Crate num_dual[−][src]
Expand description
Generalized, recursive, scalar and vector (hyper) dual numbers for the automatic and exact calculation of (partial) derivatives.
Example
This example defines a generic function that can be called using any (hyper) dual number and automatically calculates derivatives.
use num_dual::*;
fn f<D: DualNum<f64>>(x: D, y: D) -> D {
x.powi(3) * y.powi(2)
}
fn main() {
let (x, y) = (5.0, 4.0);
// Calculate a simple derivative
let x_dual = Dual64::from(x).derive();
let y_dual = Dual64::from(y);
println!("{}", f(x_dual, y_dual)); // 2000 + [1200]ε
// Calculate a gradient
let xy_dual_vec = StaticVec::new_vec([x,y]).map(DualVec64::<2>::from).derive();
println!("{}", f(xy_dual_vec[0], xy_dual_vec[1]).eps); // [1200, 1000]
// Calculate a Hessian
let xy_dual2 = StaticVec::new_vec([x,y]).map(Dual2Vec64::<2>::from).derive();
println!("{}", f(xy_dual2[0], xy_dual2[1]).v2); // [[480, 600], [600, 250]]
// for x=cos(t) and y=sin(t) calculate the third derivative w.r.t. t
let t = Dual3_64::from(1.0).derive();
println!("{}", f(t.cos(), t.sin()).v3); // 7.358639755305733
}
Structs
A second order dual number for the calculation of Hessians.
A scalar third order dual number for the calculation of third derivatives.
A dual number for the calculations of gradients or Jacobians.
A hyper dual number for the calculation of second partial derivatives.
A statically allocated MxN matrix. The struct is used in the vector (hyper) dual numbers and provides utilities for the calculation of Jacobians.
Traits
A generalized (hyper) dual number.
The underlying data type of individual derivatives. Usually f32 or f64.