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Autodiff - Automatic Differentiation C++ Library

This project has moved to Boost (math/differentiation/autodiff) and this repository is no longer being updated.

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Description

Autodiff is a header-only C++ library that facilitates the automatic differentiation (forward mode) of mathematical functions of single and multiple variables.

This implementation is based upon the Taylor series expansion of an analytic function f at the point x₀:

            Taylor series

The essential idea of autodiff is the substitution of numbers with polynomials in the evaluation of f(x₀). By substituting the number x₀ with the first-order polynomial x₀+ε, and using the same algorithm to compute f(x₀+ε), the resulting polynomial in ε contains the function's derivatives f'(x₀), f''(x₀), f'''(x₀), ... within the coefficients. Each coefficient is equal to the derivative of its respective order, divided by the factorial of the order.

In greater detail, assume one is interested in calculating the first N derivatives of f at x₀. Without loss of precision to the calculation of the derivatives, all terms O(εN+1) that include powers of ε greater than N can be discarded. (This is due to the fact that each term in a polynomial depends only upon equal and lower-order terms under arithmetic operations.) Under these truncation rules, f provides a polynomial-to-polynomial transformation:

            Polynomial transform

C++'s ability to overload operators and functions allows for the creation of a class fvar that represents polynomials in ε. Thus the same algorithm f that calculates the numeric value of y₀=f(x₀), when written to accept and return variables of a generic (template) type, is also used to calculate the polynomial Ʃnynεⁿ=f(x₀+ε). The derivatives f(n)(x₀) are then found from the product of the respective factorial n! and coefficient yn:

            Derivative formula

Example 1: Single-Variable Differentiation

Calculate derivatives for x to 4th power

#include <boost/math/differentiation/autodiff.hpp>
#include <iostream>

template <typename T>
T fourth_power(T const& x) {
  T x4 = x * x;  // retval in operator*() uses x4's memory via NRVO.
  x4 *= x4;      // No copies of x4 are made within operator*=() even when squaring.
  return x4;     // x4 uses y's memory in main() via NRVO.
}

int main() {
  using namespace boost::math::differentiation;

  constexpr unsigned Order = 5;                  // Highest order derivative to be calculated.
  auto const x = make_fvar<double, Order>(2.0);  // Find derivatives at x=2.
  auto const y = fourth_power(x);
  for (unsigned i = 0; i <= Order; ++i)
    std::cout << "y.derivative(" << i << ") = " << y.derivative(i) << std::endl;
  return 0;
}
/*
Output:
y.derivative(0) = 16
y.derivative(1) = 32
y.derivative(2) = 48
y.derivative(3) = 48
y.derivative(4) = 24
y.derivative(5) = 0
*/

The above calculates

LaTeX for y.derivative() calls

Example 2: Multi-Variable and Multi-Precision Differentiation

12th-order mixed-partial derivative with about 50 decimal digits

#include <boost/math/differentiation/autodiff.hpp>
#include <boost/multiprecision/cpp_bin_float.hpp>
#include <iostream>

using namespace boost::math::differentiation;

template <typename W, typename X, typename Y, typename Z>
promote<W, X, Y, Z> f(const W& w, const X& x, const Y& y, const Z& z) {
  using namespace std;
  return exp(w * sin(x * log(y) / z) + sqrt(w * z / (x * y))) + w * w / tan(z);
}

int main() {
  using float50 = boost::multiprecision::cpp_bin_float_50;

  constexpr unsigned Nw = 3;  // Max order of derivative to calculate for w
  constexpr unsigned Nx = 2;  // Max order of derivative to calculate for x
  constexpr unsigned Ny = 4;  // Max order of derivative to calculate for y
  constexpr unsigned Nz = 3;  // Max order of derivative to calculate for z
  // Declare 4 independent variables together into a std::tuple.
  auto const variables = make_ftuple<float50, Nw, Nx, Ny, Nz>(11, 12, 13, 14);
  auto const& w = std::get<0>(variables);  // Up to Nw derivatives at w=11
  auto const& x = std::get<1>(variables);  // Up to Nx derivatives at x=12
  auto const& y = std::get<2>(variables);  // Up to Ny derivatives at y=13
  auto const& z = std::get<3>(variables);  // Up to Nz derivatives at z=14
  auto const v = f(w, x, y, z);
  // Calculated from Mathematica symbolic differentiation.
  float50 const answer("1976.319600747797717779881875290418720908121189218755");
  std::cout << std::setprecision(std::numeric_limits<float50>::digits10)
            << "mathematica   : " << answer << '\n'
            << "autodiff      : " << v.derivative(Nw, Nx, Ny, Nz) << '\n'
            << std::setprecision(3)
            << "relative error: " << (v.derivative(Nw, Nx, Ny, Nz) / answer - 1) << '\n';
  return 0;
}
/*
Output:
mathematica   : 1976.3196007477977177798818752904187209081211892188
autodiff      : 1976.3196007477977177798818752904187209081211892188
relative error: 2.67e-50
*/

Example 3: Black-Scholes Option Pricing with Greeks Automatically Calculated

#include <boost/math/differentiation/autodiff.hpp>
#include <iostream>

using namespace boost::math::constants;
using namespace boost::math::differentiation;

// Equations and function/variable names are from
// https://en.wikipedia.org/wiki/Greeks_(finance)#Formulas_for_European_option_Greeks

// Standard normal cumulative distribution function
template <typename X>
X Phi(X const& x) {
  return 0.5 * erfc(-one_div_root_two<X>() * x);
}

enum class CP { call, put };

// Assume zero annual dividend yield (q=0).
template <typename Price, typename Sigma, typename Tau, typename Rate>
promote<Price, Sigma, Tau, Rate> black_scholes_option_price(CP cp,
                                                            double K,
                                                            Price const& S,
                                                            Sigma const& sigma,
                                                            Tau const& tau,
                                                            Rate const& r) {
  using namespace std;
  auto const d1 = (log(S / K) + (r + sigma * sigma / 2) * tau) / (sigma * sqrt(tau));
  auto const d2 = (log(S / K) + (r - sigma * sigma / 2) * tau) / (sigma * sqrt(tau));
  switch (cp) {
    case CP::call:
      return S * Phi(d1) - exp(-r * tau) * K * Phi(d2);
    case CP::put:
      return exp(-r * tau) * K * Phi(-d2) - S * Phi(-d1);
  }
}

int main() {
  double const K = 100.0;                    // Strike price.
  auto const S = make_fvar<double, 2>(105);  // Stock price.
  double const sigma = 5;                    // Volatility.
  double const tau = 30.0 / 365;             // Time to expiration in years. (30 days).
  double const r = 1.25 / 100;               // Interest rate.
  auto const call_price = black_scholes_option_price(CP::call, K, S, sigma, tau, r);
  auto const put_price = black_scholes_option_price(CP::put, K, S, sigma, tau, r);

  std::cout << "black-scholes call price = " << call_price.derivative(0) << '\n'
            << "black-scholes put  price = " << put_price.derivative(0) << '\n'
            << "call delta = " << call_price.derivative(1) << '\n'
            << "put  delta = " << put_price.derivative(1) << '\n'
            << "call gamma = " << call_price.derivative(2) << '\n'
            << "put  gamma = " << put_price.derivative(2) << '\n';
  return 0;
}
/*
Output:
black-scholes call price = 56.5136
black-scholes put  price = 51.4109
call delta = 0.773818
put  delta = -0.226182
call gamma = 0.00199852
put  gamma = 0.00199852
*/

See example/black_scholes.cpp for a larger list of automatically-calculated option greeks.

Advantages of Automatic Differentiation

The above examples illustrate some of the advantages of using autodiff:

  • Elimination of code redundancy. The existence of N separate functions to calculate derivatives is a form of code redundancy, with all the liabilities that come with it:
    • Changes to one function require N additional changes to other functions. In the 3rd example above, consider how much larger and inter-dependent the above code base would be if a separate function were written for each Greek value.
    • Dependencies upon a derivative function for a different purpose will break when changes are made to the original function. What doesn't need to exist cannot break.
    • Code bloat, reducing conceptual integrity. Control over the evolution of code is easier/safer when the code base is smaller and able to be intuitively grasped.
  • Accuracy of derivatives over finite difference methods. Single-iteration finite difference methods always include a Δx free variable that must be carefully chosen for each application. If Δx is too small, then numerical errors become large. If Δx is too large, then mathematical errors become large. With autodiff, there are no free variables to set and the accuracy of the answer is generally superior to finite difference methods even with the best choice of Δx.

Manual

Additional details are in the autodiff manual.

License

Distributed under the Boost Software License, Version 1.0.

Properties

  • Header-only.
  • Optimized for C++17. Also compiles and tested with the C++11, C++14 and proposed C++20 standards.
  • All memory is allocated on the stack.

Directories

Name Purpose
doc documentation
example examples
include headers
test unit tests

More information

  • Report bugs: Be sure to mention Boost version, platform and compiler you're using. A small compilable code sample to reproduce the problem is always good as well.
  • Submit your patches as pull requests against the develop branch. Note that by submitting patches you agree to license your modifications under the Boost Software License, Version 1.0.

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