Converegence of a series leading to an analogue of Ramanujan's assertion on squarefree integers

G. Sudhaamsh Mohan Reddy; S Srinivas Rau; B. Uma

doi:10.5269/bspm.v38i2.34878

Autores/as

G. Sudhaamsh Mohan Reddy ICFAI Foundation for Higher Education Faculty of Science and Technology Department of Mathematics
S Srinivas Rau ICFAI Foundation for Higher Education Faculty of Science and Technology Department of Mathematics
B. Uma CTW, Military College Department of Mathematics

DOI:

https://doi.org/10.5269/bspm.v38i2.34878

Palabras clave:

Dirichlet series, Prime Number Theorem

Resumen

Let d be a squarefree integer. We prove that
(i) Pn
Î¼(n)
n
d(nâ€²) converges to zero, where nâ€² is the product of prime divisors of n
with ( d
n ) = +1. We use the Prime Number Theorem.
(ii) Q( d
p )=+1(1 âˆ’
1
ps ) is not analytic at s=1, nor is Q( d
p )=âˆ’1(1 âˆ’
1
ps ) .
(iii) The convergence (i) leads to a proof that asymptotically half the squarefree ideals have an even number of prime ideal factors (analogue of Ramanujan’s assertion).

Biografía del autor/a

G. Sudhaamsh Mohan Reddy, ICFAI Foundation for Higher Education Faculty of Science and Technology Department of Mathematics

Assistant Professor
Faculty of Science and Technology