The other day MathMatize posted

roses are red
books go on a shelf
1+2+3+4+ …

with a photo of Ramanujan on X.

This was an allusion to the bizarre equation

1 + 2 + 3 + … = − 1/12.

This comes up often enough that I wanted to write a post that I could share a link to next time I see it.

The equation is nonsense if interpreted in the usual way. The sum on the left diverges. You could say the sum is ∞ if by that you mean you can make the sum as large as you like by taking the partial sum out far enough.

Here’s how the equation is mean to be interpreted. The Riemann zeta function is defined as

for complex numbers s with positive real part, and defined for the rest of the complex plane by analytic continuation. The qualifiers matter. The infinite sum above does not define the zeta function for all numbers; it defines ζ(s) for numbers with real part greater than 1. The sum is valid for numbers like 7, or 42 −476i, or √2 + πi, but not for −1.

If the sum did define ζ(−1) then the sum would be 1 + 2 + 3 + …, but it doesn’t.

However, ζ(−1) is defined, and it equals −1/12.

What does it mean to define a function by analytic continuation? There is a theorem that essentially says there is only one way to extend an analytic function. It is possible to construct an analytic function that has the same values as ζ(s) when Re(s) > 1, where that function is defined for all s ≠ 1.

We could give that function a new name, say f(s). That is the function whose value at −1 equals − 1/12. But since there is only one possible analytic function f that overlaps with ζ(s) we go ahead and use the notation ζ(s) for this extended function.

To put it another way, the function ζ(s) is valid for all s ≠ 1, but the series representation for ζ(s) is not valid unless Re(s) > 1. There are other representations for ζ(s) for other regions of the complex plane, including for s = −1, and that’s what lets us compute ζ(−1) to find out that it equals −1/12.

So the rigorous but less sensational way to interpret the equation is to say

1^−s + 2^−s + 3^−s + …

is a whimsical way of referring to the function defined by the series, when the series converges, and defined by its analytic continuation otherwise. So in addition to saying

1 + 2 + 3 + … = − 1/12

we could also say

1² + 2² + 3² + … = 0

and

1³ + 2³ + 3³ + … = 1/120.

You can make up your own equation for any value of s for which you can calculate ζ(s).

A few weeks ago I wrote about the Mellin transform. Mitchell Wheat left comment saying the transform seems reminiscent of Ramanujan’s master theorem, which motivated this post.

Suppose you have a function f that is nice enough to have a power series.

Now focus on the coefficients a_k as a function of k. We’ll introduce a function φ that yields the coefficients, with a twist.

and so φ(k) = (−1)^k k! a_k. Another way to look at it is that f is the exponential generating function of (−1)^k φ(k).

Then Ramanujan’s master theorem gives a formula for the Mellin transform of f:

This equation was the basis of many of Ramanujan’s theorems.

Related posts

• Master theorem of algorithm analysis
• Ramanujan’s approximation for the perimeter of an ellipse
• Transforms and convolutions

It’s interesting to visualize functions of a complex variable, even very simple functions like f(z) = 1/z. The previous post looked at what happens to triangles under the reciprocal map w = 1/z. This post will look at the same map applied to a polar grid, then look at the effect a shift has, replacing 1/z with 1/(z − c).

The function 1/z is a Möbius transformation, and so it maps lines and circles to lines and circles. And in the case of a polar grid, lines go to lines and circles go to circles. The overall grid is unchanged, even though circles swap places with other circles, and lines swap places with other lines. To see this, note that

1/re^iθ = (1/r)e^−iθ

This means that the function 1/z maps a circle of radius r to a circle of radius 1/r, and it maps a line of slope m to a line of slope −1/m.

Things get more interesting when we shift the reciprocal function to w = 1/(z − c). Now lines will map to circles, unless the line passes through c. Circles will still map to circles, unless the circle passes through c, but we won’t have circles swapping places because the function 1/(z − c) is not its own inverse, unlike 1/z. Here’s a plot with c = 0.1.

Note that circles map to circles, but the center of a circle does not necessarily map to the center of the image circle. So the green circles in the z-plane map to green circles in the w-plane, but the circles in the z-plane are concentric while their images in the w-plane are not.

The blue lines in the z-plane become blue circles in the w-plane, though some of the circles are too large to fit in the frame of the plot.

As we discussed in the previous post, Möbius transformations are easier to discuss if you adjoint a point at infinity to the complex plane. The radial lines in the z-plane all meet at ∞, and so their images in the w-plane all meet at 1/(∞ – c) = 0.

One final thing to note is that however small ε > 0 is, the images of the grid lines are very different under 1/(z − ε) compared to 1/z. Individual z‘s that start out close together are mapped to w‘s that are close together, but the images of the system of lines and circles is qualitatively different for ε > 0 versus ε = 0.

Related posts

• Conformal map between disk and triangle
• Conformal map between disk and ellipse
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The previous post showed how to compute logarithms using tables. It gives an example of calculating a logarithm to 15 figures precision using tables that only allow 4 figures of precision for inputs.

Not only can you bootstrap tables to calculate logarithms of real numbers not given in the tables, you can also bootstrap a table of logarithms and a table of arctangents to calculate logarithms of complex numbers.

One of the examples in Abramowitz and Stegun (Example 7, page 90) is to compute log(2 + 3i). How could you do that with tables? Or with a programming language that doesn’t support complex numbers?

What does this even mean?

Now we have to be a little careful about what we mean by the logarithm of a complex number.

In the context of real numbers, the logarithm of a real number x is the real number y such that e^y = x. This equation has a unique solution if x is positive and no solution otherwise.

In the context of complex numbers, a logarithm of the complex number z is any complex number w such that e^w = z. This equation has no solution if z = 0, and it has infinitely many solutions otherwise: for any solution w, w + 2nπi is also a solution for all integers n.

Solution

If you write the complex number z in polar form

z = r e^iθ

then

log(z) = log(r) + iθ.

The proof is immediate:

e^{log(r) + iθ} = e^log(r) e^iθ = r e^iθ.

So computing the logarithm of a complex number boils down to computing its magnitude r and its argument θ.

The equation defining a logarithm has a unique solution if we make a branch cut along the negative real axis and restrict θ to be in the range −π < θ ≤ π. This is called the principal branch of log, sometimes written Log. As far as I know, every programming language that supports complex logarithms uses the principal branch implicitly. For example, in Python (NumPy), log(x) computes the principal branch of the log function.

Example

Going back to the example mentioned above,

log(2 + 3i) = log( √(2² + 3²) ) + arctan(3/2) = ½ log(13) + arctan(3/2) i.

This could easily be computed by looking up the logarithm of 13 and the arc tangent of 3/2.

The exercise in A&S actually asks the reader to calculate log(±2 ± 3i). The reason for the variety of signs is to require the reader to pick the value of θ that lies in the range −π < θ ≤ π. For example,

log(−2 + 3i) =  = ½ log(13) + (π − arctan(3/2)) i.

Suppose you’d like to evaluate the function

for small values of z, say z = 10⁻⁸. This example comes from [1].

The Python code

    from numpy import exp
    def f(z): return (exp(z) - 1 - z)/z**2
    print(f(1e-8))

prints -0.607747099184471.

Now suppose you suspect numerical difficulties and compute your result to 50 decimal places using bc -l.

    scale = 50
    z = 10^-8
    (e(z) - 1 - z)/z^2

Now you get u(z) = .50000000166666667….

This suggests original calculation was completely wrong. What’s going on?

For small z,

e^z ≈ 1 + z

and so we lose precision when directly evaluating the numerator in the definition of u. In our example, we lost all precision.

The mean value theorem from complex analysis says that the value of an analytic function at a point equals the continuous average of the values over a circle centered at that point. If we approximate this average by taking the average of 16 values in a circle of radius 1 around our point, we get full accuracy. The Python code

    def g(z):
        N = 16
        ws = z + exp(2j*pi*arange(N)/N)
        return sum(f(ws))/N

returns

    0.5000000016666668 + 8.673617379884035e-19j

which departs from the result calculated with bc in the 16th decimal place.

At a high level, we’re avoiding numerical difficulties by averaging over points far from the difficult region.

[1] Lloyd N. Trefethen and J. A. C. Weideman. The Exponentially Convergent Trapezoid Rule. SIAM Review. Vol. 56, No. 3. pp. 385–458.

The most obvious way to approximate the derivative of a function numerically is to use the definition of derivative and stick in a small value of the step size h.

f′ (x) ≈ ( f(x + h) − f(x) ) / h.

How small should h be? Since the exact value of the derivative is the limit as h goes to zero, the smaller h is the better. Except that’s not true in computer arithmetic. When h is too small, f(x + h) is so close to f(x) that the subtraction loses precision.

One way to see this is to think of the extreme case of h so small that f(x + h) equals f(x) to machine precision. Then the derivative is approximated by 0, regardless of what the actual derivative is.

As h gets smaller, the approximation error decreases, but the numerical error increases, and so there is some optimal value of h.

You can do significantly better by using a symmetric approximation for the derivative:

f′ (x) ≈ ( f(x + h) − f(x − h) ) / 2h.

For a given value of h, this formula has about the same numerical error but less approximation error. You still have a trade-off between approximation error and numerical error, but it’s a better trade-off.

If the function f that you want to differentiate is analytic, i.e. differentiable as a function of a complex variable, you can take the step h to be a complex number. When you do, the numerical difficulty completely goes away, and you can take h much smaller.

Suppose h is a small real number and you take

f′ (x) ≈ ( f(x + ih) − f(x − ih) ) / 2ih.

Now f(x + ih) and −f(x − ih) are approximately equal by the Schwarz reflection principle. And so rather than canceling out, the terms in the numerator add. We have

f(x + ih) − f(x − ih) ≈ 2 f(x + ih)

and so

f′ (x) ≈ f(x + ih) / ih.

Example

Let’s take the derivative of the gamma function Γ(x) at 1 using each of the three methods above. The exact value is −γ where γ is the Euler-Mascheroni constant. The following Python code shows the accuracy of each approach.

    from scipy.special import gamma

    def diff1(f, x, h):
        return (f(x + h) - f(x))/h

    def diff2(f, x, h):
        return (f(x + h) - f(x - h))/(2*h)

    γ = 0.5772156649015328606065

    x     = 1
    h     = 1e-7
    exact = -γ

    approx1 = diff1(gamma, x, h)
    approx2 = diff2(gamma, x, h)
    approx3 = diff2(gamma, x, h*1j)

    print(approx1 - exact)
    print(approx2 - exact)
    print(approx3 - exact)

This prints

    9.95565755390615e-08
    1.9161483510998778e-10
    (9.103828801926284e-15-0j)

In this example the symmetric finite difference approximation is about 5 times more accurate than the asymmetric approximation, but the complex step approximation is 10,000,000 times more accurate.

It’s a little awkward that the complex step approximation returns a complex number, albeit one with zero complex part. We can eliminate this problem by using the approximation

f′ (x) ≈ Im f(x + ih) / h

which will return a real number. When we implement this in Python as

    def diff3(f, x, h):
        return (f(x + h*1j) / h).imag

we see that it produces the same result as diff2 but without the zero imaginary part.

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