Add to ORKGIn 1914 S. Ramanujan recorded a list of 17 series for 1/π. We survey the methods of proofs of Ramanujan's formulae and indicate recently discovered generalizations, some of which are not yet proven
Abstract. In this paper, we give a new proof for two identities involving Ramanujan’s cubic continue...
. We state and prove a claim of Ramanujan. As a consequence, a large new class of Saalschutzian hype...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
AbstractIn this article, we construct a general series for 1π. We indicate that Ramanujan's 1π-serie...
AbstractUsing certain representations for Eisenstein series, we derive several of Ramanujan's series...
Srinivasa Ramanujan (1887-1920) was one of the world's greatest mathematical geniuses. He work exten...
We resolve a family of recently observed identities involving 1/π using the theory of modular forms ...
ABSTRACT Srinivasa Ramanujan had established several hypergeometric series for the number 1/π out of...
There is a class of remarkable series for 1/π of the form [formula could not be replicated] where A,...
We compute Ramanujan–Sato series systematically in terms of Thompson series and their modular equati...
We outline an elementary method for proving numerical hypergeometric identities, in particular, Rama...
AbstractUsing some properties of the general rising shifted factorial and the gamma function we deri...
AbstractThe Ramanujan polynomials were introduced by Ramanujan in his study of power series inversio...
AbstractIn a handwritten manuscript published with his lost notebook, Ramanujan stated without proof...
AbstractIn this paper we find the formula (7) which generalizes the Ramanujan formula (2)
Abstract. In this paper, we give a new proof for two identities involving Ramanujan’s cubic continue...
. We state and prove a claim of Ramanujan. As a consequence, a large new class of Saalschutzian hype...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
AbstractIn this article, we construct a general series for 1π. We indicate that Ramanujan's 1π-serie...
AbstractUsing certain representations for Eisenstein series, we derive several of Ramanujan's series...
Srinivasa Ramanujan (1887-1920) was one of the world's greatest mathematical geniuses. He work exten...
We resolve a family of recently observed identities involving 1/π using the theory of modular forms ...
ABSTRACT Srinivasa Ramanujan had established several hypergeometric series for the number 1/π out of...
There is a class of remarkable series for 1/π of the form [formula could not be replicated] where A,...
We compute Ramanujan–Sato series systematically in terms of Thompson series and their modular equati...
We outline an elementary method for proving numerical hypergeometric identities, in particular, Rama...
AbstractUsing some properties of the general rising shifted factorial and the gamma function we deri...
AbstractThe Ramanujan polynomials were introduced by Ramanujan in his study of power series inversio...
AbstractIn a handwritten manuscript published with his lost notebook, Ramanujan stated without proof...
AbstractIn this paper we find the formula (7) which generalizes the Ramanujan formula (2)
Abstract. In this paper, we give a new proof for two identities involving Ramanujan’s cubic continue...
. We state and prove a claim of Ramanujan. As a consequence, a large new class of Saalschutzian hype...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...