Proofs of five conjectures on matching coefficients of Baruah, Das and Schlosser by an algorithmic approach.

In this paper, we present an algorithm on vanishing coefficients with arithmetic progressions in the sum of two generalized eta-quotients by using the theory of modular forms, and utilize our algorithm to prove five conjectures on matching coefficients in series expansions of certain q -products and their reciprocals. One of which was provided by Baruah and Das, and the others were found by Schlosser. For instance, we prove that for any n ≥ 0 , λ 12 (10 n + r) = λ 12 ′ (10 n + r − 6) , r ∈ { 7 , 9 } , where the sequences { λ 12 (n) } n ≥ 0 and { λ 12 ′ (n) } n ≥ 0 are defined by ∑ n = 0 ∞ λ 12 (n) q n = 1 R (q) R (q 2) R (q 4) R (q 8) = (∑ n = 0 ∞ λ 12 ′ (n) q n) − 1 , and where R (q) is the Rogers–Ramanujan continued fraction, which has the following celebrated product representation: R (q) = ∏ n = 0 ∞ (1 − q 5 n + 1) (1 − q 5 n + 4) (1 − q 5 n + 2) (1 − q 5 n + 3). Finally, we find that this phenomenon also exists in other infinite q -series expansions. [ABSTRACT FROM AUTHOR]