Special Functions

special functions

[′spesh·əl ′fəŋk·shənz] (mathematics) The various families of solution functions corresponding to cases of the hypergeometric equation or functions used in the equation's study, such as the gamma function.

Special Functions

in mathematics, functions belonging to various special classes that are encountered particularly often in solving problems in mathematical physics. The principal special functions are solutions of second-order linear differential equations with variable coefficients. Examples of important special functions are the hypergeometric functions, cylindrical functions, spherical functions, solid spherical harmonics, Lamé functions, and Mathieu functions. Transcendental functions that cannot be expressed in terms of elementary functions are sometimes also called special functions. Such transcendental functions include elliptic functions, the gamma function, the zeta function, the logarithmic integral, and the error function.

REFERENCES

Smirnov, V. I. Kurs vysshei matematiki, 8th ed., vol. 3, part 2. Moscow, 1969.
Whittaker, E. T., and G. N. Watson. Kurs sovremennogo analiza, 2nd ed., part 2. Moscow, 1963. (Translated from English.)
Jahnke, E , F. Emde, and F. Lósch. Spetsial’nye funktsii: Formuly,grafiki, mblitsy, 2nd ed. Moscow, 1968. (Translated from German; contains bibliography. )

单词	special functions
释义	Special Functions special functions [′spesh·əl ′fəŋk·shənz] (mathematics) The various families of solution functions corresponding to cases of the hypergeometric equation or functions used in the equation's study, such as the gamma function. Special Functions in mathematics, functions belonging to various special classes that are encountered particularly often in solving problems in mathematical physics. The principal special functions are solutions of second-order linear differential equations with variable coefficients. Examples of important special functions are the hypergeometric functions, cylindrical functions, spherical functions, solid spherical harmonics, Lamé functions, and Mathieu functions. Transcendental functions that cannot be expressed in terms of elementary functions are sometimes also called special functions. Such transcendental functions include elliptic functions, the gamma function, the zeta function, the logarithmic integral, and the error function. REFERENCES Smirnov, V. I. Kurs vysshei matematiki, 8th ed., vol. 3, part 2. Moscow, 1969. Whittaker, E. T., and G. N. Watson. Kurs sovremennogo analiza, 2nd ed., part 2. Moscow, 1963. (Translated from English.) Jahnke, E , F. Emde, and F. Lósch. Spetsial’nye funktsii: Formuly,grafiki, mblitsy, 2nd ed. Moscow, 1968. (Translated from German; contains bibliography. )
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