Gauss's continued fraction: Difference between revisions
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Latest revision as of 13:25, 17 March 2025
Gauss's continued fraction is a mathematical concept named after the German mathematician Carl Friedrich Gauss, who made significant contributions to various fields including mathematics, statistics, and physics. This particular continued fraction is used in the analysis and representation of functions and has applications in numerical analysis and special functions.
Definition[edit]
Gauss's continued fraction is a representation of a function as an infinite continued fraction. It is particularly used for hypergeometric functions and can be expressed in the form:
\[ f(x) = b_0 + \cfrac{a_1x}{b_1 + \cfrac{a_2x}{b_2 + \cfrac{a_3x}{b_3 + \ddots }}} \]
where \(a_n\) and \(b_n\) are coefficients that depend on the specific function being represented. This form is especially useful for functions that do not have simple series expansions or for which series expansions converge too slowly for practical computation.
Applications[edit]
Gauss's continued fraction finds applications in various areas of mathematics and physics. It is particularly useful in the computation of special functions, such as the Gamma function, Beta function, and Elliptic integrals. These functions are integral in solving problems in quantum physics, statistical distributions, and engineering.
Advantages[edit]
One of the main advantages of using Gauss's continued fraction is its convergence properties. For certain functions, the continued fraction representation converges more rapidly than series expansions, making it a valuable tool for numerical computation. Additionally, it provides a way to approximate functions with a finite number of terms, which can be useful in both theoretical analysis and practical applications.
History[edit]
Carl Friedrich Gauss introduced his continued fraction in the early 19th century as part of his extensive work in mathematics and science. His contributions to continued fractions were part of his broader interest in series and function approximation, which also included the development of the Gaussian distribution in statistics.
See Also[edit]
References[edit]
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