- Source: Tom Brown (mathematician)
Blade (1998)
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Stephen Norrington
John Carter (2012)
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Andrew Stanton
Maze Runner: The Scorch Trials (2015)
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Wes Ball
Live and Let Die (1973)
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Guy Hamilton
Artikel: Tom Brown (mathematician) GudangMovies21 Rebahinxxi
Thomas Craig Brown (born 1938) is an American-Canadian mathematician, Ramsey Theorist, and Professor Emeritus at Simon Fraser University.
Collaborations
As a mathematician, Brown’s primary focus in his research is in the field of Ramsey Theory. When completing his Ph.D., his thesis was 'On Semigroups which are Unions of Periodic Groups' In 1963 as a graduate student, he showed that if the positive integers are finitely colored, then some color class is piece-wise syndetic.
In A Density Version of a Geometric Ramsey Theorem, he and Joe P. Buhler showed that “for every
ε
>
0
{\displaystyle \varepsilon >0}
there is an
n
(
ε
)
{\displaystyle n(\varepsilon )}
such that if
n
=
d
i
m
(
V
)
≥
n
(
ε
)
{\displaystyle n=dim(V)\geq n(\varepsilon )}
then any subset of
V
{\displaystyle V}
with more than
ε
|
V
|
{\displaystyle \varepsilon |V|}
elements must contain 3 collinear points” where
V
{\displaystyle V}
is an
n
{\displaystyle n}
-dimensional affine space over the field with
p
d
{\displaystyle p^{d}}
elements, and
p
≠
2
{\displaystyle p\neq 2}
".
In Descriptions of the characteristic sequence of an irrational, Brown discusses the following idea: Let
α
{\displaystyle \alpha }
be a positive irrational real number. The characteristic sequence of
α
{\displaystyle \alpha }
is
f
(
α
)
=
f
1
f
2
…
{\displaystyle f(\alpha )=f_{1}f_{2}\ldots }
; where
f
n
=
[
(
n
+
1
)
α
]
[
α
]
{\displaystyle f_{n}=[(n+1)\alpha ][\alpha ]}
.” From here he discusses “the various descriptions of the characteristic sequence of α which have appeared in the literature” and refines this description to “obtain a very simple derivation of an arithmetic expression for
[
n
α
]
{\displaystyle [n\alpha ]}
.” He then gives some conclusions regarding the conditions for
[
n
α
]
{\displaystyle [n\alpha ]}
which are equivalent to
f
n
=
1
{\displaystyle f_{n}=1}
.
He has collaborated with Paul Erdős, including Quasi-Progressions and Descending Waves and Quantitative Forms of a Theorem of Hilbert.
References
External links
Archive of papers published by Tom Brown
2003 INTEGERS conference dedicated to Tom Brown