Cassini-Catalan Determinants via Ramanujan's Theta Identity

Abstract

In this paper, we show that the classical Cassini and Catalan identities for Fibonacci numbers arise naturally from a single quadratic theta-function identity of Ramanujan. Expanding the identity (q)(q3)=(q4)(q6)+q\,(q2)(q12) via the Jacobi triple product and equating coefficients yields the unified q-determinant Fn+r(q)Fn-r(q)-Fn(q)2=(-q)\,n-rFr(q)2, n r 1, where (q) and (q) are Ramanujan's theta functions with q a complex parameter in the unit disc ( q < 1) and Fn(q) denotes the Carlitz q-Fibonacci polynomials. The radial limit q1- recovers Cassini's formula (r=1) and Catalan's one-parameter extension, while the same derivation with an auxiliary weight produces new partition-refined versions. The argument uses only standard q-series algebra (triple-product expansions, q-Pochhammer cancellations, and coefficient extraction), providing a transparent modular explanation of the alternating sign (-1)\,n-r in Catalan's identity through the level-6 provenance of and . Beyond unifying Cassini Catalan in a single framework, the method lifts seamlessly to higher-order recurrences, giving a template for Tribonacci-type determinants and suggesting congruence phenomena obtained from modular dissections and root-of-unity limits. The results place familiar Fibonacci determinants within Ramanujan's analytic landscape, indicate routes to combinatorial bijections that mirror the analytic cancellations, and connect with themes in modern q-series ranging from colored partition identities to quantum-modular and exactly solvable models thereby highlighting both the explanatory power and the ongoing relevance of Ramanujan's theta identities.