Add to ORKGABSTRACT. The present paper is a fragment revised from the work [3], published only in Romanian. Using a new function, “cubic combination”, we can solve different problems. The novelty of this work consists in the deduction of an infinite number of third degree Ramanujan identities
Abstract: If the Ramanujan cubic continued fraction (or its reciprocal) is expanded as a power serie...
In 1914 S. Ramanujan recorded a list of 17 series for 1/π. We survey the methods of proofs of Ramanu...
AbstractIn a handwritten manuscript published with his lost notebook, Ramanujan stated without proof...
Abstract. In this paper, we give a new proof for two identities involving Ramanujan’s cubic continue...
AbstractUsing certain representations for Eisenstein series, we derive several of Ramanujan's series...
There is a beautiful cubic analogue of Jacobi's fundamental theta function identity: θ⁴₃ = θ⁴₄ + θ⁴₂...
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
Srinivasa Ramanujan (1887-1920) was one of the world's greatest mathematical geniuses. He work exten...
In this paper, first we establish some new relations for ratios of Ramanujan's theta functions. We a...
. Many remarkable cubic theorems involving theta functions can be found in Ramanujan's Lost Not...
This paper contains an explanation of Ramanujan-type formulas with cubic radicals of cubic irration...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
In this paper, we derive new Ramanujan-type series for 1/pi which belong to “Ramanujan’s theory of e...
In the “lost notebook ” [6, page 341], Ramanujan records the following remarkable identity. If the s...
On page 366 of his lost notebook 15, Ramanujan recorded a cubic contin- ued fraction and several the...
Abstract: If the Ramanujan cubic continued fraction (or its reciprocal) is expanded as a power serie...
In 1914 S. Ramanujan recorded a list of 17 series for 1/π. We survey the methods of proofs of Ramanu...
AbstractIn a handwritten manuscript published with his lost notebook, Ramanujan stated without proof...
Abstract. In this paper, we give a new proof for two identities involving Ramanujan’s cubic continue...
AbstractUsing certain representations for Eisenstein series, we derive several of Ramanujan's series...
There is a beautiful cubic analogue of Jacobi's fundamental theta function identity: θ⁴₃ = θ⁴₄ + θ⁴₂...
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
Srinivasa Ramanujan (1887-1920) was one of the world's greatest mathematical geniuses. He work exten...
In this paper, first we establish some new relations for ratios of Ramanujan's theta functions. We a...
. Many remarkable cubic theorems involving theta functions can be found in Ramanujan's Lost Not...
This paper contains an explanation of Ramanujan-type formulas with cubic radicals of cubic irration...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
In this paper, we derive new Ramanujan-type series for 1/pi which belong to “Ramanujan’s theory of e...
In the “lost notebook ” [6, page 341], Ramanujan records the following remarkable identity. If the s...
On page 366 of his lost notebook 15, Ramanujan recorded a cubic contin- ued fraction and several the...
Abstract: If the Ramanujan cubic continued fraction (or its reciprocal) is expanded as a power serie...
In 1914 S. Ramanujan recorded a list of 17 series for 1/π. We survey the methods of proofs of Ramanu...
AbstractIn a handwritten manuscript published with his lost notebook, Ramanujan stated without proof...