| Giuseppe Melfi | |
| Birth Date: | 11 June 1967 |
| Birth Place: | Uznach, Switzerland |
| Nationality: |  Italy  Switzerland |
| Fields: | Mathematics |
| Workplaces: | University of Neuchâtel University of Applied Sciences Western Switzerland University of Teacher Education BEJUNE |
| Awards: | Premio Ulisse (2010)[1] |
Giuseppe Melfi (June 11, 1967) is an Italo-Swiss mathematician who works on practical numbers and modular forms.
He gained his PhD in mathematics in 1997 at the University of Pisa. After some time spent at the University of Lausanne during 1997-2000, Melfi was appointed at the University of Neuchâtel, as well as at the University of Applied Sciences Western Switzerland and at the local University of Teacher Education.
His major contributions are in the field of practical numbers. This prime-like sequence of numbers is known for having an asymptotic behavior and other distribution properties similar to the sequence of primes. Melfi proved two conjectures both raised in 1984[2] one of which is the corresponding of the Goldbach conjecture for practical numbers: every even number is a sum of two practical numbers. He also proved that there exist infinitely many triples of practical numbers of the form
m-2,m,m+2
Another notable contribution has been in an application of the theory of modular forms, where he found new Ramanujan-type identities for the sum-of-divisor functions. His seven new identities extended the ten other identities found by Ramanujan in 1913.[3] In particular he found the remarkable identity
\sum\stackrel{0<{k\equiv1\bmod3}}\sigma(k)\sigma(n-k)=
| 19\sigma | |
| 3(n) |
forn\equiv2\bmod3
\sigma(n)
n
\sigma3(n)
n
Among other problems in elementary number theory, he is the author of a theorem that allowed him to get a 5328-digit number that has been for a while the largest known primitive weird number.
In applied mathematics his research interests include probability and simulation.