Borell–TIS inequality

Let ${\displaystyle T}$  be a topological space, and let ${\displaystyle \{f_{t}\}_{t\in T}}$  be a centered (i.e. mean zero) Gaussian process on ${\displaystyle T}$ , with

${\displaystyle \|f\|_{T}:=\sup _{t\in T}|f_{t}|}$ 

almost surely finite, and let

${\displaystyle \sigma _{T}^{2}:=\sup _{t\in T}\operatorname {E} |f_{t}|^{2}.}$ 

Then^[1] ${\displaystyle \operatorname {E} (\|f\|_{T})}$  and ${\displaystyle \sigma _{T}}$  are both finite, and, for each ${\displaystyle u>0}$ ,

${\displaystyle \operatorname {P} {\big (}\|f\|_{T}>\operatorname {E} (\|f\|_{T})+u{\big )}\leq \exp \left({\frac {-u^{2}}{2\sigma _{T}^{2}}}\right).}$ 

Another related statement which is also known as the Borell-TIS inequality^[1] is that, under the same conditions as above,

${\displaystyle \operatorname {P} {\big (}\sup _{t\in T}f_{t}>\operatorname {E} (\sup _{t\in T}f_{t})+u{\big )}\leq \exp {\bigg (}{\frac {-u^{2}}{2\sigma _{T}^{2}}}{\bigg )}}$ ,

and so by symmetry

${\displaystyle \operatorname {P} {\big (}|\sup _{t\in T}f_{t}-\operatorname {E} (\sup _{t\in T}f_{t})|>u{\big )}\leq 2\exp {\bigg (}{\frac {-u^{2}}{2\sigma _{T}^{2}}}{\bigg )}}$ .

• Gaussian isoperimetric inequality