Komlós–Major–Tusnády approximation

In probability theory, the Komlós–Major–Tusnády approximation (also known as the KMT approximation, the KMT embedding, or the Hungarian embedding) refers to one of the two strong embedding theorems: 1) approximation of random walk by a standard Brownian motion constructed on the same probability space, and 2) an approximation of the empirical process by a Brownian bridge constructed on the same probability space. It is named after Hungarian mathematicians János Komlós, Gábor Tusnády, and Péter Major, who proved it in 1975.

Let ${\displaystyle U_1,U_2,\dots }$ be independent uniform (0,1) random variables. Define a uniform empirical distribution function as

${\displaystyle F_{U,n}(t)=\frac{1}{n}{\displaystyle \sum _{i=1}^n}{\mathrm{𝟏}}_{U_i\le t},t\in [0,1].}$

Define a uniform empirical process as

${\displaystyle {\alpha }_{U,n}(t)=\sqrt{n}(F_{U,n}(t)-t),t\in [0,1].}$

The Donsker theorem (1952) shows that ${\displaystyle {\alpha }_{U,n}(t)}$ converges in law to a Brownian bridge ${\displaystyle B(t).}$ Komlós, Major and Tusnády established a sharp bound for the speed of this weak convergence.

Theorem (KMT, 1975) On a suitable probability space for independent uniform (0,1) r.v. ${\displaystyle U_1,U_2\dots }$ the empirical process ${\displaystyle \{{\alpha }_{U,n}(t),0\le t\le 1\}}$ can be approximated by a sequence of Brownian bridges ${\displaystyle \{B_n(t),0\le t\le 1\}}$ such that

${\displaystyle P\{\underset{0\le t\le 1}{\sup }|{\alpha }_{U,n}(t)-B_n(t)|>\frac{1}{\sqrt{n}}(a\log n+x)\}\le b{e}^{-cx}}$

for all positive integers n and all ${\displaystyle x>0}$, where a, b, and c are positive constants.

A corollary of that theorem is that for any real iid r.v. ${\displaystyle X_1,X_2,\dots ,}$ with cdf ${\displaystyle F(t),}$ it is possible to construct a probability space where independentTemplate:Clarify sequences of empirical processes ${\displaystyle {\alpha }_{X,n}(t)=\sqrt{n}(F_{X,n}(t)-F(t))}$ and Gaussian processes ${\displaystyle G_{F,n}(t)=B_n(F(t))}$ exist such that

${\displaystyle \underset{n\to \mathrm{\infty }}{\mathrm{lim\; sup}}\frac{\sqrt{n}}{\ln n}\Vert {\alpha }_{X,n}-G_{F,n}{\Vert }_{\mathrm{\infty }}<\mathrm{\infty },}$     almost surely.

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• Komlos, J., Major, P. and Tusnady, G. (1975) An approximation of partial sums of independent rv’s and the sample df. I, Wahrsch verw Gebiete/Probability Theory and Related Fields, 32, 111–131. Template:Doi
• Komlos, J., Major, P. and Tusnady, G. (1976) An approximation of partial sums of independent rv’s and the sample df. II, Wahrsch verw Gebiete/Probability Theory and Related Fields, 34, 33–58. Template:Doi