Examples of using Set theory in English and their translations into Serbian
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The discovery of paradoxes in informal set theory caused some to wonder whether mathematics itself is inconsistent,
Sierpinski began to study set theory and in 1909 he gave the first ever lecture course devoted entirely to set theory. .
Basic set theory, having only been invented at the end of the 19th century, is now a
Cartesian product from set theory, but adds additional constraints to these operators.
In addition, the Cartesian product is defined differently from the one in set theory in the sense that tuples are considered to be"shallow" for the purposes of the operation.
Set theory, however, was founded by a single paper in 1874 by Georg Cantor:"On a Property of the Collection of All Real Algebraic Numbers".
In mathematics, axiomatic set theory is a rigorous reformulation of set theory in first-order logic created to address paradoxes in naive set theory….
included is the standard form of axiomatic set theory and as such is the most common foundation of mathematics.
Indeed, in axiomatic set theory, this is taken as the definition of"same number of elements",
Sierpi' nski began to study set theory and in 1909 he gave the first ever lecture course devoted entirely to set theory. .
the main areas of study were set theory and formal logic.
a new axiomatization of set theory(1956).
Sierpiński worked predominantly on set theory, but also on point set topology
Sierpinski began to study set theory and, in 1909, he gave the first ever lecture course devoted entirely to the subject.
the main areas of study were set theory and formal logic.
Quine's Ph.D. thesis and early publications were on formal logic and set theory.
In proof theory and set theory, there is an interest in finitistic consistency proofs,
Among Ackermann's later work are consistency proofs for set theory(1937), full arithmetic(1940)
1887- 23 March 1963)(Swedish pronunciation:) was a Norwegian mathematician who worked in mathematical logic and set theory.
In axiomatic set theory and the branches of logic,