MumpsInterface

(class from pyomo.contrib.interior_point.linalg.mumps_interface)

class pyomo.contrib.interior_point.linalg.mumps_interface.MumpsInterface(par=1, comm=None, cntl_options=None, icntl_options=None)[source]

Bases: MumpsCentralizedAssembledLinearSolver, IPLinearSolverInterface

__init__(par=1, comm=None, cntl_options=None, icntl_options=None)[source]

Methods

`__init__`([par, comm, cntl_options, ...])
`do_back_solve`(rhs[, raise_on_error])	Perform back solve with Mumps.
`do_numeric_factorization`(matrix[, ...])	Perform Mumps factorization.
`do_symbolic_factorization`(matrix[, ...])	Perform Mumps analysis.
`getLogger`()
`getLoggerName`()
`get_cntl`(key)
`get_error_info`()
`get_icntl`(key)
`get_inertia`()
`get_info`(key)
`get_infog`(key)
`get_rinfo`(key)
`get_rinfog`(key)
`increase_memory_allocation`(factor)
`log_header`([include_error, extra_fields])
`log_info`()
`set_cntl`(key, value)
`set_icntl`(key, value)
`solve`(matrix, rhs[, raise_on_error])

Member Documentation

do_back_solve(rhs: ndarray | BlockVector, raise_on_error: bool = True) → Tuple[ndarray | BlockVector | None, LinearSolverResults][source]

Perform back solve with Mumps. Note that both do_symbolic_factorization and do_numeric_factorization should be called before do_back_solve.

Parameters:: rhs (numpy.ndarray or pyomo.contrib.pynumero.sparse.BlockVector) – The right hand side in matrix * x = rhs.
Returns:: result – The x in matrix * x = rhs. If rhs is a BlockVector, then, result will be a BlockVector with the same block structure as rhs.
Return type:: numpy.ndarray or pyomo.contrib.pynumero.sparse.BlockVector

do_numeric_factorization(matrix: spmatrix | BlockMatrix, raise_on_error: bool = True) → LinearSolverResults

Perform Mumps factorization. Note that do_symbolic_factorization should be called before do_numeric_factorization.

Parameters:: matrix (scipy.sparse.spmatrix or pyomo.contrib.pynumero.sparse.BlockMatrix) – This matrix must have the same nonzero structure as the matrix passed into do_symbolic_factorization. The matrix will be converted to coo format if it is not already in coo format. If sym is 1 or 2, the matrix will be converted to lower triangular.

do_symbolic_factorization(matrix: spmatrix | BlockMatrix, raise_on_error: bool = True) → LinearSolverResults

Perform Mumps analysis.

Parameters:: matrix (scipy.sparse.spmatrix or pyomo.contrib.pynumero.sparse.BlockMatrix) – This matrix must have the same nonzero structure as the matrix passed into do_numeric_factorization. The matrix will be converted to coo format if it is not already in coo format. If sym is 1 or 2, the matrix will be converted to lower triangular.