ApproxFun is a package for approximating functions. It is in a similar vein to the Matlab
package Chebfun and the Mathematica package RHPackage.
The ApproxFun Documentation contains detailed information, or read on for a brief overview of the package.
The ApproxFun Examples contains many examples of
using this package, in Jupyter notebooks and Julia scripts.
Take your two favourite functions on an interval and create approximations to them as simply as:
using LinearAlgebra, SpecialFunctions, Plots, ApproxFun
x = Fun(identity,0..10)
f = sin(x^2)
g = cos(x)Evaluating f(.1) will return a high
accuracy approximation to sin(0.01). All the algebraic manipulations of functions
are supported and more. For example, we can add f and g^2 together and compute
the roots and extrema:
h = f + g^2
r = roots(h)
rp = roots(h')
using Plots
plot(h)
scatter!(r,h.(r))
scatter!(rp,h.(rp))
Notice from above that to find the extrema, we used ' overridden for the differentiate function. Several other Julia
base functions are overridden for the purposes of calculus. Because the exponential is its own
derivative, the norm is small:
f = Fun(x->exp(x), -1..1)
norm(f-f')Similarly, cumsum defines an indefinite integration operator:
g = cumsum(f)
g = g + f(-1)
norm(f-g)Algebraic and differential operations are also implemented where possible, and most of Julia's built-in functions are overridden to accept Funs:
x = Fun()
f = erf(x)
g = besselj(3,exp(f))
h = airyai(10asin(f)+2g)Solve the Airy ODE u'' - x u = 0 as a BVP on [-1000,200]:
a,b = -1000,200
x = Fun(identity, a..b)
d = domain(x)
D = Derivative(d)
B = Dirichlet(d)
L = D^2 - x
u = [B;L] \ [[airyai(a),airyai(b)],0]
plot(u)
Solve a nonlinear boundary value problem satisfying the ODE 0.001u'' + 6*(1-x^2)*u' + u^2 = 1 with boundary conditions u(-1)==1, u(1)==-0.5 on [-1,1]:
x = Fun()
u₀ = 0.0x
N = u -> [u(-1)-1, u(1)+0.5, 0.001u'' + 6*(1-x^2)*u' + u^2 - 1]
u = newton(N,u0)
plot(u)
There is also support for Fourier representations of functions on periodic intervals.
Specify the space Fourier to ensure that the representation is periodic:
f = Fun(cos, Fourier(-π..π))
norm(f' + Fun(sin, Fourier(-π..π))Due to the periodicity, Fourier representations allow for the asymptotic savings of 2/π
in the number of coefficients that need to be stored compared with a Chebyshev representation.
ODEs can also be solved when the solution is periodic:
s = Chebyshev(-π..π)
a = Fun(t-> 1+sin(cos(2t)), s)
L = Derivative() + a
f = Fun(t->exp(sin(10t)), s)
B = periodic(s,0)
uChebyshev = [B;L] \ [0.;f]
s = Fourier(-π..π)
a = Fun(t-> 1+sin(cos(2t)), s)
L = Derivative() + a
f = Fun(t->exp(sin(10t)), s)
uFourier = L\f
ncoefficients(uFourier)/ncoefficients(uChebyshev),2/π
plot(uFourier)
Other operations including random number sampling using [Olver & Townsend 2013]. The
following code samples 10,000 from a PDF given as the absolute value of the sine function on [-5,5]:
f = abs(Fun(sin, -5..5))
x = ApproxFun.sample(f,10000)
histogram(x;normed=true)
plot!(f/sum(f))
We can solve PDEs, the following solves Helmholtz Δu + 100u=0 with u(±1,y)=u(x,±1)=1
on a square. This function has weak singularities at the corner,
so we specify a lower tolerance to avoid resolving these singularities
completely.
d = ChebyshevInterval()^2 # Defines a rectangle
Δ = Laplacian(d) # Represent the Laplacian
f = ones(∂(d)) # one at the boundary
u = \([Dirichlet(d); Δ+100I], [f;0.]; # Solve the PDE
tolerance=1E-5)
surface(u) # Surface plot
Solving differential equations with high precision types is available. The following calculates e to 300 digits by solving the ODE u' = u:
setprecision(1000) do
d = BigFloat(0)..BigFloat(1)
D = Derivative(d)
u = [ldirichlet(); D-I] \ [1; 0]
@test u(1) ≈ exp(BigFloat(1))
endS. Olver & A. Townsend (2014), A practical framework for infinite-dimensional linear algebra, Proceedings of the 1st First Workshop for High Performance Technical Computing in Dynamic Languages, 57–62
A. Townsend & S. Olver (2014), The automatic solution of partial differential equations using a global spectral method, J. Comp. Phys., 299: 106–123
S. Olver & A. Townsend (2013), Fast inverse transform sampling in one and two dimensions, arXiv:1307.1223
S. Olver & A. Townsend (2013), A fast and well-conditioned spectral method, SIAM Review, 55:462–489