Constructive – Computing Reference – eLook.org


Constructive



<mathematics> A proof that something exists is “constructive” if it provides a method for actually constructing it. Cantor‘s proof that the real numbers are uncountable can be thought of as a *non-constructive* proof that irrational numbers exist.

(There are easy constructive proofs, too; but there are existence theorems with no known constructive proof).

Obviously, all else being equal, constructive proofs are better than non-constructive proofs.

A few mathematicians actually reject *all* non-constructive arguments as invalid; this means, for instance, that the law of the excluded middle (either P or not-P must hold, whatever P is) has to go; this makes proof by contradiction invalid.

See intuitionistic logic for more information on this.

Most mathematicians are perfectly happy with non-constructive proofs; however, the constructive approach is popular in theoretical computer science, both because computer scientists are less given to abstraction than mathematicians and because intuitionistic logic turns out to be the right theory for a theoretical treatment of the foundations of computer science.

< Previous Terms Terms Containing constructive Next Terms >
ConstraintLisp
Constraint Logic Programming
CONSTRAINTS
constraint satisfaction
constructed type
COCOMO
constructive
CSG
CSG-tree
Isabelle
Constructive Cost Model
constructive solid geometry
constructor
Consul
consultant
Read More
2 weeks ago
23
2 weeks ago
13
2 weeks ago
14

New Casinos
Best online casino games on Banger.casino! Play on mobile apps or desktop and win real money. ✓ Get your welcome bonus +125% UP TO €250 right now!

© Copyright 2024 | Elook.org