New series involving binomial coefficients (III)

Abstract

We evaluate some series with summands involving a single binomial coefficient 6k3k. For example, we prove that Σk=0∞(63k2+78k+22)8k(2k+1)(6k+1)(6k+5)6k3k=3π2. Motivated by Galois theory, we introduce the so-called Duality Principle for irrational series of Ramanujan's type or Zeilberger's type, and apply it to find 26 new irrational series identities. For example, we conjecture that align*&Σk=1∞(32(9133-523))kk32kk23kk ((9133+891)k-3333-225) \\&=320(11333L-11(2)-27L-3(2)), align* where Ld(2)=Σk=1∞(dk)k2 for any integer d0,14 with (dk) the Kronecker symbol.