Integral of inverse functions explained

In mathematics, integrals of inverse functions can be computed by means of a formula that expresses the antiderivatives of the inverse

f^-1

of a continuous and invertible function in terms of

f^-1

and an antiderivative of This formula was published in 1905 by Charles-Ange Laisant.^[1]

Statement of the theorem

Let

I₁

and

I₂

be two intervals of Assume that

f:I_1\toI₂

is a continuous and invertible function. It follows from the intermediate value theorem that

is strictly monotone. Consequently,

maps intervals to intervals, so is an open map and thus a homeomorphism. Since

and the inverse function

f^-1:I_2\toI₁

are continuous, they have antiderivatives by the fundamental theorem of calculus.

Laisant proved that if

is an antiderivative of then the antiderivatives of

f^-1

are:

\intf^-1(y)dy=yf^-1(y)-F\circf^-1(y)+C,

where

is an arbitrary real number. Note that it is not assumed that

f^-1

is differentiable.

In his 1905 article, Laisant gave three proofs.

First proof

First, under the additional hypothesis that

f^-1

is differentiable, one may differentiate the above formula, which completes the proof immediately.

Second proof

His second proof was geometric. If

f(a)=c

and the theorem can be written:

	d
\int
	c

f^-1(y)dy+

	b
\int
	a

f(x)dx=bd-ac.

The figure on the right is a proof without words of this formula. Laisant does not discuss the hypotheses necessary to make this proof rigorous, but this can be proved if

is just assumed to be strictly monotone (but not necessarily continuous, let alone differentiable). In this case, both

and

f^-1

are Riemann integrable and the identity follows from a bijection between lower/upper Darboux sums of

and upper/lower Darboux sums of The antiderivative version of the theorem then follows from the fundamental theorem of calculus in the case when

is also assumed to be continuous.

Third proof

Laisant's third proof uses the additional hypothesis that

is differentiable. Beginning with one multiplies by

f'(x)

and integrates both sides. The right-hand side is calculated using integration by parts to be and the formula follows.

Details

One may also think as follows when

is differentiable. As

is continuous at any

F:=

	x
\int
	0

is differentiable at all

by the fundamental theorem of calculus. Since

is invertible, its derivative would vanish in at most countably many points. Sort these points by

...<t_-1<t₀<t₁<...

. Since

g(y):=yf^-1(y)-F\circf^-1(y)+C

is a composition of differentiable functions on each interval

(t_i,t_i)

, chain rule could be applied

g'(y)=f^-1(y)+y/f'(y)-f\circf^-1(y).1/f'(y)+0=f^-1(y)

to see

\left.g\right\|
	(t_i,t_i)

is an antiderivative for

\left.f\right\|
	(t_i,t_i)

. We claim

is also differentiable on each of

t_i

and does not go unbounded if

I₂

is compact. In such a case

f^-1

is continuous and bounded. By continuity and the fundamental theorem of calculus,

G(y):=C+

	y
\int
	0

f^-1

where

is a constant, is a differentiable extension of

. But

is continuous as it's the composition of continuous functions. So is

by differentiability. Therefore,

G=g

. One can now use the fundamental theorem of calculus to compute

\int
	I₂

f^-1

Nevertheless, it can be shown that this theorem holds even if

f^-1

is not differentiable:^[2] it suffices, for example, to use the Stieltjes integral in the previous argument. On the other hand, even though general monotonic functions are differentiable almost everywhere, the proof of the general formula does not follow, unless

f^-1

is absolutely continuous.^[2]

It is also possible to check that for every

in the derivative of the function

y\mapstoyf^-1(y)-F(f^-1(y))

is equal to In other words:

\forallx\inI₁ \lim_h\to

	(x+h)f(x+h)-xf(x)-\left(F(x+h)-F(x)\right)
	f(x+h)-f(x)

=x.

To this end, it suffices to apply the mean value theorem to

between

and taking into account that

is monotonic.

Examples

Assume that hence The formula above gives immediately $\int \ln(y) \, dy = y\ln(y)-\exp(\ln(y)) + C= y\ln(y)-y + C.$
Similarly, with

f(x)=\cos(x)

and

\int \arccos(y) \, dy = y\arccos(y) - \sin(\arccos(y))+C.

With

f(x)=\tan(x)

and

\int \arctan(y) \, dy = y\arctan(y) + \ln \left|\cos(\arctan(y))\right| + C.

History

Apparently, this theorem of integration was discovered for the first time in 1905 by Charles-Ange Laisant,^[1] who "could hardly believe that this theorem is new", and hoped its use would henceforth spread out among students and teachers. This result was published independently in 1912 by an Italian engineer, Alberto Caprilli, in an opuscule entitled "Nuove formole d'integrazione".^[3] It was rediscovered in 1955 by Parker,^[4] and by a number of mathematicians following him.^[5] Nevertheless, they all assume that or is differentiable. The general version of the theorem, free from this additional assumption, was proposed by Michael Spivak in 1965, as an exercise in the Calculus,^[6] and a fairly complete proof following the same lines was published by Eric Key in 1994.^[7] This proof relies on the very definition of the Darboux integral, and consists in showing that the upper Darboux sums of the function are in 1-1 correspondence with the lower Darboux sums of . In 2013, Michael Bensimhoun, estimating that the general theorem was still insufficiently known, gave two other proofs:^[2] The second proof, based on the Stieltjes integral and on its formulae of integration by parts and of homeomorphic change of variables, is the most suitable to establish more complex formulae.

Generalization to holomorphic functions

The above theorem generalizes in the obvious way to holomorphic functions:Let

and

be two open and simply connected sets of and assume that

f:U\toV

is a biholomorphism. Then

and

f^-1

have antiderivatives, and if

is an antiderivative of the general antiderivative of

f^-1

G(z)=zf^-1(z)-F\circf^-1(z)+C.

Because all holomorphic functions are differentiable, the proof is immediate by complex differentiation.

References

J. H. . Staib . The Integration of Inverse Functions . Mathematics Magazine. Sep 1966 . 39 . 223–224 . 4 . 10.2307/2688087. 2688087 .

Notes and References

Laisant. C.-A.. Intégration des fonctions inverses. 1905. 253–257. 4. 5. Nouvelles annales de mathématiques, journal des candidats aux écoles polytechnique et normale.
1312.3839. math.HO. Michael. Bensimhoun. On the antiderivative of inverse functions. 2013.
http://ebooks.library.cornell.edu/cgi/t/text/pageviewer-idx?c=math&cc=math&idno=00420001&view=image&seq=5&size=100 Read online
Parker. F. D.. Integrals of inverse functions. Jun–Jul 1955. 439–440. 62. The American Mathematical Monthly. 10.2307/2307006. 6. 2307006.
It is equally possible that some or all of them simply recalled this result in their paper, without referring to previous authors.
[Michael Spivak]
Key. E. . Disks, Shells, and Integrals of Inverse Functions. Mar 1994. 136–138. 25. The College Mathematics Journal. 2. 10.2307/2687137. 2687137 .

Integral of inverse functions explained

Statement of the theorem

First proof

Second proof

Third proof

Details

Examples

History

Generalization to holomorphic functions

See also

References

Notes and References