Difference between revisions of "Logical consequence"

Latest revision as of 21:24, 8 December 2016

of a given set of premises

A proposition that is true for any interpretation of the non-logical symbols (that is, the names (cf. Name) of objects, functions, predicates) for which the premises are true. If a proposition $A$ is a logical consequence of a set of propositions $\Gamma$ , one says that $\Gamma$ logically implies $A$ , or that $A$ follows logically from $\Gamma$ .

If $\Gamma$ is a set of statements of a formalized first-order logico-mathematical language (cf. Logico-mathematical calculus) and $A$ is a proposition of this language, then the relation " $A$ is a logical consequence of $\Gamma$ " means that any model for $\Gamma$ is a model for $A$ . This relation is denoted by $\Gamma\vDash A$ . The Gödel completeness theorem of classical predicate calculus implies that the relation $\Gamma\vDash A$ coincides with the relation $\Gamma\vdash A$ , that is, $\Gamma\vDash A$ if and only if $A$ is deducible from $\Gamma$ by the methods of classical predicate calculus.

References

[1]	H. Rasiowa, "The mathematics of metamathematics" , Polska Akad. Nauk (1963)
[2]	K. Gödel, "Die Vollständigkeit der Axiome des logischen Funktionenkalküls" Monatsh. Math. Phys. , 37 (1930) pp. 349–360

Comments

The phrase "semantic entailment" is sometimes used instead of "logical consequence"; thus, the expression $\Gamma\vDash A$ is read as " $\Gamma$ semantically entails $A$ " . The expression $\Gamma\vdash A$ is similarly read as " $\Gamma$ syntactically entails $A$ " .

References

[a1]	P.T. Johnstone, "Notes on logic and set theory" , Cambridge Univ. Press (1987)
[a2]	A. Grzegorczyk, "An outline of mathematical logic" , Reidel (1974)

How to Cite This Entry:
Logical consequence. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Logical_consequence&oldid=31698

This article was adapted from an original article by V.E. Plisko (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article

@@ Line 2: / Line 2: @@
 ''of a given set of premises''
-A proposition that is true for any interpretation of the non-logical symbols (that is, the names (cf. [[Name|Name]]) of objects, functions, predicates) for which the premises are true. If a proposition  $A$  is a logical consequence of a set of propositions  $\Gamma$ , one says that  $\Gamma$  logically implies  $A$ , or that  $A$  follows logically from  $\Gamma$ .
+A proposition that is true for any interpretation of the non-logical symbols (that is, the names (cf. [[Name]]) of objects, functions, predicates) for which the premises are true. If a proposition  $A$  is a logical consequence of a set of propositions  $\Gamma$ , one says that  $\Gamma$  logically implies  $A$ , or that  $A$  follows logically from  $\Gamma$ .
-If  $\Gamma$  is a set of statements of a formalized first-order logico-mathematical language (cf. [[Logico-mathematical calculus|Logico-mathematical calculus]]) and  $A$  is a proposition of this language, then the relation  "A is a logical consequence of G"  means that any model for  $\Gamma$  is a model for  $A$ . This relation is denoted by  $\Gamma\vDash A$ . The [[Gödel completeness theorem|Gödel completeness theorem]] of classical predicate calculus implies that the relation  $\Gamma\vDash A$  coincides with the relation  $\Gamma\vdash A$ , that is,  $\Gamma\vDash A$  if and only if  $A$  is deducible from  $\Gamma$  by the methods of classical predicate calculus.
+If  $\Gamma$  is a set of statements of a formalized first-order logico-mathematical language (cf. [[Logico-mathematical calculus]]) and  $A$  is a proposition of this language, then the relation  "$A$ is a logical consequence of  $\Gamma$ "  means that any model for  $\Gamma$  is a model for  $A$ . This relation is denoted by  $\Gamma\vDash A$ . The [[Gödel completeness theorem]] of classical predicate calculus implies that the relation  $\Gamma\vDash A$  coincides with the relation  $\Gamma\vdash A$ , that is,  $\Gamma\vDash A$  if and only if  $A$  is deducible from  $\Gamma$  by the methods of classical predicate calculus.
 ====References====
-<table><TR><TD valign="top">[1]</TD> <TD valign="top">  H. Rasiowa,   "The mathematics of metamathematics" , Polska Akad. Nauk  (1963)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top">  K. Gödel,   "Die Vollständigkeit der Axiome des logischen Funktionenkalküls"  ''Monatsh. Math. Phys.'' , '''37'''  (1930)  pp. 349–360</TD></TR></table>
+<table>
+<TR><TD valign="top">[1]</TD> <TD valign="top">  H. Rasiowa,   "The mathematics of metamathematics" , Polska Akad. Nauk  (1963)</TD></TR>
+<TR><TD valign="top">[2]</TD> <TD valign="top">  K. Gödel,   "Die Vollständigkeit der Axiome des logischen Funktionenkalküls"  ''Monatsh. Math. Phys.'' , '''37'''  (1930)  pp. 349–360</TD></TR>
+</table>
 ====Comments====
-The phrase  "semantic entailment"  is sometimes used instead of  "logical consequence" ; thus, the expression  $\Gamma\vDash A$  is read as  "G semantically entails A" . The expression  $\Gamma\vdash A$  is similarly read as  "G syntactically entails A" .
+The phrase  "semantic entailment"  is sometimes used instead of  "logical consequence"; thus, the expression  $\Gamma\vDash A$  is read as  " $\Gamma$  semantically entails $A$" . The expression  $\Gamma\vdash A$  is similarly read as  " $\Gamma$  syntactically entails $A$" .
 ====References====
-<table><TR><TD valign="top">[a1]</TD> <TD valign="top">  P.T. Johnstone,   "Notes on logic and set theory" , Cambridge Univ. Press  (1987)</TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top">  A. Grzegorczyk,   "An outline of mathematical logic" , Reidel  (1974)</TD></TR></table>
+<table>
+<TR><TD valign="top">[a1]</TD> <TD valign="top">  P.T. Johnstone,   "Notes on logic and set theory" , Cambridge Univ. Press  (1987)</TD></TR>
+<TR><TD valign="top">[a2]</TD> <TD valign="top">  A. Grzegorczyk,   "An outline of mathematical logic" , Reidel  (1974)</TD></TR>
+</table>

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Difference between revisions of "Logical consequence"

Latest revision as of 21:24, 8 December 2016

References

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References