Title :
Induction in Algebra: A First Case Study
Author_Institution :
Pure Math., Univ. of Leeds, Leeds, UK
Abstract :
Many a concrete theorem of abstract algebra admits a short and elegant proof by contradiction but with Zorn\´s Lemma (ZL). A few of these theorems have recently turned out to follow in a direct and elementary way from the Principle of Open Induction distinguished by Raoult. The ideal objects characteristic of any invocation of ZL are eliminated, and it is made possible to pass from classical to intuitionistic logic. If the theorem has finite input data, then a finite partial order carries the required instance of induction, which thus is constructively provable. A typical example is the well-known theorem "every nonconstant coefficient of an invertible polynomial is nilpotent".
Keywords :
algebra; formal logic; abstract algebra; concrete theorem; finite partial order; ideal objects characteristic; intuitionistic logic; invertible polynomial; nonconstant coefficient; open induction; Computer science; Modules (abstract algebra); Polynomials; Set theory; Topology; Hilbert´s Programme; Zorn´s Lemma; constructive algebra; intutionistic logic; open induction;
Conference_Titel :
Logic in Computer Science (LICS), 2012 27th Annual IEEE Symposium on
Conference_Location :
Dubrovnik
Print_ISBN :
978-1-4673-2263-8
DOI :
10.1109/LICS.2012.68
