Integral de Frullani

Les integrals de Frullani són un tipus específic d'integral impròpia que rep el nom del matemàtic italià Giuliano Frullani,^[1] qui les va esmentar per primera vegada en una carta el 1821 i publicada el 1828.

Les integrals són de la forma

${\displaystyle \int _{0}^{\infty }{\frac {f(ax)-f(bx)}{x}}\,{\rm {d}}x}$

on ${\displaystyle {f(x)}}$ és una funció sobre ${\displaystyle {x\geq 0}}$, i el límit de ${\displaystyle {f(x)}}$ existeix a ${\displaystyle {\infty }}$.

La següent fórmula per a la seva solució general es compleix en determinades condicions:

${\displaystyle {\int _{0}^{\infty }{\frac {f(ax)-f(bx)}{x}}\,{\rm {d}}x={\Big (}f(\infty )-f(0){\Big )}\ln {\frac {a}{b}}}}$

Una demostració simple de la fórmula es pot arribar expandint l'integrand en una integral, i després utilitzant el teorema de Fubini per intercanviar les dues integrals:

${\displaystyle {\begin{aligned}\int _{0}^{\infty }{\frac {f(ax)-f(bx)}{x}}\,dx&=\int _{0}^{\infty }\left[{\frac {f(xt)}{x}}\right]_{t=b}^{t=a}\,dx\\&=\int _{0}^{\infty }\int _{b}^{a}f'(xt)\,dt\,dx\\&=\int _{b}^{a}\int _{0}^{\infty }f'(xt)\,dx\,dt\\&=\int _{b}^{a}\left[{\frac {f(xt)}{t}}\right]_{x=0}^{x=\infty }\,dt\\&=\int _{b}^{a}{\frac {f(\infty )-f(0)}{t}}\,dt\\&={\Big (}f(\infty )-f(0){\Big )}{\Big (}\ln(a)-\ln(b){\Big )}\\&={\Big (}f(\infty )-f(0){\Big )}\ln {\Big (}{\frac {a}{b}}{\Big )}\\\end{aligned}}}$

Tingueu en compte que la integral de la segona línia anterior s'ha pres sobre l'interval ${\displaystyle [b,a]}$, i no sobre ${\displaystyle [a,b]}$.

Si ${\displaystyle f(x)\in C[0,+\infty )\ }$ i ${\displaystyle \ \forall A>0\ \exists \int \limits _{A}^{\infty }{\frac {f(x)}{x}}\,dx}$, llavors la fórmula següent és vàlida:

${\displaystyle \int \limits _{0}^{\infty }{\frac {f(\alpha x)-f(\beta x)}{x}}\,dx=f(0)\ln {\biggl (}{\frac {\beta }{\alpha }}{\biggr )}\ \ (\alpha >0,\beta >0)\ }$

Demostració:

${\displaystyle \lim \limits _{A\to +0}{\Biggl (}{\int \limits _{A}^{\infty }{\frac {f(\alpha x)-f(\beta x)}{x}}\,dx}{\Biggr )}=\lim \limits _{A\to +0}{\Biggl (}{{\int \limits _{A}^{\infty }{\frac {f(\alpha x)}{x}}\,dx}-{\int \limits _{A}^{\infty }{\frac {f(\beta x)}{x}}\,dx}}{\Biggr )}=}$

${\displaystyle =\left\{\forall A>0\ \exists \int \limits _{A}^{\infty }{\frac {f(x)}{x}}\,dx\ \Rightarrow {\int \limits _{A}^{\infty }{\frac {f(x)}{x}}\,dx=F(\infty )-F(A)}\Rightarrow {\int \limits _{A}^{\infty }{\frac {f(\alpha x)}{x}}\,dx=\int \limits _{\alpha A}^{\infty }{\frac {f(x)}{x}}\,dx}=F(\infty )-F(\alpha A)\right\}}$ ${\displaystyle =}$

${\displaystyle =\lim \limits _{A\to +0}{\Biggl (}F(\infty )-F(\alpha A)-F(\infty )+F(\beta A){\Biggr )}=\lim \limits _{A\to +0}{\Biggl (}F(\beta A)-F(\alpha A){\Biggr )}=\lim \limits _{A\to +0}{\Biggl (}\int \limits _{\alpha }^{\beta }{\frac {f(Ax)}{x}}\,dx{\Biggr )}=}$

${\displaystyle =\lim \limits _{A\to +0}{\Biggl (}f(A\xi )\int \limits _{\alpha }^{\beta }{\frac {1}{x}}\,dx{\Biggr )}}$ ${\displaystyle =\lim \limits _{A\to +0}{\Biggl (}f(A\xi ){\biggl (}\ln(\beta )-\ln(\alpha ){\biggr )}{\Biggr )}}$ ${\displaystyle =\lim \limits _{A\to +0}{\biggl (}f(A\xi ){\biggr )}\ln {\biggl (}{\frac {\beta }{\alpha }}{\biggr )}=}$

${\displaystyle =\left\{\xi \in [\alpha ,\beta ]\Rightarrow \lim \limits _{A\to +0}{A\xi }=0,f(x)\in C[0,+\infty )\Rightarrow \lim \limits _{A\to +0}{f(A\xi )=f(0)}\right\}=f(0)\ln {\biggl (}{\frac {\beta }{\alpha }}{\biggr )}.}$

Si ${\displaystyle f(x)\in C[0,+\infty )}$ i ${\displaystyle \exists \lim \limits _{x\to +\infty }f(x)<+\infty \ }$ aleshores, la fórmula següent és vàlida:

${\displaystyle \int \limits _{0}^{\infty }{\frac {f(\alpha x)-f(\beta x)}{x}}\,dx=(f(0)-f(+\infty ))\ln {\biggl (}{\frac {\beta }{\alpha }}{\biggr )}\ \ (\alpha >0,\beta >0)}$

Demostració:

${\displaystyle \int \limits _{0}^{\infty }{\frac {f(\alpha x)-f(\beta x)}{x}}\,dx=\lim \limits _{\epsilon \to 0,\Delta \to \infty }{\Biggl (}\int \limits _{\epsilon }^{A}{\frac {f(\alpha x)-f(\beta x)}{x}}\,dx+\int \limits _{A}^{\Delta }{\frac {f(\alpha x)-f(\beta x)}{x}}\,dx{\Biggr )}}$${\displaystyle =}$

${\displaystyle =\left\{\rho {\bigl (}\epsilon ,A{\bigr )}<\infty ,{\frac {f(x)}{x}}\in C[\epsilon ,A]\Rightarrow \int \limits _{\epsilon }^{A}{\frac {f(x)}{x}}\,dx=F(A)-F(\epsilon )\Rightarrow \int \limits _{\epsilon }^{A}{\frac {f(\alpha x)}{x}}\,dx=F(\alpha A)-F(\alpha \epsilon )\right\}}$${\displaystyle =}$

${\displaystyle =\lim \limits _{\epsilon \to 0,\Delta \to +\infty }{\Biggl (}F(\alpha A)-F(\alpha \epsilon )-F(\beta A)+F(\beta \epsilon )+\int \limits _{A}^{\Delta }{\frac {f(\alpha x)-f(\beta x)}{x}}\,dx{\Biggr )}=}$

${\displaystyle =\left\{\rho {\bigl (}A,\Delta {\bigr )}<\infty ,{\frac {f(x)}{x}}\in C[A,\Delta ]\Rightarrow \int \limits _{A}^{\Delta }{\frac {f(x)}{x}}\,dx=F(\Delta )-F(A)\Rightarrow \int \limits _{A}^{\Delta }{\frac {f(\alpha x)}{x}}\,dx=F(\alpha \Delta )-F(\alpha A)\right\}=}$

${\displaystyle =\lim \limits _{\epsilon \to +0,\Delta \to +\infty }{\Biggl (}F(\alpha A)-F(\alpha \epsilon )-F(\beta A)+F(\beta \epsilon )+F(\alpha \Delta )-F(\alpha A)-F(\beta \Delta )+F(\beta A){\Biggr )}=}$

${\displaystyle =\lim \limits _{\epsilon \to +0}{\biggl (}F(\beta \epsilon )-F(\alpha \epsilon ){\biggr )}-\lim \limits _{\Delta \to +\infty }{\biggl (}F(\beta \Delta )-F(\alpha \Delta ){\biggr )}=\lim \limits _{\epsilon \to +0}{\Biggl (}\int \limits _{\alpha }^{\beta }{\frac {f(\epsilon x)}{x}}\,dx{\Biggr )}-\lim \limits _{\Delta \to +\infty }{\Biggl (}\int \limits _{\alpha }^{\beta }{\frac {f(\Delta x)}{x}}\,dx{\Biggr )}=}$

${\displaystyle =\lim \limits _{\epsilon \to +0}{\Biggl (}f(\epsilon \eta )\int \limits _{\alpha }^{\beta }{\frac {1}{x}}\,dx{\Biggr )}-\lim \limits _{\Delta \to +\infty }{\Biggl (}f(\Delta \mu )\int \limits _{\alpha }^{\beta }{\frac {1}{x}}\,dx{\Biggr )}}$ ${\displaystyle ={\biggl (}\lim \limits _{\epsilon \to +0}f(\epsilon \eta )-\lim \limits _{\Delta \to +\infty }f(\Delta \mu ){\biggr )}{\biggl (}\ln(\beta )-\ln(\alpha ){\biggr )}}$ ${\displaystyle =}$

${\displaystyle =\left\{\eta ,\mu \in [\alpha ,\beta ]\Rightarrow \lim \limits _{\epsilon \to +0}\epsilon \eta =0,\lim \limits _{\Delta \to +\infty }\Delta \mu =+\infty ,f(x)\in C[0,+\infty ]\Rightarrow \lim \limits _{\epsilon \to +0}f(\epsilon \eta )=f(0),\lim \limits _{\Delta \to +\infty }f(\Delta \mu )=f(+\infty )\right\}=}$

${\displaystyle ={\biggl (}f(0)-f(+\infty ){\biggr )}\ln {\biggl (}{\frac {\beta }{\alpha }}{\biggr )}.}$

Si ${\displaystyle f(x)\in C(0,+\infty )\ }$ i ${\displaystyle \ \forall A>0\ \exists \int \limits _{0}^{A}{\frac {f(x)}{x}}\,dx}$ и ${\displaystyle \exists \lim \limits _{x\to +\infty }f(x)<+\infty \ }$ aleshores, la fórmula següent és vàlida:

${\displaystyle \int \limits _{0}^{\infty }{\frac {f(\alpha x)-f(\beta x)}{x}}\,dx=f(+\infty )\ln {\biggl (}{\frac {\alpha }{\beta }}{\biggr )}\ \ (\alpha >0,\beta >0)\ }$

La fórmula es pot utilitzar per derivar una representació integral per al logaritme natural ${\displaystyle \ln(x)}$ amb ${\displaystyle f(x)=e^{-x}}$ i ${\displaystyle a=1}$:

${\displaystyle {\int _{0}^{\infty }{\frac {e^{-x}-e^{-bx}}{x}}\,{\rm {d}}x={\Big (}\lim _{n\to \infty }{\frac {1}{e^{n}}}-e^{0}{\Big )}\ln {\Big (}{\frac {1}{b}}}{\Big )}=\ln(b)}$

o per derivar ${\displaystyle f(x)=\arctan x\ }$ amb ${\displaystyle a,b>0}$:

${\displaystyle \int \limits _{0}^{\infty }{\frac {\arctan(ax)-\arctan(bx)}{x}}\,{\rm {d}}x={\frac {\pi }{2}}\ln {\frac {a}{b}}}$

La fórmula també es pot generalitzar de diverses maneres diferents.^[2]

Gràcies a la integral de Frullani i amb l'ajut de transformacions elementals, diferenciació i integració respecte a un paràmetre, es poden reduir moltes altres integrals impròpies.

• ${\displaystyle \int \limits _{0}^{\infty }{\frac {{\frac {\sin(\alpha x)}{\alpha x}}-{\frac {\sin(\beta x)}{\beta x}}}{x}}\,dx\,=\,\ln \left({\frac {\beta }{\alpha }}\right)}$

• ${\displaystyle \int \limits _{0}^{\infty }\!{\frac {\sin \left(\alpha x+m\right)-\sin \left(\beta x+m\right)}{x}}{dx}=\sin(m)\cdot \ln \left({\frac {\beta }{\alpha }}\right)}$

• ${\displaystyle \int \limits _{0}^{\infty }\!{\frac {\cos \left(\alpha x+m\right)-\cos \left(\beta x+m\right)}{x}}{dx}=\cos(m)\cdot \ln \left({\frac {\beta }{\alpha }}\right)}$

• ${\displaystyle \int \limits _{0}^{\infty }{\frac {{\frac {m}{n+\alpha x}}-{\frac {m}{n+\beta x}}}{x}}\,dx\,=\,{{\frac {m}{n}}\,\ln \left({\frac {\beta }{\alpha }}\right)}}$

• ${\displaystyle \int \limits _{0}^{\infty }\!\,{\frac {{\frac {arctg\left(-\alpha \,x\right)}{\alpha \,x}}-{\frac {arctg\left(-\beta \,x\right)}{\beta \,x}}}{x}}{dx}\,={\,\ln \left({\frac {\alpha }{\beta }}\right)}}$

• Arias de Reyna, Juan «On the Theorem of Frullani» ( PDF) (en anglès). Proc. A.M.S., 109, 1990, pàg. 165-175.
• Boros, G; Moll, V. Irresistible Integrals (en anglès), 2004, p. 98. 
• Bromwich, T.J. An Introduction to the Theory of Infinite Series (en anglès). Macmillan, 1908, p. 432-433. 
• Frullani, G. Sopra Gli Integrali Definiti (en italià). XX. Modena: Memorie della Società Italiana delle Scienze, 1828. 
• Ostrowski, A.M «On Some Generalizations of the Cauchy-Frullani Integral» (en anglès). Proceedings of the National Academy of Sciences, 35(10), 10-1949, pàg. 612-616. PMC: 1063092. PMID: 16588938.
• Ostrowski, A. M «On Cauchy-Frullani Integrals» (en anglès). Commentarii Mathematici Helvetici, 51, 1976, pàg. 57–91. DOI: 10.1007/BF02568143.
• Tricomi, Francesco G «On the theorem of Frullani» (en anglès). American Mathematical Monthly, 58, 1951, pàg. 158–164.