Generalized Hypergeometric FunctionsThis monograph by one of the foremost experts on hypergeometric functions is concerned with the Boyarsky principle, developing a theory which is broad enough to encompass several of the most important hypergeometric functions. |
Contents
INTRODUCTION | 1 |
MULTIPLICATION BY X GAUSS CONTIGUITY | 15 |
ALGEBRAIC THEORY | 16 |
Copyright | |
21 other sections not shown
Common terms and phrases
a₁ a₂ algebraic analytic assertion assume B₁ C₁ Chapter choose coefficients commutative diagram completes the proof conclude condition Corollary deduce define definition denote det(I differential dimension dual Dwork element endomorphism equation exists factors finite follows g₁ gamma function gauss gauss sums H₁ H₂ hence hypergeometric functions hypothesis implies independent induces integral irreducible isomorphism Jacobi sums K₁ Laplace transform Lemma lies linear forms M₁ matrix monomials multiplication n₁ n₂ natural map notation operator ord(a p-adic p₁ polar locus Proposition R-sequence rational function reduced relative replaced resp right side ring S₁ S₂ satisfies 2.6 semigroup shows space subring subset surjective trivial u₁ Uk+i variables verify Ŵ₁ Wa-u write X₁ Y₁ zero θλι λ₁