1namespace Eigen {
2
3/** \eigenManualPage TutorialMatrixArithmetic Matrix and vector arithmetic
4
5This page aims to provide an overview and some details on how to perform arithmetic
6between matrices, vectors and scalars with Eigen.
7
8\eigenAutoToc
9
10\section TutorialArithmeticIntroduction Introduction
11
12Eigen offers matrix/vector arithmetic operations either through overloads of common C++ arithmetic operators such as +, -, *,
13or through special methods such as dot(), cross(), etc.
14For the Matrix class (matrices and vectors), operators are only overloaded to support
15linear-algebraic operations. For example, \c matrix1 \c * \c matrix2 means matrix-matrix product,
16and \c vector \c + \c scalar is just not allowed. If you want to perform all kinds of array operations,
17not linear algebra, see the \ref TutorialArrayClass "next page".
18
19\section TutorialArithmeticAddSub Addition and subtraction
20
21The left hand side and right hand side must, of course, have the same numbers of rows and of columns. They must
22also have the same \c Scalar type, as Eigen doesn't do automatic type promotion. The operators at hand here are:
23\li binary operator + as in \c a+b
24\li binary operator - as in \c a-b
25\li unary operator - as in \c -a
26\li compound operator += as in \c a+=b
27\li compound operator -= as in \c a-=b
28
29<table class="example">
30<tr><th>Example:</th><th>Output:</th></tr>
31<tr><td>
32\include tut_arithmetic_add_sub.cpp
33</td>
34<td>
35\verbinclude tut_arithmetic_add_sub.out
36</td></tr></table>
37
38\section TutorialArithmeticScalarMulDiv Scalar multiplication and division
39
40Multiplication and division by a scalar is very simple too. The operators at hand here are:
41\li binary operator * as in \c matrix*scalar
42\li binary operator * as in \c scalar*matrix
43\li binary operator / as in \c matrix/scalar
44\li compound operator *= as in \c matrix*=scalar
45\li compound operator /= as in \c matrix/=scalar
46
47<table class="example">
48<tr><th>Example:</th><th>Output:</th></tr>
49<tr><td>
50\include tut_arithmetic_scalar_mul_div.cpp
51</td>
52<td>
53\verbinclude tut_arithmetic_scalar_mul_div.out
54</td></tr></table>
55
56
57\section TutorialArithmeticMentionXprTemplates A note about expression templates
58
59This is an advanced topic that we explain on \ref TopicEigenExpressionTemplates "this page",
60but it is useful to just mention it now. In Eigen, arithmetic operators such as \c operator+ don't
61perform any computation by themselves, they just return an "expression object" describing the computation to be
62performed. The actual computation happens later, when the whole expression is evaluated, typically in \c operator=.
63While this might sound heavy, any modern optimizing compiler is able to optimize away that abstraction and
64the result is perfectly optimized code. For example, when you do:
65\code
66VectorXf a(50), b(50), c(50), d(50);
67...
68a = 3*b + 4*c + 5*d;
69\endcode
70Eigen compiles it to just one for loop, so that the arrays are traversed only once. Simplifying (e.g. ignoring
71SIMD optimizations), this loop looks like this:
72\code
73for(int i = 0; i < 50; ++i)
74  a[i] = 3*b[i] + 4*c[i] + 5*d[i];
75\endcode
76Thus, you should not be afraid of using relatively large arithmetic expressions with Eigen: it only gives Eigen
77more opportunities for optimization.
78
79\section TutorialArithmeticTranspose Transposition and conjugation
80
81The transpose \f$ a^T \f$, conjugate \f$ \bar{a} \f$, and adjoint (i.e., conjugate transpose) \f$ a^* \f$ of a matrix or vector \f$ a \f$ are obtained by the member functions \link DenseBase::transpose() transpose()\endlink, \link MatrixBase::conjugate() conjugate()\endlink, and \link MatrixBase::adjoint() adjoint()\endlink, respectively.
82
83<table class="example">
84<tr><th>Example:</th><th>Output:</th></tr>
85<tr><td>
86\include tut_arithmetic_transpose_conjugate.cpp
87</td>
88<td>
89\verbinclude tut_arithmetic_transpose_conjugate.out
90</td></tr></table>
91
92For real matrices, \c conjugate() is a no-operation, and so \c adjoint() is equivalent to \c transpose().
93
94As for basic arithmetic operators, \c transpose() and \c adjoint() simply return a proxy object without doing the actual transposition. If you do <tt>b = a.transpose()</tt>, then the transpose is evaluated at the same time as the result is written into \c b. However, there is a complication here. If you do <tt>a = a.transpose()</tt>, then Eigen starts writing the result into \c a before the evaluation of the transpose is finished. Therefore, the instruction <tt>a = a.transpose()</tt> does not replace \c a with its transpose, as one would expect:
95<table class="example">
96<tr><th>Example:</th><th>Output:</th></tr>
97<tr><td>
98\include tut_arithmetic_transpose_aliasing.cpp
99</td>
100<td>
101\verbinclude tut_arithmetic_transpose_aliasing.out
102</td></tr></table>
103This is the so-called \ref TopicAliasing "aliasing issue". In "debug mode", i.e., when \ref TopicAssertions "assertions" have not been disabled, such common pitfalls are automatically detected.
104
105For \em in-place transposition, as for instance in <tt>a = a.transpose()</tt>, simply use the \link DenseBase::transposeInPlace() transposeInPlace()\endlink  function:
106<table class="example">
107<tr><th>Example:</th><th>Output:</th></tr>
108<tr><td>
109\include tut_arithmetic_transpose_inplace.cpp
110</td>
111<td>
112\verbinclude tut_arithmetic_transpose_inplace.out
113</td></tr></table>
114There is also the \link MatrixBase::adjointInPlace() adjointInPlace()\endlink function for complex matrices.
115
116\section TutorialArithmeticMatrixMul Matrix-matrix and matrix-vector multiplication
117
118Matrix-matrix multiplication is again done with \c operator*. Since vectors are a special
119case of matrices, they are implicitly handled there too, so matrix-vector product is really just a special
120case of matrix-matrix product, and so is vector-vector outer product. Thus, all these cases are handled by just
121two operators:
122\li binary operator * as in \c a*b
123\li compound operator *= as in \c a*=b (this multiplies on the right: \c a*=b is equivalent to <tt>a = a*b</tt>)
124
125<table class="example">
126<tr><th>Example:</th><th>Output:</th></tr>
127<tr><td>
128\include tut_arithmetic_matrix_mul.cpp
129</td>
130<td>
131\verbinclude tut_arithmetic_matrix_mul.out
132</td></tr></table>
133
134Note: if you read the above paragraph on expression templates and are worried that doing \c m=m*m might cause
135aliasing issues, be reassured for now: Eigen treats matrix multiplication as a special case and takes care of
136introducing a temporary here, so it will compile \c m=m*m as:
137\code
138tmp = m*m;
139m = tmp;
140\endcode
141If you know your matrix product can be safely evaluated into the destination matrix without aliasing issue, then you can use the \link MatrixBase::noalias() noalias()\endlink function to avoid the temporary, e.g.:
142\code
143c.noalias() += a * b;
144\endcode
145For more details on this topic, see the page on \ref TopicAliasing "aliasing".
146
147\b Note: for BLAS users worried about performance, expressions such as <tt>c.noalias() -= 2 * a.adjoint() * b;</tt> are fully optimized and trigger a single gemm-like function call.
148
149\section TutorialArithmeticDotAndCross Dot product and cross product
150
151For dot product and cross product, you need the \link MatrixBase::dot() dot()\endlink and \link MatrixBase::cross() cross()\endlink methods. Of course, the dot product can also be obtained as a 1x1 matrix as u.adjoint()*v.
152<table class="example">
153<tr><th>Example:</th><th>Output:</th></tr>
154<tr><td>
155\include tut_arithmetic_dot_cross.cpp
156</td>
157<td>
158\verbinclude tut_arithmetic_dot_cross.out
159</td></tr></table>
160
161Remember that cross product is only for vectors of size 3. Dot product is for vectors of any sizes.
162When using complex numbers, Eigen's dot product is conjugate-linear in the first variable and linear in the
163second variable.
164
165\section TutorialArithmeticRedux Basic arithmetic reduction operations
166Eigen also provides some reduction operations to reduce a given matrix or vector to a single value such as the sum (computed by \link DenseBase::sum() sum()\endlink), product (\link DenseBase::prod() prod()\endlink), or the maximum (\link DenseBase::maxCoeff() maxCoeff()\endlink) and minimum (\link DenseBase::minCoeff() minCoeff()\endlink) of all its coefficients.
167
168<table class="example">
169<tr><th>Example:</th><th>Output:</th></tr>
170<tr><td>
171\include tut_arithmetic_redux_basic.cpp
172</td>
173<td>
174\verbinclude tut_arithmetic_redux_basic.out
175</td></tr></table>
176
177The \em trace of a matrix, as returned by the function \link MatrixBase::trace() trace()\endlink, is the sum of the diagonal coefficients and can also be computed as efficiently using <tt>a.diagonal().sum()</tt>, as we will see later on.
178
179There also exist variants of the \c minCoeff and \c maxCoeff functions returning the coordinates of the respective coefficient via the arguments:
180
181<table class="example">
182<tr><th>Example:</th><th>Output:</th></tr>
183<tr><td>
184\include tut_arithmetic_redux_minmax.cpp
185</td>
186<td>
187\verbinclude tut_arithmetic_redux_minmax.out
188</td></tr></table>
189
190
191\section TutorialArithmeticValidity Validity of operations
192Eigen checks the validity of the operations that you perform. When possible,
193it checks them at compile time, producing compilation errors. These error messages can be long and ugly,
194but Eigen writes the important message in UPPERCASE_LETTERS_SO_IT_STANDS_OUT. For example:
195\code
196  Matrix3f m;
197  Vector4f v;
198  v = m*v;      // Compile-time error: YOU_MIXED_MATRICES_OF_DIFFERENT_SIZES
199\endcode
200
201Of course, in many cases, for example when checking dynamic sizes, the check cannot be performed at compile time.
202Eigen 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.
203
204\code
205  MatrixXf m(3,3);
206  VectorXf v(4);
207  v = m * v; // Run-time assertion failure here: "invalid matrix product"
208\endcode
209
210For more details on this topic, see \ref TopicAssertions "this page".
211
212*/
213
214}
215