主题
Fox 
-函数是一个非常通用的函数,定义为
![H(z)=H_(p,q)^(m,n)[z|(a_1,alpha_1),...,(a_p,alpha_p); (b_1,beta_1),...,(b_p,beta_p)]
=1/(2pii)int_C(product_(j=1)^(m)Gamma(b_j-beta_is)product_(j=1)^(n)Gamma(1-a_j+alpha_js))/(product_(j=n+1)^(p)Gamma(a_j+alpha_js)product_(j=m+1)^(q)Gamma(1-b_j+beta_js))z^sds,](/images/equations/FoxH-Function/NumberedEquation1.svg) |
其中 
, 
, 
, 并且 
是复数,使得 
的极点 对于 
, 2, ..., 
不与 
的任何极点重合,对于 
, 2, ..., 
(Prudnikov et al. 1990, p. 626)。此外,
是复数
平面中的一条轮廓线,从 
到 
,使得 
和 
分别位于 
的右侧和左侧。
Fox 
-函数在 Wolfram 语言中实现为FoxH.
A. Kilbas 推导出了 
-函数的渐近展开的完整描述。
Fox 
-函数的特殊情况包括
![H_(2P+1)^1(z^i,c|(0,i); (1-a_j,i)_(P+1),(b_j-i)_P)=(_(p+1)F_P((a)_(P+1);(b)_P;(-1)^Pz))/(isgn(I[z])product_(j=1)^(P+1)Gamma(1-a_j)product_(j=1)^(P)Gamma(b)_j),](/images/equations/FoxH-Function/NumberedEquation2.svg) |
对于 
, ..., 
, 
, ..., 
复数,使得 ![sum_(j=1)^(P+1)R[a_j]<sum_(j=1)^(P)Re[b_j]](/images/equations/FoxH-Function/Inline26.svg)
, 
, ![sgn(c)=sgn(I[z])](/images/equations/FoxH-Function/Inline28.svg)
, 并且 
是一个广义超几何函数 (Al-Musallam et al. 2001b)。
-Function with Complex Parameters I: Existence." Int. J. Math. Math. Sci. 25, 571-586, 2001a.Al-Musallam, F. A. and Tuan, V. K. "
-Function with Complex Parameters II: Evaluation." Int. J. Math. Math. Sci. 25, 727-743, 2001b.Buschman, R. G. "
-Functions of Two Variables, I." Indian J. Math. 20, 139-153, 1978.Buschman, R. G. "Analytic Domains for Multivariable 
-Functions." Pure Appl. Math. Sci. 16, 23-27, 1982.Carter, B. D. and Springer, M. D. "The Distribution of Products, Quotients, and Powers of Independent 
-Functions." SIAM J. Appl. Math. 33, 542-558, 1977.Fox, C. "The 
and 
-Functions as Symmetrical Fourier Kernels." Trans. Amer. Math. Soc. 98, 395-429, 1961.Hai, N.; Marichev, O. I.; and Buschman, R. G. "Theory of the General 
-Function of Two Variables." Rocky Mtn. J. Math. 22, 1317-1327, 1992.Mathai, A. M. and Saxena, R. K. The 
-Function with Applications in Statistics and Other Disciplines.0470263806 New Delhi, India: Wiley, 1978.Prudnikov, A. P.; Brychkov, Yu. A.; and Marichev, O. I. "Evaluation of Integrals and the Mellin Transform." Itogi Nauki i Tekhniki, Seriya Matemat. Analiz 27, 3-146, 1989.Prudnikov, A. P.; Marichev, O. I.; and Brychkov, Yu. A. "The Fox 
-Function ![H_(pq)^(mn)[z|[a_p,A_p]; [b_p,B_p]]](/images/equations/FoxH-Function/Inline40.svg)
." §8.3 in Integrals and Series, Vol. 3: More Special Functions. Newark, NJ: Gordon and Breach, pp. 626-629, 1990.Srivastava, H. M.; Gupta, K. C.; 和 Goyal, S. P. The 
-Function of One and Two Variables with Applications. 新德里,印度:South Asian Publ.,1982 年。
Yakubovich, S. B. 和 Luchko, Y. F. The Hypergeometric Approach to Integral Transforms and Convolutions. 阿姆斯特丹,荷兰:Kluwer,1994 年。
Weisstein, Eric W. “Fox H 函数。” 来自 —— 资源。 https://mathworld.net.cn/FoxH-Function.html