = 1 ↔ ¬ 𝑅 ∈ NzRing)) | ||
| Theorem | 0ring 19638 | If a ring has only one element, it is the zero ring. According to Wikipedia ("Zero ring", 14-Apr-2019, https://en.wikipedia.org/wiki/Zero_ring): "The zero ring, denoted {0} or simply 0, consists of the one-element set {0} with the operations + and * defined so that 0 + 0 = 0 and 0 * 0 = 0.". (Contributed by AV, 14-Apr-2019.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ (♯‘𝐵) = 1) → 𝐵 = { 0 }) | ||
| Theorem | 0ring01eq 19639 | In a ring with only one element, i.e. a zero ring, the zero and the identity element are the same. (Contributed by AV, 14-Apr-2019.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 0 = (0g‘𝑅) & ⊢ 1 = (1r‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ (♯‘𝐵) = 1) → 0 = 1 ) | ||
| Theorem | 01eq0ring 19640 | If the zero and the identity element of a ring are the same, the ring is the zero ring. (Contributed by AV, 16-Apr-2019.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 0 = (0g‘𝑅) & ⊢ 1 = (1r‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 0 = 1 ) → 𝐵 = { 0 }) | ||
| Theorem | 0ring01eqbi 19641 | In a unital ring the zero equals the unity iff the ring is the zero ring. (Contributed by FL, 14-Feb-2010.) (Revised by AV, 23-Jan-2020.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 0 = (0g‘𝑅) & ⊢ 1 = (1r‘𝑅) ⇒ ⊢ (𝑅 ∈ Ring → (𝐵 ≈ 1o ↔ 1 = 0 )) | ||
| Theorem | rng1nnzr 19642 | The (smallest) structure representing a zero ring is not a nonzero ring. (Contributed by AV, 29-Apr-2019.) |
| ⊢ 𝑀 = {⟨(Base‘ndx), {𝑍}⟩, ⟨(+g‘ndx), {⟨⟨𝑍, 𝑍⟩, 𝑍⟩}⟩, ⟨(.r‘ndx), {⟨⟨𝑍, 𝑍⟩, 𝑍⟩}⟩} ⇒ ⊢ (𝑍 ∈ 𝑉 → 𝑀 ∉ NzRing) | ||
| Theorem | ring1zr 19643 | The only (unital) ring with a base set consisting of one element is the zero ring (at least if its operations are internal binary operations). Note: The assumption 𝑅 ∈ Ring could be weakened if a definition of a non-unital ring ("Rng") was available (it would be sufficient that the multiplication is closed). (Contributed by FL, 13-Feb-2010.) (Revised by AV, 25-Jan-2020.) (Proof shortened by AV, 7-Feb-2020.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ + = (+g‘𝑅) & ⊢ ∗ = (.r‘𝑅) ⇒ ⊢ (((𝑅 ∈ Ring ∧ + Fn (𝐵 × 𝐵) ∧ ∗ Fn (𝐵 × 𝐵)) ∧ 𝑍 ∈ 𝐵) → (𝐵 = {𝑍} ↔ ( + = {⟨⟨𝑍, 𝑍⟩, 𝑍⟩} ∧ ∗ = {⟨⟨𝑍, 𝑍⟩, 𝑍⟩}))) | ||
| Theorem | rngen1zr 19644 | The only (unital) ring with one element is the zero ring (at least if its operations are internal binary operations). Note: The assumption 𝑅 ∈ Ring could be weakened if a definition of a non-unital ring ("Rng") was available (it would be sufficient that the multiplication is closed). (Contributed by FL, 14-Feb-2010.) (Revised by AV, 25-Jan-2020.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ + = (+g‘𝑅) & ⊢ ∗ = (.r‘𝑅) ⇒ ⊢ (((𝑅 ∈ Ring ∧ + Fn (𝐵 × 𝐵) ∧ ∗ Fn (𝐵 × 𝐵)) ∧ 𝑍 ∈ 𝐵) → (𝐵 ≈ 1o ↔ ( + = {⟨⟨𝑍, 𝑍⟩, 𝑍⟩} ∧ ∗ = {⟨⟨𝑍, 𝑍⟩, 𝑍⟩}))) | ||
| Theorem | ringen1zr 19645 | The only unital ring with one element is the zero ring (at least if its operations are internal binary operations). Note: The assumption 𝑅 ∈ Ring could be weakened if a definition of a non-unital ring ("Rng") was available (it would be sufficient that the multiplication is closed). (Contributed by FL, 15-Feb-2010.) (Revised by AV, 25-Jan-2020.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ + = (+g‘𝑅) & ⊢ ∗ = (.r‘𝑅) & ⊢ 𝑍 = (0g‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ + Fn (𝐵 × 𝐵) ∧ ∗ Fn (𝐵 × 𝐵)) → (𝐵 ≈ 1o ↔ ( + = {⟨⟨𝑍, 𝑍⟩, 𝑍⟩} ∧ ∗ = {⟨⟨𝑍, 𝑍⟩, 𝑍⟩}))) | ||
| Theorem | rng1nfld 19646 | The zero ring is not a field. (Contributed by AV, 29-Apr-2019.) |
| ⊢ 𝑀 = {⟨(Base‘ndx), {𝑍}⟩, ⟨(+g‘ndx), {⟨⟨𝑍, 𝑍⟩, 𝑍⟩}⟩, ⟨(.r‘ndx), {⟨⟨𝑍, 𝑍⟩, 𝑍⟩}⟩} ⇒ ⊢ (𝑍 ∈ 𝑉 → 𝑀 ∉ Field) | ||
| Syntax | crlreg 19647 | Set of left-regular elements in a ring. |
| class RLReg | ||
| Syntax | cdomn 19648 | Class of (ring theoretic) domains. |
| class Domn | ||
| Syntax | cidom 19649 | Class of integral domains. |
| class IDomn | ||
| Syntax | cpid 19650 | Class of principal ideal domains. |
| class PID | ||
| Definition | df-rlreg 19651* | Define the set of left-regular elements in a ring as those elements which are not left zero divisors, meaning that multiplying a nonzero element on the left by a left-regular element gives a nonzero product. (Contributed by Stefan O'Rear, 22-Mar-2015.) |
| ⊢ RLReg = (𝑟 ∈ V ↦ {𝑥 ∈ (Base‘𝑟) ∣ ∀𝑦 ∈ (Base‘𝑟)((𝑥(.r‘𝑟)𝑦) = (0g‘𝑟) → 𝑦 = (0g‘𝑟))}) | ||
| Definition | df-domn 19652* | A domain is a nonzero ring in which there are no nontrivial zero divisors. (Contributed by Mario Carneiro, 28-Mar-2015.) |
| ⊢ Domn = {𝑟 ∈ NzRing ∣ [(Base‘𝑟) / 𝑏][(0g‘𝑟) / 𝑧]∀𝑥 ∈ 𝑏 ∀𝑦 ∈ 𝑏 ((𝑥(.r‘𝑟)𝑦) = 𝑧 → (𝑥 = 𝑧 ∨ 𝑦 = 𝑧))} | ||
| Definition | df-idom 19653 | An integral domain is a commutative domain. (Contributed by Mario Carneiro, 17-Jun-2015.) |
| ⊢ IDomn = (CRing ∩ Domn) | ||
| Definition | df-pid 19654 | A principal ideal domain is an integral domain satisfying the left principal ideal property. (Contributed by Stefan O'Rear, 29-Mar-2015.) |
| ⊢ PID = (IDomn ∩ LPIR) | ||
| Theorem | rrgval 19655* | Value of the set or left-regular elements in a ring. (Contributed by Stefan O'Rear, 22-Mar-2015.) |
| ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ 𝐸 = {𝑥 ∈ 𝐵 ∣ ∀𝑦 ∈ 𝐵 ((𝑥 · 𝑦) = 0 → 𝑦 = 0 )} | ||
| Theorem | isrrg 19656* | Membership in the set of left-regular elements. (Contributed by Stefan O'Rear, 22-Mar-2015.) |
| ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ (𝑋 ∈ 𝐸 ↔ (𝑋 ∈ 𝐵 ∧ ∀𝑦 ∈ 𝐵 ((𝑋 · 𝑦) = 0 → 𝑦 = 0 ))) | ||
| Theorem | rrgeq0i 19657 | Property of a left-regular element. (Contributed by Stefan O'Rear, 22-Mar-2015.) |
| ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ ((𝑋 ∈ 𝐸 ∧ 𝑌 ∈ 𝐵) → ((𝑋 · 𝑌) = 0 → 𝑌 = 0 )) | ||
| Theorem | rrgeq0 19658 | Left-multiplication by a left regular element does not change zeroness. (Contributed by Stefan O'Rear, 28-Mar-2015.) |
| ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ ((𝑅 ∈ Ring ∧ 𝑋 ∈ 𝐸 ∧ 𝑌 ∈ 𝐵) → ((𝑋 · 𝑌) = 0 ↔ 𝑌 = 0 )) | ||
| Theorem | rrgsupp 19659 | Left multiplication by a left regular element does not change the support set of a vector. (Contributed by Stefan O'Rear, 28-Mar-2015.) (Revised by AV, 20-Jul-2019.) |
| ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ 0 = (0g‘𝑅) & ⊢ (𝜑 → 𝐼 ∈ 𝑉) & ⊢ (𝜑 → 𝑅 ∈ Ring) & ⊢ (𝜑 → 𝑋 ∈ 𝐸) & ⊢ (𝜑 → 𝑌:𝐼⟶𝐵) ⇒ ⊢ (𝜑 → (((𝐼 × {𝑋}) ∘𝑓 · 𝑌) supp 0 ) = (𝑌 supp 0 )) | ||
| Theorem | rrgss 19660 | Left-regular elements are a subset of the base set. (Contributed by Stefan O'Rear, 22-Mar-2015.) |
| ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ 𝐸 ⊆ 𝐵 | ||
| Theorem | unitrrg 19661 | Units are regular elements. (Contributed by Stefan O'Rear, 22-Mar-2015.) |
| ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 𝑈 = (Unit‘𝑅) ⇒ ⊢ (𝑅 ∈ Ring → 𝑈 ⊆ 𝐸) | ||
| Theorem | isdomn 19662* | Expand definition of a domain. (Contributed by Mario Carneiro, 28-Mar-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ (𝑅 ∈ Domn ↔ (𝑅 ∈ NzRing ∧ ∀𝑥 ∈ 𝐵 ∀𝑦 ∈ 𝐵 ((𝑥 · 𝑦) = 0 → (𝑥 = 0 ∨ 𝑦 = 0 )))) | ||
| Theorem | domnnzr 19663 | A domain is a nonzero ring. (Contributed by Mario Carneiro, 28-Mar-2015.) |
| ⊢ (𝑅 ∈ Domn → 𝑅 ∈ NzRing) | ||
| Theorem | domnring 19664 | A domain is a ring. (Contributed by Mario Carneiro, 28-Mar-2015.) |
| ⊢ (𝑅 ∈ Domn → 𝑅 ∈ Ring) | ||
| Theorem | domneq0 19665 | In a domain, a product is zero iff it has a zero factor. (Contributed by Mario Carneiro, 28-Mar-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ ((𝑅 ∈ Domn ∧ 𝑋 ∈ 𝐵 ∧ 𝑌 ∈ 𝐵) → ((𝑋 · 𝑌) = 0 ↔ (𝑋 = 0 ∨ 𝑌 = 0 ))) | ||
| Theorem | domnmuln0 19666 | In a domain, a product of nonzero elements is nonzero. (Contributed by Mario Carneiro, 6-May-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ ((𝑅 ∈ Domn ∧ (𝑋 ∈ 𝐵 ∧ 𝑋 ≠ 0 ) ∧ (𝑌 ∈ 𝐵 ∧ 𝑌 ≠ 0 )) → (𝑋 · 𝑌) ≠ 0 ) | ||
| Theorem | isdomn2 19667 | A ring is a domain iff all nonzero elements are nonzero-divisors. (Contributed by Mario Carneiro, 28-Mar-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ (𝑅 ∈ Domn ↔ (𝑅 ∈ NzRing ∧ (𝐵 ∖ { 0 }) ⊆ 𝐸)) | ||
| Theorem | domnrrg 19668 | In a domain, any nonzero element is a nonzero-divisor. (Contributed by Mario Carneiro, 28-Mar-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 𝐸 = (RLReg‘𝑅) & ⊢ 0 = (0g‘𝑅) ⇒ ⊢ ((𝑅 ∈ Domn ∧ 𝑋 ∈ 𝐵 ∧ 𝑋 ≠ 0 ) → 𝑋 ∈ 𝐸) | ||
| Theorem | opprdomn 19669 | The opposite of a domain is also a domain. (Contributed by Mario Carneiro, 15-Jun-2015.) |
| ⊢ 𝑂 = (oppr‘𝑅) ⇒ ⊢ (𝑅 ∈ Domn → 𝑂 ∈ Domn) | ||
| Theorem | abvn0b 19670 | Another characterization of domains, hinted at in abvtriv 19204: a nonzero ring is a domain iff it has an absolute value. (Contributed by Mario Carneiro, 6-May-2015.) |
| ⊢ 𝐴 = (AbsVal‘𝑅) ⇒ ⊢ (𝑅 ∈ Domn ↔ (𝑅 ∈ NzRing ∧ 𝐴 ≠ ∅)) | ||
| Theorem | drngdomn 19671 | A division ring is a domain. (Contributed by Mario Carneiro, 29-Mar-2015.) |
| ⊢ (𝑅 ∈ DivRing → 𝑅 ∈ Domn) | ||
| Theorem | isidom 19672 | An integral domain is a commutative domain. (Contributed by Mario Carneiro, 17-Jun-2015.) |
| ⊢ (𝑅 ∈ IDomn ↔ (𝑅 ∈ CRing ∧ 𝑅 ∈ Domn)) | ||
| Theorem | fldidom 19673 | A field is an integral domain. (Contributed by Mario Carneiro, 29-Mar-2015.) |
| ⊢ (𝑅 ∈ Field → 𝑅 ∈ IDomn) | ||
| Theorem | fidomndrnglem 19674* | Lemma for fidomndrng 19675. (Contributed by Mario Carneiro, 15-Jun-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) & ⊢ 0 = (0g‘𝑅) & ⊢ 1 = (1r‘𝑅) & ⊢ ∥ = (∥r‘𝑅) & ⊢ · = (.r‘𝑅) & ⊢ (𝜑 → 𝑅 ∈ Domn) & ⊢ (𝜑 → 𝐵 ∈ Fin) & ⊢ (𝜑 → 𝐴 ∈ (𝐵 ∖ { 0 })) & ⊢ 𝐹 = (𝑥 ∈ 𝐵 ↦ (𝑥 · 𝐴)) ⇒ ⊢ (𝜑 → 𝐴 ∥ 1 ) | ||
| Theorem | fidomndrng 19675 | A finite domain is a division ring. (Contributed by Mario Carneiro, 15-Jun-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ (𝐵 ∈ Fin → (𝑅 ∈ Domn ↔ 𝑅 ∈ DivRing)) | ||
| Theorem | fiidomfld 19676 | A finite integral domain is a field. (Contributed by Mario Carneiro, 15-Jun-2015.) |
| ⊢ 𝐵 = (Base‘𝑅) ⇒ ⊢ (𝐵 ∈ Fin → (𝑅 ∈ IDomn ↔ 𝑅 ∈ Field)) | ||
| Syntax | casa 19677 | Associative algebra. |
| class AssAlg | ||
| Syntax | casp 19678 | Algebraic span function. |
| class AlgSpan | ||
| Syntax | cascl 19679 | Class of algebra scalar injection function. |
| class algSc | ||
| Definition | df-assa 19680* | Definition of an associative algebra. An associative algebra is a set equipped with a left-module structure on a (commutative) ring, coupled with a multiplicative internal operation on the vectors of the module that is associative and distributive for the additive structure of the left-module (so giving the vectors a ring structure) and that is also bilinear under the scalar product. (Contributed by Mario Carneiro, 29-Dec-2014.) |
| ⊢ AssAlg = {𝑤 ∈ (LMod ∩ Ring) ∣ [(Scalar‘𝑤) / 𝑓](𝑓 ∈ CRing ∧ ∀𝑟 ∈ (Base‘𝑓)∀𝑥 ∈ (Base‘𝑤)∀𝑦 ∈ (Base‘𝑤)[( ·𝑠 ‘𝑤) / 𝑠][(.r‘𝑤) / 𝑡](((𝑟𝑠𝑥)𝑡𝑦) = (𝑟𝑠(𝑥𝑡𝑦)) ∧ (𝑥𝑡(𝑟𝑠𝑦)) = (𝑟𝑠(𝑥𝑡𝑦))))} | ||
| Definition | df-asp 19681* | Define the algebraic span of a set of vectors in an algebra. (Contributed by Mario Carneiro, 7-Jan-2015.) |
| ⊢ AlgSpan = (𝑤 ∈ AssAlg ↦ (𝑠 ∈ 𝒫 (Base‘𝑤) ↦ ∩ {𝑡 ∈ ((SubRing‘𝑤) ∩ (LSubSp‘𝑤)) ∣ 𝑠 ⊆ 𝑡})) | ||
| Definition | df-ascl 19682* | Every unital algebra contains a canonical homomorphic image of its ring of scalars as scalar multiples of the unit. This names the homomorphism. (Contributed by Mario Carneiro, 8-Mar-2015.) |
| ⊢ algSc = (𝑤 ∈ V ↦ (𝑥 ∈ (Base‘(Scalar‘𝑤)) ↦ (𝑥( ·𝑠 ‘𝑤)(1r‘𝑤)))) | ||
| Theorem | isassa 19683* | The properties of an associative algebra. (Contributed by Mario Carneiro, 29-Dec-2014.) |
| ⊢ 𝑉 = (Base‘𝑊) & ⊢ 𝐹 = (Scalar‘𝑊) & ⊢ 𝐵 = (Base‘𝐹) & ⊢ · = ( ·𝑠 ‘𝑊) & ⊢ × = (.r‘𝑊) ⇒ ⊢ (𝑊 ∈ AssAlg ↔ ((𝑊 ∈ LMod ∧ 𝑊 ∈ Ring ∧ 𝐹 ∈ CRing) ∧ ∀𝑟 ∈ 𝐵 ∀𝑥 ∈ 𝑉 ∀𝑦 ∈ 𝑉 (((𝑟 · 𝑥) × 𝑦) = (𝑟 · (𝑥 × 𝑦)) ∧ (𝑥 × (𝑟 · 𝑦)) = (𝑟 · (𝑥 × 𝑦))))) | ||
| Theorem | assalem 19684 | The properties of an associative algebra. (Contributed by Mario Carneiro, 29-Dec-2014.) |
| ⊢ 𝑉 = (Base‘𝑊) & ⊢ 𝐹 = (Scalar‘𝑊) & ⊢ 𝐵 = (Base‘𝐹) & ⊢ · = ( ·𝑠 ‘𝑊) & ⊢ × = (.r‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ (𝐴 ∈ 𝐵 ∧ 𝑋 ∈ 𝑉 ∧ 𝑌 ∈ 𝑉)) → (((𝐴 · 𝑋) × 𝑌) = (𝐴 · (𝑋 × 𝑌)) ∧ (𝑋 × (𝐴 · 𝑌)) = (𝐴 · (𝑋 × 𝑌)))) | ||
| Theorem | assaass 19685 | Left-associative property of an associative algebra. (Contributed by Mario Carneiro, 29-Dec-2014.) |
| ⊢ 𝑉 = (Base‘𝑊) & ⊢ 𝐹 = (Scalar‘𝑊) & ⊢ 𝐵 = (Base‘𝐹) & ⊢ · = ( ·𝑠 ‘𝑊) & ⊢ × = (.r‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ (𝐴 ∈ 𝐵 ∧ 𝑋 ∈ 𝑉 ∧ 𝑌 ∈ 𝑉)) → ((𝐴 · 𝑋) × 𝑌) = (𝐴 · (𝑋 × 𝑌))) | ||
| Theorem | assaassr 19686 | Right-associative property of an associative algebra. (Contributed by Mario Carneiro, 29-Dec-2014.) |
| ⊢ 𝑉 = (Base‘𝑊) & ⊢ 𝐹 = (Scalar‘𝑊) & ⊢ 𝐵 = (Base‘𝐹) & ⊢ · = ( ·𝑠 ‘𝑊) & ⊢ × = (.r‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ (𝐴 ∈ 𝐵 ∧ 𝑋 ∈ 𝑉 ∧ 𝑌 ∈ 𝑉)) → (𝑋 × (𝐴 · 𝑌)) = (𝐴 · (𝑋 × 𝑌))) | ||
| Theorem | assalmod 19687 | An associative algebra is a left module. (Contributed by Mario Carneiro, 5-Dec-2014.) |
| ⊢ (𝑊 ∈ AssAlg → 𝑊 ∈ LMod) | ||
| Theorem | assaring 19688 | An associative algebra is a ring. (Contributed by Mario Carneiro, 5-Dec-2014.) |
| ⊢ (𝑊 ∈ AssAlg → 𝑊 ∈ Ring) | ||
| Theorem | assasca 19689 | An associative algebra's scalar field is a commutative ring. (Contributed by Mario Carneiro, 7-Jan-2015.) |
| ⊢ 𝐹 = (Scalar‘𝑊) ⇒ ⊢ (𝑊 ∈ AssAlg → 𝐹 ∈ CRing) | ||
| Theorem | assa2ass 19690 | Left- and right-associative property of an associative algebra. Notice that the scalars are commuted! (Contributed by AV, 14-Aug-2019.) |
| ⊢ 𝑉 = (Base‘𝑊) & ⊢ 𝐹 = (Scalar‘𝑊) & ⊢ 𝐵 = (Base‘𝐹) & ⊢ ∗ = (.r‘𝐹) & ⊢ · = ( ·𝑠 ‘𝑊) & ⊢ × = (.r‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ (𝐴 ∈ 𝐵 ∧ 𝐶 ∈ 𝐵) ∧ (𝑋 ∈ 𝑉 ∧ 𝑌 ∈ 𝑉)) → ((𝐴 · 𝑋) × (𝐶 · 𝑌)) = ((𝐶 ∗ 𝐴) · (𝑋 × 𝑌))) | ||
| Theorem | isassad 19691* | Sufficient condition for being an associative algebra. (Contributed by Mario Carneiro, 5-Dec-2014.) |
| ⊢ (𝜑 → 𝑉 = (Base‘𝑊)) & ⊢ (𝜑 → 𝐹 = (Scalar‘𝑊)) & ⊢ (𝜑 → 𝐵 = (Base‘𝐹)) & ⊢ (𝜑 → · = ( ·𝑠 ‘𝑊)) & ⊢ (𝜑 → × = (.r‘𝑊)) & ⊢ (𝜑 → 𝑊 ∈ LMod) & ⊢ (𝜑 → 𝑊 ∈ Ring) & ⊢ (𝜑 → 𝐹 ∈ CRing) & ⊢ ((𝜑 ∧ (𝑟 ∈ 𝐵 ∧ 𝑥 ∈ 𝑉 ∧ 𝑦 ∈ 𝑉)) → ((𝑟 · 𝑥) × 𝑦) = (𝑟 · (𝑥 × 𝑦))) & ⊢ ((𝜑 ∧ (𝑟 ∈ 𝐵 ∧ 𝑥 ∈ 𝑉 ∧ 𝑦 ∈ 𝑉)) → (𝑥 × (𝑟 · 𝑦)) = (𝑟 · (𝑥 × 𝑦))) ⇒ ⊢ (𝜑 → 𝑊 ∈ AssAlg) | ||
| Theorem | issubassa 19692 | The subalgebras of an associative algebra are exactly the subrings (under the ring multiplication) that are simultaneously subspaces (under the scalar multiplication from the vector space). (Contributed by Mario Carneiro, 7-Jan-2015.) |
| ⊢ 𝑆 = (𝑊 ↾s 𝐴) & ⊢ 𝐿 = (LSubSp‘𝑊) & ⊢ 𝑉 = (Base‘𝑊) & ⊢ 1 = (1r‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ 1 ∈ 𝐴 ∧ 𝐴 ⊆ 𝑉) → (𝑆 ∈ AssAlg ↔ (𝐴 ∈ (SubRing‘𝑊) ∧ 𝐴 ∈ 𝐿))) | ||
| Theorem | sraassa 19693 | The subring algebra over a commutative ring is an associative algebra. (Contributed by Mario Carneiro, 6-Oct-2015.) |
| ⊢ 𝐴 = ((subringAlg ‘𝑊)‘𝑆) ⇒ ⊢ ((𝑊 ∈ CRing ∧ 𝑆 ∈ (SubRing‘𝑊)) → 𝐴 ∈ AssAlg) | ||
| Theorem | rlmassa 19694 | The ring module over a commutative ring is an associative algebra. (Contributed by Mario Carneiro, 6-Oct-2015.) |
| ⊢ (𝑅 ∈ CRing → (ringLMod‘𝑅) ∈ AssAlg) | ||
| Theorem | assapropd 19695* | If two structures have the same components (properties), one is an associative algebra iff the other one is. (Contributed by Mario Carneiro, 8-Feb-2015.) |
| ⊢ (𝜑 → 𝐵 = (Base‘𝐾)) & ⊢ (𝜑 → 𝐵 = (Base‘𝐿)) & ⊢ ((𝜑 ∧ (𝑥 ∈ 𝐵 ∧ 𝑦 ∈ 𝐵)) → (𝑥(+g‘𝐾)𝑦) = (𝑥(+g‘𝐿)𝑦)) & ⊢ ((𝜑 ∧ (𝑥 ∈ 𝐵 ∧ 𝑦 ∈ 𝐵)) → (𝑥(.r‘𝐾)𝑦) = (𝑥(.r‘𝐿)𝑦)) & ⊢ (𝜑 → 𝐹 = (Scalar‘𝐾)) & ⊢ (𝜑 → 𝐹 = (Scalar‘𝐿)) & ⊢ 𝑃 = (Base‘𝐹) & ⊢ ((𝜑 ∧ (𝑥 ∈ 𝑃 ∧ 𝑦 ∈ 𝐵)) → (𝑥( ·𝑠 ‘𝐾)𝑦) = (𝑥( ·𝑠 ‘𝐿)𝑦)) ⇒ ⊢ (𝜑 → (𝐾 ∈ AssAlg ↔ 𝐿 ∈ AssAlg)) | ||
| Theorem | aspval 19696* | Value of the algebraic closure operation inside an associative algebra. (Contributed by Mario Carneiro, 7-Jan-2015.) |
| ⊢ 𝐴 = (AlgSpan‘𝑊) & ⊢ 𝑉 = (Base‘𝑊) & ⊢ 𝐿 = (LSubSp‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ 𝑆 ⊆ 𝑉) → (𝐴‘𝑆) = ∩ {𝑡 ∈ ((SubRing‘𝑊) ∩ 𝐿) ∣ 𝑆 ⊆ 𝑡}) | ||
| Theorem | asplss 19697 | The algebraic span of a set of vectors is a vector subspace. (Contributed by Mario Carneiro, 7-Jan-2015.) |
| ⊢ 𝐴 = (AlgSpan‘𝑊) & ⊢ 𝑉 = (Base‘𝑊) & ⊢ 𝐿 = (LSubSp‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ 𝑆 ⊆ 𝑉) → (𝐴‘𝑆) ∈ 𝐿) | ||
| Theorem | aspid 19698 | The algebraic span of a subalgebra is itself. (spanid 28757 analog.) (Contributed by Mario Carneiro, 7-Jan-2015.) |
| ⊢ 𝐴 = (AlgSpan‘𝑊) & ⊢ 𝑉 = (Base‘𝑊) & ⊢ 𝐿 = (LSubSp‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ 𝑆 ∈ (SubRing‘𝑊) ∧ 𝑆 ∈ 𝐿) → (𝐴‘𝑆) = 𝑆) | ||
| Theorem | aspsubrg 19699 | The algebraic span of a set of vectors is a subring of the algebra. (Contributed by Mario Carneiro, 7-Jan-2015.) |
| ⊢ 𝐴 = (AlgSpan‘𝑊) & ⊢ 𝑉 = (Base‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ 𝑆 ⊆ 𝑉) → (𝐴‘𝑆) ∈ (SubRing‘𝑊)) | ||
| Theorem | aspss 19700 | Span preserves subset ordering. (spanss 28758 analog.) (Contributed by Mario Carneiro, 7-Jan-2015.) |
| ⊢ 𝐴 = (AlgSpan‘𝑊) & ⊢ 𝑉 = (Base‘𝑊) ⇒ ⊢ ((𝑊 ∈ AssAlg ∧ 𝑆 ⊆ 𝑉 ∧ 𝑇 ⊆ 𝑆) → (𝐴‘𝑇) ⊆ (𝐴‘𝑆)) | ||
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