Age, Biography and Wiki
Helmut Maier was born on 17 October, 1953 in Geislingen_an_der_Steige, Germany. Discover Helmut Maier's Biography, Age, Height, Physical Stats, Dating/Affairs, Family and career updates. Learn How rich is He in this year and how He spends money? Also learn how He earned most of networth at the age of 71 years old?
| Popular As |
N/A |
| Occupation |
N/A |
| Age |
71 years old |
| Zodiac Sign |
Libra |
| Born |
17 October 1953 |
| Birthday |
17 October |
| Birthplace |
Geislingen an der Steige, Germany |
| Nationality |
Germany |
We recommend you to check the complete list of Famous People born on 17 October.
He is a member of famous with the age 71 years old group.
Helmut Maier Height, Weight & Measurements
At 71 years old, Helmut Maier height not available right now. We will update Helmut Maier's Height, weight, Body Measurements, Eye Color, Hair Color, Shoe & Dress size soon as possible.
| Physical Status |
| Height |
Not Available |
| Weight |
Not Available |
| Body Measurements |
Not Available |
| Eye Color |
Not Available |
| Hair Color |
Not Available |
Dating & Relationship status
He is currently single. He is not dating anyone. We don't have much information about He's past relationship and any previous engaged. According to our Database, He has no children.
| Family |
| Parents |
Not Available |
| Wife |
Not Available |
| Sibling |
Not Available |
| Children |
Not Available |
Helmut Maier Net Worth
His net worth has been growing significantly in 2022-2023. So, how much is Helmut Maier worth at the age of 71 years old? Helmut Maier’s income source is mostly from being a successful . He is from Germany. We have estimated
Helmut Maier's net worth
, money, salary, income, and assets.
| Net Worth in 2023 |
$1 Million - $5 Million |
| Salary in 2023 |
Under Review |
| Net Worth in 2022 |
Pending |
| Salary in 2022 |
Under Review |
| House |
Not Available |
| Cars |
Not Available |
| Source of Income |
|
Helmut Maier Social Network
Timeline
After postdoctoral positions at the University of Michigan and the Institute for Advanced Study, Princeton, Maier obtained a permanent position at the University of Georgia. While in Georgia he proved that the usual formulation of the Cramér model for the distribution of prime numbers is wrong. This was a completely unexpected result. Jointly with Carl Pomerance he studied the values of Euler's φ(n) -function and large gaps between primes. During the same period Maier investigated as well the size of the coefficients of cyclotomic polynomials and later collaborated with Sergei Konyagin and E. Wirsing on this topic. He also collaborated with Hugh Lowell Montgomery on the size of the sum of the Möbius function under the assumption of the Riemann Hypothesis. Maier and Gérald Tenenbaum in joint work investigated the sequence of divisors of integers, solving the famous propinquity problem of Paul Erdős. Since 1993 Maier is a Professor at the University of Ulm, Germany.
Maier's Ph.D. thesis was an extension of his paper H. Maier, Chains of large gaps between consecutive primes, Advances in Mathematics, 39 (1981), 257–269. In this paper Maier applied for the first time what is now known as Maier's matrix method. This method later on led him and other mathematicians to the discovery of unexpected irregularities in the distribution of prime numbers. There have been various other applications of Maier's Matrix Method, such as on irreducible polynomials and on strings of consecutive primes in the same residue class.
Helmut Maier graduated with a Diploma in Mathematics from the University of Ulm in 1976, under the supervision of Hans-Egon Richert. He received his Ph.D. from the University of Minnesota in 1981, under the supervision of J. Ian Richards.
Helmut Maier (born 17 October 1953) is a German mathematician and professor at the University of Ulm, Germany. He is known for his contributions in analytic number theory and mathematical analysis and particularly for the so-called Maier's matrix method as well as Maier's theorem for primes in short intervals. He has also done important work in exponential sums and trigonometric sums over special sets of integers and the Riemann zeta function.
