Riemann hypothesis
English edit
Alternative forms edit
Etymology edit
Named after German mathematician Bernhard Riemann (1826–1866), who first formulated and discussed the hypothesis.
Proper noun edit
- (mathematics, mathematical analysis, number theory) The conjecture that the zeros of the Riemann zeta function exist only at the negative even integers and certain complex numbers whose real part is ½.
- The Riemann hypothesis has deep implications about the distribution of prime numbers.
- 1995, John Corning Carey, On Beurling's Approach to the Reimann Hypothesis, University of California, Berkeley, page 43,
- But in the absence of such assumptions, the task of finding functions for which is small is equivalent to proving the Riemann hypothesis, as we will now demonstrate.
- 2003, Marcus du Sautoy, The Music of the Primes, 2004, HarperCollins Publishers (Harper Perennial), page 10,
- A solution of the Riemann Hypothesis will have huge implications for many other mathematical problems.
- 2010, Samuel J. Patterson, The Riemann Hypothesis – a short history, Gerrit Dijk, Masato Wakayama (editors), Casimir Force, Casimir Operators and the Riemann Hypothesis, Walter de Gruyter, page 30,
- The one problem proposed in Riemann's paper which remained unproved, the only one Riemann put forward explicitly as a conjecture, was the Riemann Hypothesis.
- 2021, Naji Arwashan, The Riemann Hypothesis and the Distribution of Prime Numbers, Nova Science Publishers, page x,
- The Riemann Hypothesis is considered by many accounts the single most important and difficult question in math today.
Usage notes edit
- The zeros at the negative even integers are conventionally called trivial. Thus, the hypothesis is often formulated as:
- The real part of every nontrivial zero of the Riemann zeta function is .
Translations edit
conjecture about the zeros of the Riemann zeta function
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