Proof of a conjecture of Baruah and Sarma on sign patterns of certain infinite products

Abstract

Let \[ Σn=0∞A(n)qn := (q2;q5)∞5(q3;q5)∞5(q;q5)∞5(q4;q5)∞5, \] \[ Σn=0∞ B(n)qn := (q;q5)∞5 (q4;q5)∞5 (q2;q5)∞5(q3; q5)∞5, \] and \[ Σn=0∞ D(n)qn := (q5;q25)∞(q20; q25)∞ (q10;q25)∞(q15; q25)∞ (q2; q5)∞5(q3;q5)∞5 (q;q5)∞5 (q4;q5)∞5 \] where (a;q)∞ := Πk=0∞(1-aqk) and |q|<1. These sequences are closely related to the celebrated Rogers-Ramanujan continued fraction. In this paper, we study the sign behavior o of the coefficients A(n),B(n) and D(n). We prove that for all integers n≥0, align* A(5n)<0(n≠0), B(5n) < 0(n≠0), D(5n+1)>0. align* This confirms a recent conjecture of Baruah and Sarma. Our proof is different from the previous method of Baruah and Sarma, and combines asymptotic coefficient analysis with symbolic computation for finite case verification.

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