Eigen
3.4.90 (git rev a4098ac676528a83cfb73d4d26ce1b42ec05f47c)

This page aims to provide an overview and some details on how to perform arithmetic between matrices, vectors and scalars with Eigen.
Eigen offers matrix/vector arithmetic operations either through overloads of common C++ arithmetic operators such as +, , *, or through special methods such as dot(), cross(), etc. For the Matrix class (matrices and vectors), operators are only overloaded to support linearalgebraic operations. For example, matrix1
*
matrix2
means matrixmatrix product, and vector
+
scalar
is just not allowed. If you want to perform all kinds of array operations, not linear algebra, see the next page.
The left hand side and right hand side must, of course, have the same numbers of rows and of columns. They must also have the same Scalar
type, as Eigen doesn't do automatic type promotion. The operators at hand here are:
a+b
ab
a
a+=b
a=b
Example:  Output: 

#include <iostream>
#include <Eigen/Dense>
int main()
{
a << 1, 2,
3, 4;
Eigen::MatrixXd b(2,2);
b << 2, 3,
1, 4;
std::cout << "a + b =\n" << a + b << std::endl;
std::cout << "a  b =\n" << a  b << std::endl;
std::cout << "Doing a += b;" << std::endl;
a += b;
std::cout << "Now a =\n" << a << std::endl;
Eigen::Vector3d v(1,2,3);
Eigen::Vector3d w(1,0,0);
std::cout << "v + w  v =\n" << v + w  v << std::endl;
}
 a + b = 3 5 4 8 a  b = 1 1 2 0 Doing a += b; Now a = 3 5 4 8 v + w  v = 1 4 6 
Multiplication and division by a scalar is very simple too. The operators at hand here are:
matrix*scalar
scalar*matrix
matrix/scalar
matrix*=scalar
matrix/=scalar
Example:  Output: 

#include <iostream>
#include <Eigen/Dense>
int main()
{
a << 1, 2,
3, 4;
Eigen::Vector3d v(1,2,3);
std::cout << "a * 2.5 =\n" << a * 2.5 << std::endl;
std::cout << "0.1 * v =\n" << 0.1 * v << std::endl;
std::cout << "Doing v *= 2;" << std::endl;
v *= 2;
std::cout << "Now v =\n" << v << std::endl;
}
 a * 2.5 = 2.5 5 7.5 10 0.1 * v = 0.1 0.2 0.3 Doing v *= 2; Now v = 2 4 6 
This is an advanced topic that we explain on this page, but it is useful to just mention it now. In Eigen, arithmetic operators such as operator+
don't perform any computation by themselves, they just return an "expression object" describing the computation to be performed. The actual computation happens later, when the whole expression is evaluated, typically in operator=
. While this might sound heavy, any modern optimizing compiler is able to optimize away that abstraction and the result is perfectly optimized code. For example, when you do:
Eigen compiles it to just one for loop, so that the arrays are traversed only once. Simplifying (e.g. ignoring SIMD optimizations), this loop looks like this:
Thus, you should not be afraid of using relatively large arithmetic expressions with Eigen: it only gives Eigen more opportunities for optimization.
The transpose \( a^T \), conjugate \( \bar{a} \), and adjoint (i.e., conjugate transpose) \( a^* \) of a matrix or vector \( a \) are obtained by the member functions transpose(), conjugate(), and adjoint(), respectively.
Example:  Output: 

MatrixXcf a = MatrixXcf::Random(2,2);
cout << "Here is the matrix a\n" << a << endl;
cout << "Here is the matrix a^T\n" << a.transpose() << endl;
cout << "Here is the conjugate of a\n" << a.conjugate() << endl;
cout << "Here is the matrix a^*\n" << a.adjoint() << endl;
 Here is the matrix a (1,0.737) (0.0655,0.562) (0.511,0.0827) (0.906,0.358) Here is the matrix a^T (1,0.737) (0.511,0.0827) (0.0655,0.562) (0.906,0.358) Here is the conjugate of a (1,0.737) (0.0655,0.562) (0.511,0.0827) (0.906,0.358) Here is the matrix a^* (1,0.737) (0.511,0.0827) (0.0655,0.562) (0.906,0.358) 
For real matrices, conjugate()
is a nooperation, and so adjoint()
is equivalent to transpose()
.
As for basic arithmetic operators, transpose()
and adjoint()
simply return a proxy object without doing the actual transposition. If you do b = a.transpose()
, then the transpose is evaluated at the same time as the result is written into b
. However, there is a complication here. If you do a = a.transpose()
, then Eigen starts writing the result into a
before the evaluation of the transpose is finished. Therefore, the instruction a = a.transpose()
does not replace a
with its transpose, as one would expect:
Example:  Output: 

Here is the matrix a: 1 2 3 4 and the result of the aliasing effect: 1 2 2 4 
This is the socalled aliasing issue. In "debug mode", i.e., when assertions have not been disabled, such common pitfalls are automatically detected.
For inplace transposition, as for instance in a = a.transpose()
, simply use the transposeInPlace() function:
Example:  Output: 

MatrixXf a(2,3); a << 1, 2, 3, 4, 5, 6;
cout << "Here is the initial matrix a:\n" << a << endl;
a.transposeInPlace();
cout << "and after being transposed:\n" << a << endl;
 Here is the initial matrix a: 1 2 3 4 5 6 and after being transposed: 1 4 2 5 3 6 
There is also the adjointInPlace() function for complex matrices.
Matrixmatrix multiplication is again done with operator*
. Since vectors are a special case of matrices, they are implicitly handled there too, so matrixvector product is really just a special case of matrixmatrix product, and so is vectorvector outer product. Thus, all these cases are handled by just two operators:
a*b
a*=b
(this multiplies on the right: a*=b
is equivalent to a = a*b
)Example:  Output: 

#include <iostream>
#include <Eigen/Dense>
int main()
{
Eigen::Matrix2d mat;
mat << 1, 2,
3, 4;
Eigen::Vector2d u(1,1), v(2,0);
std::cout << "Here is mat*mat:\n" << mat*mat << std::endl;
std::cout << "Here is mat*u:\n" << mat*u << std::endl;
std::cout << "Here is u^T*mat:\n" << u.transpose()*mat << std::endl;
std::cout << "Here is u^T*v:\n" << u.transpose()*v << std::endl;
std::cout << "Here is u*v^T:\n" << u*v.transpose() << std::endl;
std::cout << "Let's multiply mat by itself" << std::endl;
mat = mat*mat;
std::cout << "Now mat is mat:\n" << mat << std::endl;
}
 Here is mat*mat: 7 10 15 22 Here is mat*u: 1 1 Here is u^T*mat: 2 2 Here is u^T*v: 2 Here is u*v^T: 2 0 2 0 Let's multiply mat by itself Now mat is mat: 7 10 15 22 
Note: if you read the above paragraph on expression templates and are worried that doing m=m*m
might cause aliasing issues, be reassured for now: Eigen treats matrix multiplication as a special case and takes care of introducing a temporary here, so it will compile m=m*m
as:
If you know your matrix product can be safely evaluated into the destination matrix without aliasing issue, then you can use the noalias() function to avoid the temporary, e.g.:
For more details on this topic, see the page on aliasing.
Note: for BLAS users worried about performance, expressions such as c.noalias() = 2 * a.adjoint() * b;
are fully optimized and trigger a single gemmlike function call.
For dot product and cross product, you need the dot() and cross() methods. Of course, the dot product can also be obtained as a 1x1 matrix as u.adjoint()*v.
Example:  Output: 

#include <iostream>
#include <Eigen/Dense>
int main()
{
Eigen::Vector3d v(1,2,3);
Eigen::Vector3d w(0,1,2);
std::cout << "Dot product: " << v.dot(w) << std::endl;
double dp = v.adjoint()*w; // automatic conversion of the inner product to a scalar
std::cout << "Dot product via a matrix product: " << dp << std::endl;
std::cout << "Cross product:\n" << v.cross(w) << std::endl;
}
 Dot product: 8 Dot product via a matrix product: 8 Cross product: 1 2 1 
Remember that cross product is only for vectors of size 3. Dot product is for vectors of any sizes. When using complex numbers, Eigen's dot product is conjugatelinear in the first variable and linear in the second variable.
Eigen also provides some reduction operations to reduce a given matrix or vector to a single value such as the sum (computed by sum()), product (prod()), or the maximum (maxCoeff()) and minimum (minCoeff()) of all its coefficients.
Example:  Output: 

#include <iostream>
#include <Eigen/Dense>
using namespace std;
int main()
{
Eigen::Matrix2d mat;
mat << 1, 2,
3, 4;
cout << "Here is mat.sum(): " << mat.sum() << endl;
cout << "Here is mat.prod(): " << mat.prod() << endl;
cout << "Here is mat.mean(): " << mat.mean() << endl;
cout << "Here is mat.minCoeff(): " << mat.minCoeff() << endl;
cout << "Here is mat.maxCoeff(): " << mat.maxCoeff() << endl;
cout << "Here is mat.trace(): " << mat.trace() << endl;
}
internal::traits< Derived >::Scalar minCoeff() const Definition: Redux.h:433 internal::traits< Derived >::Scalar maxCoeff() const Definition: Redux.h:448  Here is mat.sum(): 10 Here is mat.prod(): 24 Here is mat.mean(): 2.5 Here is mat.minCoeff(): 1 Here is mat.maxCoeff(): 4 Here is mat.trace(): 5 
The trace of a matrix, as returned by the function trace(), is the sum of the diagonal coefficients and can also be computed as efficiently using a.diagonal().sum()
, as we will see later on.
There also exist variants of the minCoeff
and maxCoeff
functions returning the coordinates of the respective coefficient via the arguments:
Example:  Output: 

Matrix3f m = Matrix3f::Random();
std::ptrdiff_t i, j;
float minOfM = m.minCoeff(&i,&j);
cout << "Here is the matrix m:\n" << m << endl;
cout << "Its minimum coefficient (" << minOfM
<< ") is at position (" << i << "," << j << ")\n\n";
RowVector4i v = RowVector4i::Random();
int maxOfV = v.maxCoeff(&i);
cout << "Here is the vector v: " << v << endl;
cout << "Its maximum coefficient (" << maxOfV
<< ") is at position " << i << endl;
 Here is the matrix m: 1 0.0827 0.906 0.737 0.0655 0.358 0.511 0.562 0.359 Its minimum coefficient (1) is at position (0,0) Here is the vector v: 9 2 0 7 Its maximum coefficient (9) is at position 0 
Eigen checks the validity of the operations that you perform. When possible, it checks them at compile time, producing compilation errors. These error messages can be long and ugly, but Eigen writes the important message in UPPERCASE_LETTERS_SO_IT_STANDS_OUT. For example:
Of course, in many cases, for example when checking dynamic sizes, the check cannot be performed at compile time. Eigen then uses runtime assertions. This means that the program will abort with an error message when executing an illegal operation if it is run in "debug mode", and it will probably crash if assertions are turned off.
For more details on this topic, see this page.