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- // Copyright Matthew Pulver 2018 - 2019.
- // Distributed under the Boost Software License, Version 1.0.
- // (See accompanying file LICENSE_1_0.txt or copy at
- // https://www.boost.org/LICENSE_1_0.txt)
- #include <boost/math/differentiation/autodiff.hpp>
- #include <iostream>
- #include <stdexcept>
- 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 probability density function
- template <typename X>
- X phi(X const& x) {
- return one_div_root_two_pi<X>() * exp(-0.5 * x * x);
- }
- // 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);
- default:
- throw std::runtime_error("Invalid CP value.");
- }
- }
- int main() {
- double const K = 100.0; // Strike price.
- auto const variables = make_ftuple<double, 3, 3, 1, 1>(105, 5, 30.0 / 365, 1.25 / 100);
- auto const& S = std::get<0>(variables); // Stock price.
- auto const& sigma = std::get<1>(variables); // Volatility.
- auto const& tau = std::get<2>(variables); // Time to expiration in years. (30 days).
- auto const& r = std::get<3>(variables); // 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);
- double const d1 = static_cast<double>((log(S / K) + (r + sigma * sigma / 2) * tau) / (sigma * sqrt(tau)));
- double const d2 = static_cast<double>((log(S / K) + (r - sigma * sigma / 2) * tau) / (sigma * sqrt(tau)));
- double const formula_call_delta = +Phi(+d1);
- double const formula_put_delta = -Phi(-d1);
- double const formula_vega = static_cast<double>(S * phi(d1) * sqrt(tau));
- double const formula_call_theta =
- static_cast<double>(-S * phi(d1) * sigma / (2 * sqrt(tau)) - r * K * exp(-r * tau) * Phi(+d2));
- double const formula_put_theta =
- static_cast<double>(-S * phi(d1) * sigma / (2 * sqrt(tau)) + r * K * exp(-r * tau) * Phi(-d2));
- double const formula_call_rho = static_cast<double>(+K * tau * exp(-r * tau) * Phi(+d2));
- double const formula_put_rho = static_cast<double>(-K * tau * exp(-r * tau) * Phi(-d2));
- double const formula_gamma = static_cast<double>(phi(d1) / (S * sigma * sqrt(tau)));
- double const formula_vanna = static_cast<double>(-phi(d1) * d2 / sigma);
- double const formula_charm =
- static_cast<double>(phi(d1) * (d2 * sigma * sqrt(tau) - 2 * r * tau) / (2 * tau * sigma * sqrt(tau)));
- double const formula_vomma = static_cast<double>(S * phi(d1) * sqrt(tau) * d1 * d2 / sigma);
- double const formula_veta = static_cast<double>(-S * phi(d1) * sqrt(tau) *
- (r * d1 / (sigma * sqrt(tau)) - (1 + d1 * d2) / (2 * tau)));
- double const formula_speed =
- static_cast<double>(-phi(d1) * (d1 / (sigma * sqrt(tau)) + 1) / (S * S * sigma * sqrt(tau)));
- double const formula_zomma = static_cast<double>(phi(d1) * (d1 * d2 - 1) / (S * sigma * sigma * sqrt(tau)));
- double const formula_color =
- static_cast<double>(-phi(d1) / (2 * S * tau * sigma * sqrt(tau)) *
- (1 + (2 * r * tau - d2 * sigma * sqrt(tau)) * d1 / (sigma * sqrt(tau))));
- double const formula_ultima =
- -formula_vega * static_cast<double>((d1 * d2 * (1 - d1 * d2) + d1 * d1 + d2 * d2) / (sigma * sigma));
- std::cout << std::setprecision(std::numeric_limits<double>::digits10)
- << "autodiff black-scholes call price = " << call_price.derivative(0, 0, 0, 0) << '\n'
- << "autodiff black-scholes put price = " << put_price.derivative(0, 0, 0, 0) << '\n'
- << "\n## First-order Greeks\n"
- << "autodiff call delta = " << call_price.derivative(1, 0, 0, 0) << '\n'
- << " formula call delta = " << formula_call_delta << '\n'
- << "autodiff call vega = " << call_price.derivative(0, 1, 0, 0) << '\n'
- << " formula call vega = " << formula_vega << '\n'
- << "autodiff call theta = " << -call_price.derivative(0, 0, 1, 0)
- << '\n' // minus sign due to tau = T-time
- << " formula call theta = " << formula_call_theta << '\n'
- << "autodiff call rho = " << call_price.derivative(0, 0, 0, 1) << '\n'
- << " formula call rho = " << formula_call_rho << '\n'
- << '\n'
- << "autodiff put delta = " << put_price.derivative(1, 0, 0, 0) << '\n'
- << " formula put delta = " << formula_put_delta << '\n'
- << "autodiff put vega = " << put_price.derivative(0, 1, 0, 0) << '\n'
- << " formula put vega = " << formula_vega << '\n'
- << "autodiff put theta = " << -put_price.derivative(0, 0, 1, 0) << '\n'
- << " formula put theta = " << formula_put_theta << '\n'
- << "autodiff put rho = " << put_price.derivative(0, 0, 0, 1) << '\n'
- << " formula put rho = " << formula_put_rho << '\n'
- << "\n## Second-order Greeks\n"
- << "autodiff call gamma = " << call_price.derivative(2, 0, 0, 0) << '\n'
- << "autodiff put gamma = " << put_price.derivative(2, 0, 0, 0) << '\n'
- << " formula gamma = " << formula_gamma << '\n'
- << "autodiff call vanna = " << call_price.derivative(1, 1, 0, 0) << '\n'
- << "autodiff put vanna = " << put_price.derivative(1, 1, 0, 0) << '\n'
- << " formula vanna = " << formula_vanna << '\n'
- << "autodiff call charm = " << -call_price.derivative(1, 0, 1, 0) << '\n'
- << "autodiff put charm = " << -put_price.derivative(1, 0, 1, 0) << '\n'
- << " formula charm = " << formula_charm << '\n'
- << "autodiff call vomma = " << call_price.derivative(0, 2, 0, 0) << '\n'
- << "autodiff put vomma = " << put_price.derivative(0, 2, 0, 0) << '\n'
- << " formula vomma = " << formula_vomma << '\n'
- << "autodiff call veta = " << call_price.derivative(0, 1, 1, 0) << '\n'
- << "autodiff put veta = " << put_price.derivative(0, 1, 1, 0) << '\n'
- << " formula veta = " << formula_veta << '\n'
- << "\n## Third-order Greeks\n"
- << "autodiff call speed = " << call_price.derivative(3, 0, 0, 0) << '\n'
- << "autodiff put speed = " << put_price.derivative(3, 0, 0, 0) << '\n'
- << " formula speed = " << formula_speed << '\n'
- << "autodiff call zomma = " << call_price.derivative(2, 1, 0, 0) << '\n'
- << "autodiff put zomma = " << put_price.derivative(2, 1, 0, 0) << '\n'
- << " formula zomma = " << formula_zomma << '\n'
- << "autodiff call color = " << call_price.derivative(2, 0, 1, 0) << '\n'
- << "autodiff put color = " << put_price.derivative(2, 0, 1, 0) << '\n'
- << " formula color = " << formula_color << '\n'
- << "autodiff call ultima = " << call_price.derivative(0, 3, 0, 0) << '\n'
- << "autodiff put ultima = " << put_price.derivative(0, 3, 0, 0) << '\n'
- << " formula ultima = " << formula_ultima << '\n';
- return 0;
- }
- /*
- Output:
- autodiff black-scholes call price = 56.5136030677739
- autodiff black-scholes put price = 51.4109161009333
- ## First-order Greeks
- autodiff call delta = 0.773818444921273
- formula call delta = 0.773818444921274
- autodiff call vega = 9.05493427705736
- formula call vega = 9.05493427705736
- autodiff call theta = -275.73013426444
- formula call theta = -275.73013426444
- autodiff call rho = 2.03320550539396
- formula call rho = 2.03320550539396
- autodiff put delta = -0.226181555078726
- formula put delta = -0.226181555078726
- autodiff put vega = 9.05493427705736
- formula put vega = 9.05493427705736
- autodiff put theta = -274.481417851526
- formula put theta = -274.481417851526
- autodiff put rho = -6.17753255212599
- formula put rho = -6.17753255212599
- ## Second-order Greeks
- autodiff call gamma = 0.00199851912993254
- autodiff put gamma = 0.00199851912993254
- formula gamma = 0.00199851912993254
- autodiff call vanna = 0.0410279463126531
- autodiff put vanna = 0.0410279463126531
- formula vanna = 0.0410279463126531
- autodiff call charm = -1.2505564233679
- autodiff put charm = -1.2505564233679
- formula charm = -1.2505564233679
- autodiff call vomma = -0.928114149313108
- autodiff put vomma = -0.928114149313108
- formula vomma = -0.928114149313107
- autodiff call veta = 26.7947073115641
- autodiff put veta = 26.7947073115641
- formula veta = 26.7947073115641
- ## Third-order Greeks
- autodiff call speed = -2.90117322380992e-05
- autodiff put speed = -2.90117322380992e-05
- formula speed = -2.90117322380992e-05
- autodiff call zomma = -0.000604548369901419
- autodiff put zomma = -0.000604548369901419
- formula zomma = -0.000604548369901419
- autodiff call color = -0.0184014426606065
- autodiff put color = -0.0184014426606065
- formula color = -0.0184014426606065
- autodiff call ultima = -0.0922426864775683
- autodiff put ultima = -0.0922426864775683
- formula ultima = -0.0922426864775685
- **/
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