Confluent Hypergeometric Function
Confluent Hypergeometric Function
The confluent hypergeometric function is defined as Φ(a;b;z)=(Γ(b))/(Γ(a)Γ(b-a)) ∫_0^1〖e^zt t^(a-1) 〖(1-t)〗^(b-a-1) dt,0<a<b〗
Confluent Hypergeometric Function
The confluent hypergeometric function is defined as Φ(a;b;z)=(Γ(b))/(Γ(a)Γ(b-a)) ∫_0^1〖e^zt t^(a-1) 〖(1-t)〗^(b-a-1) dt,0<a<b〗