-
Lagarias originally worked in
analytic algebraic number theory. His
later work has been in
theoretical computer science.[citation needed]
Lagarias discovered...
- conjecture: "Mathematics may not be
ready for such problems."
Jeffrey Lagarias stated in 2010 that the
Collatz conjecture "is an
extraordinarily difficult...
- In
number theory, the
Lagarias arithmetic derivative or
number derivative is a
function defined for integers,
based on
prime factorization, by analogy...
- (PhD thesis).
University of Edinburgh. doi:10.7488/ERA/3835.
Dunham 1999.
Lagarias,
Jeffrey C. (October 2013). "Euler's constant: Euler's work and modern...
-
Lagaria (Gr****: Λαγαρία), was an
ancient town of
Magna Graecia in Lucania,
situated between Thurii and the
river Siris (modern Sinni).
According to legend...
- Li, who
presented it in 1997. In 1999,
Enrico Bombieri and
Jeffrey C.
Lagarias provided a generalization,
showing that Li's
positivity condition applies...
- "Algebraic Period". mathworld.wolfram.com.
Retrieved 22
September 2024.
Lagarias,
Jeffrey C. (19 July 2013). "Euler's constant: Euler's work and modern...
- Mahler's
conjecture would thus
imply that Ω(3/2)
exceeds 1/2. Flatto,
Lagarias, and
Pollington showed that Ω ( p q ) > 1 p {\displaystyle \Omega \left({\frac...
- Euler's Constant.
Princeton University Press. ISBN 978-0-691-09983-5.
Lagarias,
Jeffrey C. (2013). "Euler's constant: Euler's work and
modern developments"...
- n}{\log \log n}}}
holds for all n ≥ 3. A
related bound was
given by
Jeffrey Lagarias in 2002, who
proved that the
Riemann hypothesis is
equivalent to the statement...
