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Using matrices as state types

odeint works well with a variety of different state types. It is not restricted to pure vector-wise types, like vector< double >, array< double , N >, fusion::vector< double , double >, etc. but also works with types having a different topology then simple vectors. Here, we show how odeint can be used with matrices as states type, in the next section we will show how can be used to solve ODEs defined on complex networks.

By default, odeint can be used with ublas::matrix< T > as state type for matrices. A simple example is a two-dimensional lattice of coupled phase oscillators. Other matrix types like mtl::dense_matrix or blitz arrays and matrices can used as well but need some kind of activation in order to work with odeint. This activation is described in following sections,

The definition of the system is

typedef boost::numeric::ublas::matrix< double > state_type;

struct two_dimensional_phase_lattice
{
    two_dimensional_phase_lattice( double gamma = 0.5 )
    : m_gamma( gamma ) { }

    void operator()( const state_type &x , state_type &dxdt , double /* t */ ) const
    {
        size_t size1 = x.size1() , size2 = x.size2();

        for( size_t i=1 ; i<size1-1 ; ++i )
        {
            for( size_t j=1 ; j<size2-1 ; ++j )
            {
                dxdt( i , j ) =
                        coupling_func( x( i + 1 , j ) - x( i , j ) ) +
                        coupling_func( x( i - 1 , j ) - x( i , j ) ) +
                        coupling_func( x( i , j + 1 ) - x( i , j ) ) +
                        coupling_func( x( i , j - 1 ) - x( i , j ) );
            }
        }

        for( size_t i=0 ; i<x.size1() ; ++i ) dxdt( i , 0 ) = dxdt( i , x.size2() -1 ) = 0.0;
        for( size_t j=0 ; j<x.size2() ; ++j ) dxdt( 0 , j ) = dxdt( x.size1() -1 , j ) = 0.0;
    }

    double coupling_func( double x ) const
    {
        return sin( x ) - m_gamma * ( 1.0 - cos( x ) );
    }

    double m_gamma;
};

In principle this is all. Please note, that the above code is far from being optimal. Better performance can be achieved if every interaction is only calculated once and iterators for columns and rows are used. Below are some visualizations of the evolution of this lattice equation.

phase_lattice_2d_0000 phase_lattice_2d_0100 phase_lattice_2d_1000

The full cpp for this example can be found here two_dimensional_phase_lattice.cpp.


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