Layer cake representation

In mathematics, the layer cake representation of a non-negative, real-valued measurable function $f$ defined on a measure space $(\Omega ,{\mathcal {A}},\mu )$ is the formula

f(x)=\int _{0}^{\infty }1_{L(f,t)}(x)\,\mathrm {d} t,

for all $x\in \Omega$ , where $1_{E}$ denotes the indicator function of a subset $E\subseteq \Omega$ and $L(f,t)$ denotes the ( $\color {red}{\text{strict}}$ ) super-level set:

L(f,t)=\{y\in \Omega \mid f(y)\geq t\}\;\;\;{\color {red}{\text{or}}\;L(f,t)=\{y\in \Omega \mid f(y)>t\}}.

The layer cake representation follows easily from observing that

1_{L(f,t)}(x)=1_{[0,f(x)]}(t)\;\;\;{\color {red}{\text{or}}\;1_{L(f,t)}(x)=1_{[0,f(x))}(t)}

where either integrand gives the same integral:

f(x)=\int _{0}^{f(x)}\,\mathrm {d} t.

The layer cake representation takes its name from the representation of the value $f(x)$ as the sum of contributions from the "layers" $L(f,t)$ : "layers"/values $t$ below $f(x)$ contribute to the integral, while values $t$ above $f(x)$ do not. It is a generalization of Cavalieri's principle and is also known under this name.^[1]^{: cor. 2.2.34}

Applications

The layer cake representation can be used to rewrite the Lebesgue integral as an improper Riemann integral. For the measure space, $(\Omega ,{\mathcal {A}},\mu )$ , let $S\subseteq \Omega$ , be a measureable subset ( $S\in {\mathcal {A}})$ and $f$ a non-negative measureable function. By starting with the Lebesgue integral, then expanding $f(x)$ , then exchanging integration order (see Fubini-Tonelli theorem) and simplifying in terms of the Lebesgue integral of an indicator function, we get the Riemann integral:

{\begin{aligned}\int _{S}f(x)\,{\text{d}}\mu (x)&=\int _{S}\int _{0}^{\infty }1_{\{x\in \Omega \mid f(x)>t\}}(x)\,{\text{d}}t\,{\text{d}}\mu (x)\\&=\int _{0}^{\infty }\!\!\int _{S}1_{\{x\in \Omega \mid f(x)>t\}}(x)\,{\text{d}}\mu (x)\,{\text{d}}t\\&=\int _{0}^{\infty }\!\!\int _{\Omega }1_{\{x\in S\mid f(x)>t\}}(x)\,{\text{d}}\mu (x)\,{\text{d}}t\\&=\int _{0}^{\infty }\mu (\{x\in S\mid f(x)>t\})\,{\text{d}}t.\end{aligned}}

This can be used in turn, to rewrite the integral for the L^p-space p-norm, for $1\leq p<+\infty$ :

\int _{\Omega }|f(x)|^{p}\,\mathrm {d} \mu (x)=p\int _{0}^{\infty }s^{p-1}\mu (\{x\in \Omega :|f(x)|>s\})\mathrm {d} s,

which follows immediately from the change of variables $t=s^{p}$ in the layer cake representation of $|f(x)|^{p}$ . This representation can be used to prove Markov's inequality and Chebyshev's inequality.

References

^ Willem, Michel (2013). Functional analysis : fundamentals and applications. New York. ISBN 978-1-4614-7003-8.{{cite book}}: CS1 maint: ___location missing publisher (link)

Gardner, Richard J. (2002). "The Brunn–Minkowski inequality". Bull. Amer. Math. Soc. (N.S.). 39 (3): 355–405 (electronic). doi:10.1090/S0273-0979-02-00941-2.
Lieb, Elliott; Loss, Michael (2001). Analysis. Graduate Studies in Mathematics. Vol. 14 (2nd ed.). American Mathematical Society. ISBN 978-0821827833.

[1] Willem, Michel (2013). Functional analysis : fundamentals and applications. New York. ISBN 978-1-4614-7003-8.{{cite book}}: CS1 maint: ___location missing publisher (link)

[1]

Layer cake representation

Applications

See also

References