The arithmetization of analysis was a research program in the foundations of mathematics carried out in the second half of the 19th century. Its main proponent was Weierstrass, who argued the geometric foundations of calculus were not solid enough for rigorous work.
The highlights of this research program are:
the algebraic construction of the real numbers by Dedekind, resulting in the modern axiomatic definition of the real number field;
An important spinoff of the arithmetization of analysis is set theory. Naive set theory was created by Cantor and others after arithmetization was completed as a way to study the singularities of functions appearing in calculus.
The arithmetization of analysis had several important consequences:
it motivated the more extreme philosophical position that all of mathematics should be derivable from logic and set theory, ultimately leading to Hilbert's program, Gödel's theorems and non-standard analysis.
Quotations:
"God created the natural numbers, all else is the work of man." -- Kronecker
Analysis is that branch of mathematics which deals with the real numbers and complex numbers and their functions.
The last third of the 19th century saw the arithmetization of analysis by Weierstrass, who thought that geometric reasoning was inherently misleading, and introduced the ε-δ definition of limit.
Complex analysis, the study of functions from the complex plane to the complex plane which are complex differentiable.
The arithmetization of analysis was a research program in the foundations of mathematics carried out in the second half of the 19th century.
An important spinoff of the arithmetization of analysis is set theory.
Naive set theory was created by Cantor and others after arithmetization was completed as a way to study the singularities of functions appearing in calculus.
Feeds |
Contact