AbstractIn this note we give a proof of the estimate τ(n) = 0(n5σ(n)) for the Ramanujan function τ(n). The proof depends on a double application of the Eichler-Selberg trace formula to the evaluation of the eigenvalues of the Hecke operators
Srinivasa Ramanujan was a brilliant mathematician, considered by George Hardy to be in the same clas...
AbstractThe methods of the two authors on the zeros of zeta and L-functions are compared
In this paper we investigate Ramanujan’s inequality concerning the prime counting function, assertin...
AbstractIn this note we give a proof of the estimate τ(n) = 0(n5σ(n)) for the Ramanujan function τ(n...
Let $Q(n)$ denote the number of integers $1 \leq q \leq n$ whose prime factorization $q= \prod^{t}_{...
Dedicated to T N Shorey on his sixtieth birthday Abstract. We study some arithmetic properties of th...
AbstractIn this paper, we extend the Hardy-Ramanujan-Rademacher formula for p(n), the number of part...
In their famous paper on partitions, Hardy and Ramanujan also raised the question of the behaviour o...
This paper provides a survey of particular values of Ramanujan's theta function φ(q) = ∑ q^(n^2), n ...
summary:A number of properties of a function which originally appeared in a problem proposed by Rama...
An asymptotic formula for p(n), precise enough to give the exact value, was given by Hardy and Raman...
An asymptotic formula for p(n), precise enough to give the exact value, was given by Hardy and Raman...
An asymptotic formula for p(n), precise enough to give the exact value, was given by Hardy and Raman...
An asymptotic formula for p(n), precise enough to give the exact value, was given by Hardy and Raman...
Srinivasa Ramanujan was a brilliant mathematician, considered by George Hardy to be in the same clas...
Srinivasa Ramanujan was a brilliant mathematician, considered by George Hardy to be in the same clas...
AbstractThe methods of the two authors on the zeros of zeta and L-functions are compared
In this paper we investigate Ramanujan’s inequality concerning the prime counting function, assertin...
AbstractIn this note we give a proof of the estimate τ(n) = 0(n5σ(n)) for the Ramanujan function τ(n...
Let $Q(n)$ denote the number of integers $1 \leq q \leq n$ whose prime factorization $q= \prod^{t}_{...
Dedicated to T N Shorey on his sixtieth birthday Abstract. We study some arithmetic properties of th...
AbstractIn this paper, we extend the Hardy-Ramanujan-Rademacher formula for p(n), the number of part...
In their famous paper on partitions, Hardy and Ramanujan also raised the question of the behaviour o...
This paper provides a survey of particular values of Ramanujan's theta function φ(q) = ∑ q^(n^2), n ...
summary:A number of properties of a function which originally appeared in a problem proposed by Rama...
An asymptotic formula for p(n), precise enough to give the exact value, was given by Hardy and Raman...
An asymptotic formula for p(n), precise enough to give the exact value, was given by Hardy and Raman...
An asymptotic formula for p(n), precise enough to give the exact value, was given by Hardy and Raman...
An asymptotic formula for p(n), precise enough to give the exact value, was given by Hardy and Raman...
Srinivasa Ramanujan was a brilliant mathematician, considered by George Hardy to be in the same clas...
Srinivasa Ramanujan was a brilliant mathematician, considered by George Hardy to be in the same clas...
AbstractThe methods of the two authors on the zeros of zeta and L-functions are compared
In this paper we investigate Ramanujan’s inequality concerning the prime counting function, assertin...
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