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| Type | Label | Description |
|---|---|---|
| Statement | ||
| Theorem | merco1lem8 1601 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 17-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
      
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| Theorem | merco1lem9 1602 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem10 1603 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem11 1604 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem12 1605 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem13 1606 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem14 1607 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem15 1608 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem16 1609 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem17 1610 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco1lem18 1611 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco1 1590. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | retbwax1 1612 |
tbw-ax1 1577 rederived from merco1 1590.
This theorem, along with retbwax2 1593, retbwax3 1600, and retbwax4 1592, shows that merco1 1590 with ax-mp 5 can be used as a complete axiomatization of propositional calculus. (Contributed by Anthony Hart, 18-Sep-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | merco2 1613 |
A single axiom for propositional calculus offered by Meredith.
This axiom has 19 symbols, sans auxiliaries. See notes in merco1 1590. (Contributed by Anthony Hart, 7-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | mercolem1 1614 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | mercolem2 1615 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | mercolem3 1616 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | mercolem4 1617 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | mercolem5 1618 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | mercolem6 1619 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | mercolem7 1620 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | mercolem8 1621 | Used to rederive the Tarski-Bernays-Wajsberg axioms from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | re1tbw1 1622 | tbw-ax1 1577 rederived from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | re1tbw2 1623 | tbw-ax2 1578 rederived from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | re1tbw3 1624 | tbw-ax3 1579 rederived from merco2 1613. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | re1tbw4 1625 |
tbw-ax4 1580 rederived from merco2 1613.
This theorem, along with re1tbw1 1622, re1tbw2 1623, and re1tbw3 1624, shows that merco2 1613, along with ax-mp 5, can be used as a complete axiomatization of propositional calculus. (Contributed by Anthony Hart, 16-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rb-bijust 1626 | Justification for rb-imdf 1627. (Contributed by Anthony Hart, 17-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rb-imdf 1627 |
The definition of implication, in terms of and .
(Contributed by Anthony Hart, 17-Aug-2011.)
(Proof modification is discouraged.) (New usage is discouraged.)
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| Theorem | anmp 1628 |
Modus ponens for
axiom systems.
(Contributed by Anthony
Hart, 12-Aug-2011.) (Proof modification is discouraged.)
(New usage is discouraged.)
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| Theorem | rb-ax1 1629 | The first of four axioms in the Russell-Bernays axiom system. (Contributed by Anthony Hart, 13-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rb-ax2 1630 | The second of four axioms in the Russell-Bernays axiom system. (Contributed by Anthony Hart, 13-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rb-ax3 1631 | The third of four axioms in the Russell-Bernays axiom system. (Contributed by Anthony Hart, 13-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rb-ax4 1632 | The fourth of four axioms in the Russell-Bernays axiom system. (Contributed by Anthony Hart, 13-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rbsyl 1633 | Used to rederive the Lukasiewicz axioms from Russell-Bernays'. (Contributed by Anthony Hart, 18-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rblem1 1634 | Used to rederive the Lukasiewicz axioms from Russell-Bernays'. (Contributed by Anthony Hart, 18-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rblem2 1635 | Used to rederive the Lukasiewicz axioms from Russell-Bernays'. (Contributed by Anthony Hart, 18-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rblem3 1636 | Used to rederive the Lukasiewicz axioms from Russell-Bernays'. (Contributed by Anthony Hart, 18-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rblem4 1637 | Used to rederive the Lukasiewicz axioms from Russell-Bernays'. (Contributed by Anthony Hart, 18-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rblem5 1638 | Used to rederive the Lukasiewicz axioms from Russell-Bernays'. (Contributed by Anthony Hart, 19-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rblem6 1639 | Used to rederive the Lukasiewicz axioms from Russell-Bernays'. (Contributed by Anthony Hart, 19-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | rblem7 1640 | Used to rederive the Lukasiewicz axioms from Russell-Bernays'. (Contributed by Anthony Hart, 19-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | re1axmp 1641 | ax-mp 5 derived from Russell-Bernays'. (Contributed by Anthony Hart, 19-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | re2luk1 1642 | luk-1 1532 derived from Russell-Bernays'. (Contributed by Anthony Hart, 19-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | re2luk2 1643 | luk-2 1533 derived from Russell-Bernays'. (Contributed by Anthony Hart, 19-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | re2luk3 1644 |
luk-3 1534 derived from Russell-Bernays'.
This theorem, along with re1axmp 1641, re2luk1 1642, and re2luk2 1643 shows that rb-ax1 1629, rb-ax2 1630, rb-ax3 1631, and rb-ax4 1632, along with anmp 1628, can be used as a complete axiomatization of propositional calculus. (Contributed by Anthony Hart, 19-Aug-2011.) (Proof modification is discouraged.) (New usage is discouraged.) |
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The Greek Stoics developed a system of logic called Stoic logic. The Stoic Chrysippus, in particular, was often considered one of the greatest logicians of antiquity. Stoic logic is different from Aristotle's system, since it focuses on propositional logic, though later thinkers did combine the systems of the Stoics with Aristotle. Jan Lukasiewicz reports, "For anybody familiar with mathematical logic it is self-evident that the Stoic dialectic is the ancient form of modern propositional logic" ( On the history of the logic of proposition by Jan Lukasiewicz (1934), translated in: Selected Works - Edited by Ludwik Borkowski - Amsterdam, North-Holland, 1970 pp. 197-217, referenced in "History of Logic" https://www.historyoflogic.com/logic-stoics.htm). In this section we show that the propositional logic system we use (which is non-modal) is at least as strong as the non-modal portion of Stoic logic. We show this by showing that our system assumes or proves all of key features of Stoic logic's non-modal portion (specifically the Stoic logic indemonstrables, themata, and principles). "In terms of contemporary logic, Stoic syllogistic is best understood as a substructural backwards-working Gentzen-style natural-deduction system that consists of five kinds of axiomatic arguments (the indemonstrables) and four inference rules, called themata. An argument is a syllogism precisely if it either is an indemonstrable or can be reduced to one by means of the themata (Diogenes Laertius (D. L. 7.78))." (Ancient Logic, Stanford Encyclopedia of Philosophy https://plato.stanford.edu/entries/logic-ancient/). There are also a few "principles" that support logical reasoning, discussed below. For more information, see "Stoic Logic" by Susanne Bobzien, especially [Bobzien] p. 110-120, especially for a discussion about the themata (including how they were reconstructed and how they were used). There are differences in the systems we can only partly represent, for example, in Stoic logic "truth and falsehood are temporal properties of assertibles... They can belong to an assertible at one time but not at another" ([Bobzien] p. 87). Stoic logic also included various kinds of modalities, which we do not include here since our basic propositional logic does not include modalities. A key part of the Stoic logic system is a set of five "indemonstrables" assigned to Chrysippus of Soli by Diogenes Laertius, though in general it is difficult to assign specific ideas to specific thinkers. The indemonstrables are described in, for example, [Lopez-Astorga] p. 11 , [Sanford] p. 39, and [Hitchcock] p. 5. These indemonstrables are modus ponendo ponens (modus ponens) ax-mp 5, modus tollendo tollens (modus tollens) mto 179, modus ponendo tollens I mptnan 1645, modus ponendo tollens II mptxor 1646, and modus tollendo ponens (exclusive-or version) mtpxor 1648. The first is an axiom, the second is already proved; in this section we prove the other three. Note that modus tollendo ponens mtpxor 1648 originally used exclusive-or, but over time the name modus tollendo ponens has increasingly referred to an inclusive-or variation, which is proved in mtpor 1647. After we prove the indemonstratables, we then prove all the Stoic logic themata (the inference rules of Stoic logic; "thema" is singular). This is straightforward for thema 1 (stoic1a 1649 and stoic1b 1651) and thema 3 (stoic3 1654). However, while Stoic logic was once a leading logic system, most direct information about Stoic logic has since been lost, including the exact texts of thema 2 and thema 4. There are, however, enough references and specific examples to support reconstruction. Themata 2 and 4 have been reconstructed; see statements T2 and T4 in [Bobzien] p. 110-120 and our proofs of them in stoic2a 1652, stoic2b 1653, stoic4a 1655, and stoic4b 1656. Stoic logic also had a set of principles involving assertibles. Statements in [Bobzien] p. 99 express the known principles. The following paragraphs discuss these principles and our proofs of them.
"A principle of double negation, expressed by saying that a
double-negation (Not: not: p) is equivalent to the assertible
that is doubly negated (p) (DL VII 69)." In other words,
"The principle that all conditionals that are formed by using
the same assertible twice (like 'If p, p') are true (Cic. Acad. II 98)."
In other words,
"The principle that all disjunctions formed by a contradiction
(like 'Either p or not: p') are true (S. E. M VIII 282)"
Remember that in Stoic logic, 'or' means 'exclusive or'.
In other words, [Bobzien] p. 99 also suggests that Stoic logic may have dealt with commutativity (see xorcom 1403 and ancom 451) and the principle of contraposition (ax-3 8) (pointing to DL VII 194). In short, the non-modal propositional logic system we use is at least as strong as the non-modal portion of Stoic logic. For more about Aristotle's system, see barbara 2362 and related theorems. | ||
| Theorem | mptnan 1645 | Modus ponendo tollens 1, one of the "indemonstrables" in Stoic logic. See rule 1 on [Lopez-Astorga] p. 12 , rule 1 on [Sanford] p. 40, and rule A3 in [Hitchcock] p. 5. Sanford describes this rule second (after mptxor 1646) as a "safer, and these days much more common" version of modus ponendo tollens because it avoids confusion between inclusive-or and exclusive-or. (Contributed by David A. Wheeler, 3-Jul-2016.) |
![/\](wedge.gif "/\"){kind=small} | ||
| Theorem | mptxor 1646 |
Modus ponendo tollens 2, one of the "indemonstrables" in Stoic logic.
Note that this uses exclusive-or  . See rule 2 on
[Lopez-Astorga] p. 12 , rule 4 on
[Sanford] p. 39 and rule A4 in
[Hitchcock] p. 5 . (Contributed by
David A. Wheeler, 3-Jul-2016.)
(Proof shortened by Wolf Lammen, 12-Nov-2017.) (Proof shortened by BJ,
19-Apr-2019.)
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| Theorem | mtpor 1647 |
Modus tollendo ponens (inclusive-or version), aka disjunctive
syllogism. This is similar to mtpxor 1648, one of the five original
"indemonstrables" in Stoic logic. However, in Stoic logic
this rule
used exclusive-or, while the name modus tollendo ponens often refers to
a variant of the rule that uses inclusive-or instead. The rule says,
"if
is not true, and or (or
both) are true, then
must be
true." An alternative phrasing is, "Once you eliminate
the impossible, whatever remains, no matter how improbable, must be the
truth." -- Sherlock Holmes (Sir Arthur Conan Doyle, 1890: The Sign
of
the Four, ch. 6). (Contributed by David A. Wheeler, 3-Jul-2016.)
(Proof shortened by Wolf Lammen, 11-Nov-2017.)
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| Theorem | mtpxor 1648 |
Modus tollendo ponens (original exclusive-or version), aka disjunctive
syllogism, similar to mtpor 1647, one of the five "indemonstrables"
in
Stoic logic. The rule says, "if is not true, and either
or
(exclusively) are true, then must be true." Today the
name "modus tollendo ponens" often refers to a variant, the
inclusive-or
version as defined in mtpor 1647. See rule 3 on [Lopez-Astorga] p. 12
(note that the "or" is the same as mptxor 1646, that is, it is
exclusive-or df-xor 1401), rule 3 of [Sanford] p. 39 (where it is not as
clearly stated which kind of "or" is used but it appears to be
in the
same sense as mptxor 1646), and rule A5 in [Hitchcock] p. 5 (exclusive-or
is expressly used). (Contributed by David A. Wheeler, 4-Jul-2016.)
(Proof shortened by Wolf Lammen, 11-Nov-2017.) (Proof shortened by BJ,
19-Apr-2019.)
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| Theorem | stoic1a 1649 |
Stoic logic Thema 1 (part a).
The first thema of the four Stoic logic themata, in its basic form, was: "When from two (assertibles) a third follows, then from either of them together with the contradictory of the conclusion the contradictory of the other follows." (Apuleius Int. 209.9-14), see [Bobzien] p. 117 and https://plato.stanford.edu/entries/logic-ancient/ We will represent thema 1 as two very similar rules stoic1a 1649 and stoic1b 1651 to represent each side. (Contributed by David A. Wheeler, 16-Feb-2019.) (Proof shortened by Wolf Lammen, 21-May-2020.) |
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| Theorem | stoic1aOLD 1650 | Obsolete proof of stoic1a 1649 as of 20-May-2020. (Contributed by David A. Wheeler, 16-Feb-2019.) (Proof modification is discouraged.) (New usage is discouraged.) |
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| Theorem | stoic1b 1651 | Stoic logic Thema 1 (part b). The other part of thema 1 of Stoic logic; see stoic1a 1649. (Contributed by David A. Wheeler, 16-Feb-2019.) |
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| Theorem | stoic2a 1652 |
Stoic logic Thema 2 version a. Statement T2 of [Bobzien] p. 117 shows a
reconstructed version of Stoic logic thema 2 as follows: "When
from two
assertibles a third follows, and from the third and one (or both) of the
two another follows, then this other follows from the first two."
Bobzien uses constructs such as  ; in Metamath we will
represent that construct as . This version a is
without the phrase "or both"; see stoic2b 1653 for the version with the
phrase "or both". We already have this rule as syldan 472, so here we
show the equivalence and discourage its use.
(New usage is discouraged.) (Contributed by David A. Wheeler,
17-Feb-2019.)
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| Theorem | stoic2b 1653 | Stoic logic Thema 2 version b. See stoic2a 1652. Version b is with the phrase "or both". We already have this rule as mpd3an3 1361, so here we prove the equivalence and discourage its use. (New usage is discouraged.) (Contributed by David A. Wheeler, 17-Feb-2019.) |
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| Theorem | stoic3 1654 | Stoic logic Thema 3. Statement T3 of [Bobzien] p. 116-117 discusses Stoic logic Thema 3. "When from two (assemblies) a third follows, and from the one that follows (i.e., the third) together with another, external assumption, another follows, then other follows from the first two and the externally co-assumed one. (Simp. Cael. 237.2-4)" (Contributed by David A. Wheeler, 17-Feb-2019.) |
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| Theorem | stoic4a 1655 |
Stoic logic Thema 4 version a. Statement T4 of [Bobzien] p. 117 shows a
reconstructed version of Stoic logic Thema 4: "When from two
assertibles a third follows, and from the third and one (or both) of the
two and one (or more) external assertible(s) another follows, then this
other follows from the first two and the external(s)."
We use |
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| Theorem | stoic4b 1656 | Stoic logic Thema 4 version b. This is version b, which is with the phrase "or both". See stoic4a 1655 for more information. (Contributed by David A. Wheeler, 17-Feb-2019.) |
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Here we extend the language of wffs with predicate calculus, which allows us to talk about individual objects in a domain of discussion (which for us will be the universe of all sets, so we call them "setvar variables") and make true/false statements about predicates, which are relationships between objects, such as whether or not two objects are equal. In addition, we introduce universal quantification ("for all", e.g. ax-4 1676) in order to make statements about whether a wff holds for every object in the domain of discussion. Later we introduce existential quantification ("there exists", df-ex 1658) which is defined in terms of universal quantification. Our axioms are really axiom schemes, and our wff and setvar variables are metavariables ranging over expressions in an underlying "object language." This is explained here: mmset.html#axiomnote. Our axiom system starts with the predicate calculus axiom schemes system S2 of Tarski defined in his 1965 paper, "A Simplified Formalization of Predicate Logic with Identity" [Tarski]. System S2 is defined in the last paragraph on p. 77, and repeated on p. 81 of [KalishMontague]. We do not include scheme B5 (our sp 1914) of system S2 since [KalishMontague] shows it to be logically redundant (Lemma 9, p. 87, which we prove as theorem spw 1861 below). Theorem spw 1861 can be used to prove any instance of sp 1914 having mutually distinct setvar variables and no wff metavariables. However, it seems that sp 1914 in its general form cannot be derived from only Tarski's schemes. We do not include B5 i.e. sp 1914 as part of what we call "Tarski's system" because we want it to be the smallest set of axioms that is logically complete with no redundancies. We later prove sp 1914 as theorem axc5 32434 using the auxiliary axiom schemes that make our system metalogically complete.
Our version of Tarski's system S2 consists of propositional calculus
(ax-mp 5, ax-1 6, ax-2 7, ax-3 8) plus ax-gen 1663, ax-4 1676, ax-5 1752,
ax-6 1798, ax-7 1843, ax-8 1874,
and ax-9 1876. The last three are equality axioms
that represent three sub-schemes of Tarski's scheme B8. Due to its
side-condition ("where Tarski's system is exactly equivalent to the traditional axiom system in most logic textbooks but has the advantage of being easy to manipulate with a computer program, and its simpler metalogic (with no built-in notions of "free variable" and "proper substitution") is arguably easier for a non-logician human to follow step by step in a proof (where "follow" means being able to identify the substitutions that were made, without necessarily a higher-level understanding). In particular, it is logically complete in that it can derive all possible object-language theorems of predicate calculus with equality, i.e. the same theorems as the traditional system can derive. However, for efficiency (and indeed a key feature that makes Metamath successful), our system is designed to derive reusable theorem schemes (rather than object-language theorems) from other schemes. From this "metalogical" point of view, Tarski's S2 is not complete. For example, we cannot derive scheme sp 1914, even though (using spw 1861) we can derive all instances of it that don't involve wff metavariables or bundled setvar variables. (Two setvar variables are "bundled" if they can be substituted with the same setvar variable i.e. do not have a $d distinct variable proviso.) Later we will introduce auxiliary axiom schemes ax-10 1891, ax-11 1896, ax-12 1909, and ax-13 2057 that are metatheorems of Tarski's system (i.e. are logically redundant) but which give our system the property of "metalogical completeness," allowing us to prove directly (instead of, say, by induction on formula length) all possible schemes that can be expressed in our language. | ||
The universal quantifier was introduced above in wal 1435 for use by df-tru 1440. See the comments in that section. In this section, we continue with the first "real" use of it. | ||
| Syntax | wex 1657 | Extend wff definition to include the existential quantifier ("there exists"). |
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| Definition | df-ex 1658 |
Define existential quantification. means
"there exists at
least one set
such that is
true." Definition of [Margaris]
p. 49. (Contributed by NM, 10-Jan-1993.)
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| Theorem | alnex 1659 | Theorem 19.7 of [Margaris] p. 89. (Contributed by NM, 12-Mar-1993.) |
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| Theorem | eximal 1660 |
A utility theorem. An interesting case is when the same formula is
substituted for both and ,
since then both implications
express a type of non-freeness. See also alimex 1697. (Contributed by BJ,
12-May-2019.)
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| Syntax | wnf 1661 | Extend wff definition to include the not-free predicate. |
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| Definition | df-nf 1662 |
Define the not-free predicate for wffs. This is read " is not free
in ".
Not-free means that the value of cannot affect the
value of ,
e.g., any occurrence of in
is effectively
bound by a "for all" or something that expands to one (such as
"there
exists"). In particular, substitution for a variable not free in a
wff
does not affect its value (sbf 2178). An example of where this is used is
stdpc5 1967. See nf2 2020 for an alternative definition which
does not involve
nested quantifiers on the same variable.
Not-free is a commonly used constraint, so it is useful to have a notation for it. Surprisingly, there is no common formal notation for it, so here we devise one. Our definition lets us work with the not-free notion within the logic itself rather than as a metalogical side condition.
To be precise, our definition really means "effectively not
free," because
it is slightly less restrictive than the usual textbook definition for
not-free (which only considers syntactic freedom). For example, This predicate only applies to wffs. See df-nfc 2568 for a not-free predicate for class variables. (Contributed by Mario Carneiro, 11-Aug-2016.) |
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| Axiom | ax-gen 1663 |
Rule of Generalization. The postulated inference rule of predicate
calculus. See e.g. Rule 2 of [Hamilton] p. 74. This rule says that if
something is unconditionally true, then it is true for all values of a
variable. For example, if we have proved  , we can
conclude
or even
 . Theorem allt 31066
shows the
special case  . Theorem spi 1919
shows we can go the other way
also: in other words we can add or remove universal quantifiers from the
beginning of any theorem as required. (Contributed by NM,
3-Jan-1993.)
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| Theorem | gen2 1664 | Generalization applied twice. (Contributed by NM, 30-Apr-1998.) |
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| Theorem | mpg 1665 | Modus ponens combined with generalization. (Contributed by NM, 24-May-1994.) |
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| Theorem | mpgbi 1666 | Modus ponens on biconditional combined with generalization. (Contributed by NM, 24-May-1994.) (Proof shortened by Stefan Allan, 28-Oct-2008.) |
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| Theorem | mpgbir 1667 | Modus ponens on biconditional combined with generalization. (Contributed by NM, 24-May-1994.) (Proof shortened by Stefan Allan, 28-Oct-2008.) |
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| Theorem | nfi 1668 |
Deduce that is not
free in from
the definition.
(Contributed by Mario Carneiro, 11-Aug-2016.)
|
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| Theorem | hbth 1669 |
No variable is (effectively) free in a theorem.
This and later "hypothesis-building" lemmas, with labels
starting
"hb...", allow us to construct proofs of formulas of the form
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| Theorem | nfth 1670 | No variable is (effectively) free in a theorem. (Contributed by Mario Carneiro, 11-Aug-2016.) |
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| Theorem | nftru 1671 | The true constant has no free variables. (This can also be proven in one step with nfv 1755, but this proof does not use ax-5 1752.) (Contributed by Mario Carneiro, 6-Oct-2016.) |
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| Theorem | nex 1672 | Generalization rule for negated wff. (Contributed by NM, 18-May-1994.) |
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| Theorem | nfnth 1673 | No variable is (effectively) free in a non-theorem. (Contributed by Mario Carneiro, 6-Dec-2016.) |
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| Theorem | nffal 1674 | The false constant has no free variables (see nftru 1671). (Contributed by BJ, 6-May-2019.) |
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| Theorem | sptruw 1675 |
Version of sp 1914 when is true. Uses only Tarski's FOL axiom
schemes. (Contributed by NM, 23-Apr-2017.)
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| Axiom | ax-4 1676 | Axiom of Quantified Implication. Axiom C4 of [Monk2] p. 105 and Theorem 19.20 of [Margaris] p. 90. It is restated as alim 1677 for labeling consistency. It should be used only by alim 1677. (Contributed by NM, 21-May-2008.) (New usage is discouraged.) |
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| Theorem | alim 1677 | Restatement of Axiom ax-4 1676, for labeling consistency. It should be the only theorem using ax-4 1676. (Contributed by NM, 10-Jan-1993.) |
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| Theorem | alimi 1678 | Inference quantifying both antecedent and consequent. (Contributed by NM, 5-Jan-1993.) |
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| Theorem | 2alimi 1679 | Inference doubly quantifying both antecedent and consequent. (Contributed by NM, 3-Feb-2005.) |
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| Theorem | al2im 1680 | Closed form of al2imi 1681. Version of ax-4 1676 for a nested implication. (Contributed by Alan Sare, 31-Dec-2011.) |
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| Theorem | al2imi 1681 | Inference quantifying antecedent, nested antecedent, and consequent. (Contributed by NM, 10-Jan-1993.) |
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| Theorem | alanimi 1682 | Variant of al2imi 1681 with conjunctive antecedent. (Contributed by Andrew Salmon, 8-Jun-2011.) |
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| Theorem | alimdh 1683 | Deduction form of Theorem 19.20 of [Margaris] p. 90, see alim 1677. (Contributed by NM, 4-Jan-2002.) |
|
| ||
| Theorem | albi 1684 | Theorem 19.15 of [Margaris] p. 90. (Contributed by NM, 24-Jan-1993.) |
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| Theorem | albii 1685 | Inference adding universal quantifier to both sides of an equivalence. (Contributed by NM, 7-Aug-1994.) |
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| Theorem | 2albii 1686 | Inference adding two universal quantifiers to both sides of an equivalence. (Contributed by NM, 9-Mar-1997.) |
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| Theorem | alrimih 1687 | Inference form of Theorem 19.21 of [Margaris] p. 90. See 19.21 1964 and 19.21h 1966. (Contributed by NM, 9-Jan-1993.) |
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| Theorem | hbxfrbi 1688 | A utility lemma to transfer a bound-variable hypothesis builder into a definition. See hbxfreq 2539 for equality version. (Contributed by Jonathan Ben-Naim, 3-Jun-2011.) |
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| Theorem | nfbii 1689 | Equality theorem for not-free. (Contributed by Mario Carneiro, 11-Aug-2016.) |
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| Theorem | nfxfr 1690 | A utility lemma to transfer a bound-variable hypothesis builder into a definition. (Contributed by Mario Carneiro, 11-Aug-2016.) |
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| Theorem | nfxfrd 1691 | A utility lemma to transfer a bound-variable hypothesis builder into a definition. (Contributed by Mario Carneiro, 24-Sep-2016.) |
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| Theorem | alex 1692 | Theorem 19.6 of [Margaris] p. 89. (Contributed by NM, 12-Mar-1993.) |
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| Theorem | exnal 1693 | Theorem 19.14 of [Margaris] p. 90. (Contributed by NM, 12-Mar-1993.) |
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| Theorem | 2nalexn 1694 | Part of theorem *11.5 in [WhiteheadRussell] p. 164. (Contributed by Andrew Salmon, 24-May-2011.) |
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| Theorem | 2exnaln 1695 | Theorem *11.22 in [WhiteheadRussell] p. 160. (Contributed by Andrew Salmon, 24-May-2011.) |
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| Theorem | 2nexaln 1696 | Theorem *11.25 in [WhiteheadRussell] p. 160. (Contributed by Andrew Salmon, 24-May-2011.) |
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| Theorem | alimex 1697 |
A utility theorem. An interesting case is when the same formula is
substituted for both and ,
since then both implications
express a type of non-freeness. See also eximal 1660. (Contributed by BJ,
12-May-2019.)
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| Theorem | aleximi 1698 |
A variant of al2imi 1681: instead of applying quantifiers to the
final implication, replace them with . A shorter proof is
possible using nfa1 1956, sps 1920 and eximd 1937, but it depends on more
axioms. (Contributed by Wolf Lammen, 18-Aug-2019.)
|
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| Theorem | alexbii 1699 | Biconditional form of aleximi 1698. (Contributed by BJ, 16-Nov-2020.) |
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| Theorem | exim 1700 | Theorem 19.22 of [Margaris] p. 90. (Contributed by NM, 10-Jan-1993.) (Proof shortened by Wolf Lammen, 4-Jul-2014.) |
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