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1: 16.4 Argument Unity
It is very well-poised if it is well-poised and a 1 = b 1 + 1 . …
Dixon’s Well-Poised Sum
Rogers–Dougall Very Well-Poised Sum
Dougall’s Very Well-Poised Sum
2: 17.4 Basic Hypergeometric Functions
The series (17.4.1) is said to be well-poised when r = s and … The series (17.4.1) is said to be very-well-poised when r = s , (17.4.11) is satisfied, and …
3: 17.9 Further Transformations of ϕ r r + 1 Functions
Bailey’s Transformation of Very-Well-Poised ϕ 7 8
4: Bibliography M
  • S. C. Milne (1985a) A q -analog of the F 4 5 ( 1 ) summation theorem for hypergeometric series well-poised in 𝑆𝑈 ( n ) . Adv. in Math. 57 (1), pp. 14–33.
  • S. C. Milne (1985d) A q -analog of hypergeometric series well-poised in 𝑆𝑈 ( n ) and invariant G -functions. Adv. in Math. 58 (1), pp. 1–60.