Gowers' theorem

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In mathematics, Gowers' theorem, also known as Gowers' Ramsey theorem and Gowers' FIN_k theorem, is a theorem in Ramsey theory and combinatorics. It is a Ramsey-theoretic result about functions with finite support. Timothy Gowers originally proved the result in 1992,^[1] motivated by a problem regarding Banach spaces. The result was subsequently generalised by Bartošová, Kwiatkowska,^[2] and Lupini.^[3]

Definitions[edit]

The presentation and notation is taken from Todorčević,^[4] and is different to that originally given by Gowers.

For a function ${\displaystyle f\colon \mathbb {N} \to \mathbb {N} }$, the support of ${\displaystyle f}$ is defined ${\displaystyle \operatorname {supp} (f)=\{n:f(n)\neq 0\}}$. Given ${\displaystyle k\in \mathbb {N} }$, let ${\displaystyle \mathrm {FIN} _{k}}$ be the set

${\displaystyle \mathrm {FIN} _{k}={\big \{}f\colon \mathbb {N} \to \mathbb {N} \mid \operatorname {supp} (f){\text{ is finite and }}\max(\operatorname {range} (f))=k{\big \}}}$

If ${\displaystyle f\in \mathrm {FIN} _{n}}$, ${\displaystyle g\in \mathrm {FIN} _{m}}$ have disjoint supports, we define ${\displaystyle f+g\in \mathrm {FIN} _{k}}$ to be their pointwise sum, where ${\displaystyle k=\max\{n,m\}}$. Each ${\displaystyle \mathrm {FIN} _{k}}$ is a partial semigroup under ${\displaystyle +}$.

The tetris operation ${\displaystyle T\colon \mathrm {FIN} _{k+1}\to \mathrm {FIN} _{k}}$ is defined ${\displaystyle T(f)(n)=\max\{0,f(n)-1\}}$. Intuitively, if ${\displaystyle f}$ is represented as a pile of square blocks, where the ${\displaystyle n}$th column has height ${\displaystyle f(n)}$, then ${\displaystyle T(f)}$ is the result of removing the bottom row. The name is in analogy with the video game. ${\displaystyle T^{(k)}}$ denotes the ${\displaystyle k}$th iterate of ${\displaystyle T}$.

A block sequence ${\displaystyle (f_{n})}$ in ${\displaystyle \mathrm {FIN} _{k}}$ is one such that ${\displaystyle \max(\operatorname {supp} (f_{m}))<\min(\operatorname {supp} (f_{m+1}))}$ for every ${\displaystyle m}$.

The theorem[edit]

Note that, for a block sequence ${\displaystyle (f_{n})}$, numbers ${\displaystyle k_{1},\ldots ,k_{n}}$ and indices ${\displaystyle m_{1}<\cdots <m_{n}}$, the sum ${\displaystyle T^{(k_{1})}(f_{m_{1}})+\cdots +T^{(k_{n})}(f_{m_{n}})}$ is always defined. Gowers' original theorem states that, for any finite colouring of ${\displaystyle \mathrm {FIN} _{k}}$, there is a block sequence ${\displaystyle (f_{n})}$ such that all elements of the form ${\displaystyle T^{(k_{1})}(f_{m_{1}})+\cdots +T^{(k_{n})}(f_{m_{n}})}$ have the same colour.

The standard proof uses ultrafilters,^[1][4] or equivalently, nonstandard arithmetic.^[5]

Generalisation[edit]

Intuitively, the tetris operation can be seen as removing the bottom row of a pile of boxes. It is natural to ask what would happen if we tried removing different rows. Bartošová and Kwiatkowska^[2] considered the wider class of generalised tetris operations, where we can remove any chosen subset of the rows.

Formally, let ${\displaystyle F\colon \mathbb {N} \to \mathbb {N} }$ be a nondecreasing surjection. The induced tetris operation ${\displaystyle {\hat {F}}\colon \mathrm {FIN} _{k}\to \mathrm {FIN} _{F(k)}}$ is given by composition with ${\displaystyle F}$, i.e. ${\displaystyle {\hat {F}}(f)(n)=F(f(n))}$. The generalised tetris operations are the collection of ${\displaystyle {\hat {F}}}$ for all nondecreasing surjections ${\displaystyle F\colon \mathbb {N} \to \mathbb {N} }$. In this language, the original tetris operation is induced by the map ${\displaystyle T\colon n\mapsto \max\{n-1,0\}}$.

Bartošová and Kwiatkowska^[2] showed that the finite version of Gowers' theorem holds for the collection of generalised tetris operations. Lupini^[3] later extended this result to the infinite case.

References[edit]