Proof of some conjectures of Z.-W. Sun on the divisibility of certain double-sums
Abstract
Z.-W. Sun introduced three kinds of numbers: align*Sn=Σk=0nn k22k k(2k+1), sn=Σk=0nn k22k k12k-1, align* and Sn+=Σk=0nn k22k k(2k+1)2. In this paper we mainly prove that align* 4Σk=0n-1kSk Σk=0n-1sk Σk=0n-1Sk+ 0n2 n≥slant 1, align* by establishing some binomial coefficient identities, such as align* 4Σk=0n-1kSk=n2Σk=0n-11k+12k k(6kn-1 k2+n-1 kn-1 k+1). align* This confirms several recent conjectures of Z.-W. Sun.
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