AbstractBy means of the difference equation on the modified Jacobi theta function, we review the proof of Winquist’s identity due to Kang [S.Y. Kang, A new proof Winquist’s identity, J. Combin. Theory (Series A) 78 (1997) 313–318]. Four related expansion formulae are examined and clarified equivalently in pairs. The recent double series representation for (q;q)∞10 due to Chan [S.H. Chan, Generalized lambert series identities, Proc. London Math. Soc. 91 (3) (2005) 598–622] is exemplified to prove the Ramanujan congruence modulo 11 on the partition function
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
We show that the series expansions of certain $q$-products have \textit{matching coefficients} with ...
AbstractRamanujan recorded additive formulae of theta functions that are related to modular equation...
In his notebooks [9], Ramanujan recorded several values of thetafunctions.B. C. Berndt and L-C. Zhan...
In his notebooks [9], Ramanujan recorded several values of thetafunctions.B. C. Berndt and L-C. Zhan...
AbstractWe establish several new analogues of Ramanujan's exact partition identities using the theor...
AbstractIn 2001, Jinhee Yi found many explicit values of the famous Rogers–Ramanujan continued fract...
In his second notebook, Ramanujan recorded altogether 23 P–Q modular equations involving his theta f...
AbstractIn this paper, we prove a new identity for the product of two partial theta functions. An im...
On pages 338 and 339 in his first notebook (Notebooks (2 volumes), [1957]), Ramanujan records eighte...
AbstractBailey's fundamental identity of bilateral well-poised ψ66-series is utilized to present sho...
Ramanujan in his notebooks, has established several new modular equation which he denoted as P and Q...
AbstractIn this paper, we present three new identities providing relations between Ramanujan–Göllnit...
AbstractLet a and b be positive integers and let p be an odd prime such that p=ax2+by2 for some inte...
AbstractLetN0,4(a;m)≔∫0∞dx(x4+2ax2+1)m+1,a>−1,m∈Nand definePm(a)≔1π2m+3/2(a+1)m+1/2N0,4(a;m).We prov...
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
We show that the series expansions of certain $q$-products have \textit{matching coefficients} with ...
AbstractRamanujan recorded additive formulae of theta functions that are related to modular equation...
In his notebooks [9], Ramanujan recorded several values of thetafunctions.B. C. Berndt and L-C. Zhan...
In his notebooks [9], Ramanujan recorded several values of thetafunctions.B. C. Berndt and L-C. Zhan...
AbstractWe establish several new analogues of Ramanujan's exact partition identities using the theor...
AbstractIn 2001, Jinhee Yi found many explicit values of the famous Rogers–Ramanujan continued fract...
In his second notebook, Ramanujan recorded altogether 23 P–Q modular equations involving his theta f...
AbstractIn this paper, we prove a new identity for the product of two partial theta functions. An im...
On pages 338 and 339 in his first notebook (Notebooks (2 volumes), [1957]), Ramanujan records eighte...
AbstractBailey's fundamental identity of bilateral well-poised ψ66-series is utilized to present sho...
Ramanujan in his notebooks, has established several new modular equation which he denoted as P and Q...
AbstractIn this paper, we present three new identities providing relations between Ramanujan–Göllnit...
AbstractLet a and b be positive integers and let p be an odd prime such that p=ax2+by2 for some inte...
AbstractLetN0,4(a;m)≔∫0∞dx(x4+2ax2+1)m+1,a>−1,m∈Nand definePm(a)≔1π2m+3/2(a+1)m+1/2N0,4(a;m).We prov...
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
We show that the series expansions of certain $q$-products have \textit{matching coefficients} with ...
AbstractRamanujan recorded additive formulae of theta functions that are related to modular equation...