Algorithmic theory of rational numbers: Różnice pomiędzy wersjami
Z Lem
(Utworzono nową stronę "Axioms of ordered field and algorithmic formula saying for all n and m the Euclid's algorithm terminates.") |
|||
Linia 1: | Linia 1: | ||
− | Axioms of ordered field and algorithmic formula saying for all n and m the Euclid's algorithm terminates. | + | '''Theorem'''. Axioms of ordered field and algorithmic formula saying for all n and m the Euclid's algorithm terminates uniquely determine the structure of rational numbers. <br /> |
+ | For the proof consult [AK1] [[Media:Kreczmar-Program-Fields.pdf| {{Cytuj pismo |odn=a | imię=Antoni | nazwisko=Kreczmar |tytuł=Programmability in Fields |czasopismo=Fundamenta Informaticae |strony=195-230 |rok=1977}}]] |
Wersja z 12:10, 2 paź 2018
Theorem. Axioms of ordered field and algorithmic formula saying for all n and m the Euclid's algorithm terminates uniquely determine the structure of rational numbers.
For the proof consult [AK1] Antoni Kreczmar. Programmability in Fields. „Fundamenta Informaticae”, s. 195-230, 1977.