diff options
Diffstat (limited to 'ot/lp/emd_wrap.pyx')
-rw-r--r-- | ot/lp/emd_wrap.pyx | 82 |
1 files changed, 42 insertions, 40 deletions
diff --git a/ot/lp/emd_wrap.pyx b/ot/lp/emd_wrap.pyx index 6039e1f..26d3330 100644 --- a/ot/lp/emd_wrap.pyx +++ b/ot/lp/emd_wrap.pyx @@ -15,56 +15,57 @@ cimport cython cdef extern from "EMD.h": - int EMD_wrap(int n1,int n2, double *X, double *Y,double *D, double *G, double *cost, int numItermax) + int EMD_wrap(int n1,int n2, double *X, double *Y,double *D, double *G, double *cost, int max_iter) cdef enum ProblemType: INFEASIBLE, OPTIMAL, UNBOUNDED @cython.boundscheck(False) @cython.wraparound(False) -def emd_c( np.ndarray[double, ndim=1, mode="c"] a,np.ndarray[double, ndim=1, mode="c"] b,np.ndarray[double, ndim=2, mode="c"] M, int numItermax): +def emd_c( np.ndarray[double, ndim=1, mode="c"] a,np.ndarray[double, ndim=1, mode="c"] b,np.ndarray[double, ndim=2, mode="c"] M, int max_iter): """ Solves the Earth Movers distance problem and returns the optimal transport matrix - + gamm=emd(a,b,M) - + .. math:: - \gamma = arg\min_\gamma <\gamma,M>_F - + \gamma = arg\min_\gamma <\gamma,M>_F + s.t. \gamma 1 = a - - \gamma^T 1= b - + + \gamma^T 1= b + \gamma\geq 0 where : - + - M is the metric cost matrix - a and b are the sample weights - + Parameters ---------- a : (ns,) ndarray, float64 - source histogram + source histogram b : (nt,) ndarray, float64 target histogram M : (ns,nt) ndarray, float64 - loss matrix - numItermax : int - Maximum number of iterations made by the LP solver. - - + loss matrix + max_iter : int + The maximum number of iterations before stopping the optimization + algorithm if it has not converged. + + Returns ------- gamma: (ns x nt) ndarray Optimal transportation matrix for the given parameters - + """ cdef int n1= M.shape[0] cdef int n2= M.shape[1] cdef float cost=0 cdef np.ndarray[double, ndim=2, mode="c"] G=np.zeros([n1, n2]) - + if not len(a): a=np.ones((n1,))/n1 @@ -72,7 +73,7 @@ def emd_c( np.ndarray[double, ndim=1, mode="c"] a,np.ndarray[double, ndim=1, mod b=np.ones((n2,))/n2 # calling the function - cdef int resultSolver = EMD_wrap(n1,n2,<double*> a.data,<double*> b.data,<double*> M.data,<double*> G.data,<double*> &cost, numItermax) + cdef int resultSolver = EMD_wrap(n1,n2,<double*> a.data,<double*> b.data,<double*> M.data,<double*> G.data,<double*> &cost, max_iter) if resultSolver != OPTIMAL: if resultSolver == INFEASIBLE: print("Problem infeasible. Try to increase numItermax.") @@ -83,49 +84,50 @@ def emd_c( np.ndarray[double, ndim=1, mode="c"] a,np.ndarray[double, ndim=1, mod @cython.boundscheck(False) @cython.wraparound(False) -def emd2_c( np.ndarray[double, ndim=1, mode="c"] a,np.ndarray[double, ndim=1, mode="c"] b,np.ndarray[double, ndim=2, mode="c"] M, int numItermax): +def emd2_c( np.ndarray[double, ndim=1, mode="c"] a,np.ndarray[double, ndim=1, mode="c"] b,np.ndarray[double, ndim=2, mode="c"] M, int max_iter): """ Solves the Earth Movers distance problem and returns the optimal transport loss - + gamm=emd(a,b,M) - + .. math:: - \gamma = arg\min_\gamma <\gamma,M>_F - + \gamma = arg\min_\gamma <\gamma,M>_F + s.t. \gamma 1 = a - - \gamma^T 1= b - + + \gamma^T 1= b + \gamma\geq 0 where : - + - M is the metric cost matrix - a and b are the sample weights - + Parameters ---------- a : (ns,) ndarray, float64 - source histogram + source histogram b : (nt,) ndarray, float64 target histogram M : (ns,nt) ndarray, float64 - loss matrix - numItermax : int - Maximum number of iterations made by the LP solver. - - + loss matrix + max_iter : int + The maximum number of iterations before stopping the optimization + algorithm if it has not converged. + + Returns ------- gamma: (ns x nt) ndarray Optimal transportation matrix for the given parameters - + """ cdef int n1= M.shape[0] cdef int n2= M.shape[1] cdef float cost=0 cdef np.ndarray[double, ndim=2, mode="c"] G=np.zeros([n1, n2]) - + if not len(a): a=np.ones((n1,))/n1 @@ -133,13 +135,13 @@ def emd2_c( np.ndarray[double, ndim=1, mode="c"] a,np.ndarray[double, ndim=1, mo b=np.ones((n2,))/n2 # calling the function - cdef int resultSolver = EMD_wrap(n1,n2,<double*> a.data,<double*> b.data,<double*> M.data,<double*> G.data,<double*> &cost, numItermax) + cdef int resultSolver = EMD_wrap(n1,n2,<double*> a.data,<double*> b.data,<double*> M.data,<double*> G.data,<double*> &cost, max_iter) if resultSolver != OPTIMAL: if resultSolver == INFEASIBLE: print("Problem infeasible. Try to inscrease numItermax.") elif resultSolver == UNBOUNDED: print("Problem unbounded") - + cost=0 for i in range(n1): for j in range(n2): |