Identities for combinatorial sums involving trigonometric functions

Abstract

Let Am,n(a)=Σj=0m (-4)j m+j 2jΣk=0n-1 (a+2kπ/n) 2j(a+2kπ/n) and Bm,n(a)=Σj=0m (-4)j m+j+1 2j+1Σk=0n-1 (a+2kπ/n) 2j+1(a+2kπ/n), where m≥ 0 and n≥ 1 are integers and a is a real number. We present two proofs for the following results: (i) If 2m+1 0 \, (mod \, n), then Am,n(a)=(-1)m n ((2m+1)a). (ii) If 2m+1 0 \, (mod \, n), then Am,n(a)=0. (iii) If 2(m+1) 0 \, (mod \, n), then Bm,n(a)=(-1)m n2 (2(m+1)a). (iv) If 2(m+1) 0 \, (mod \, n), then Bm,n(a)=0.

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