LORENE
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Class Connection_flat. More...
#include <connection.h>
Public Member Functions | |
Connection_flat (const Connection_flat &) | |
Copy constructor. | |
virtual | ~Connection_flat () |
destructor | |
void | operator= (const Connection_flat &) |
Assignment to another Connection_flat . | |
virtual Tensor * | p_derive_cov (const Tensor &tens) const =0 |
Computes the covariant derivative ![]() ![]() | |
virtual Tensor * | p_divergence (const Tensor &tens) const =0 |
Computes the divergence of a tensor ![]() | |
virtual const Tensor & | ricci () const |
Computes (if not up to date) and returns the Ricci tensor associated with the current connection. | |
void | update (const Tensor_sym &delta_i) |
Update the connection when it is defined ab initio. | |
void | update (const Metric &met) |
Update the connection when it is associated with a metric. | |
const Map & | get_mp () const |
Returns the mapping. | |
const Tensor_sym & | get_delta () const |
Returns the tensor ![]() ![]() ![]() ![]() | |
Protected Member Functions | |
Connection_flat (const Map &, const Base_vect &) | |
Contructor from a triad, has to be defined in the derived classes. | |
void | del_deriv () const |
Deletes all the derived quantities. | |
void | set_der_0x0 () const |
Sets to 0x0 all the pointers on derived quantities. | |
Protected Attributes | |
const Map *const | mp |
Reference mapping. | |
const Base_vect *const | triad |
Triad ![]() | |
Tensor_sym | delta |
Tensor ![]() ![]() ![]() ![]() | |
bool | assoc_metric |
Indicates whether the connection is associated with a metric (in which case the Ricci tensor is symmetric, i.e. | |
Tensor * | p_ricci |
Pointer of the Ricci tensor associated with the connection. | |
Private Member Functions | |
void | fait_delta (const Metric &) |
Computes the difference ![]() | |
Private Attributes | |
const Metric_flat * | flat_met |
Flat metric with respect to which ![]() delta ) is defined. | |
Class Connection_flat.
()
Abstract class for connections associated with a flat metric.
Definition at line 354 of file connection.h.
Contructor from a triad, has to be defined in the derived classes.
Definition at line 77 of file connection_flat.C.
References Lorene::Connection::assoc_metric, Lorene::Connection::delta, and Lorene::Tensor::set_etat_zero().
Lorene::Connection_flat::Connection_flat | ( | const Connection_flat & | ci | ) |
Copy constructor.
Definition at line 87 of file connection_flat.C.
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virtual |
destructor
Definition at line 97 of file connection_flat.C.
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protectedinherited |
Deletes all the derived quantities.
Definition at line 205 of file connection.C.
References Lorene::Connection::p_ricci, and Lorene::Connection::set_der_0x0().
Computes the difference
Definition at line 278 of file connection.C.
References Lorene::Metric::con(), Lorene::Metric::cov(), Lorene::Connection::delta, Lorene::Tensor_sym::derive_cov(), Lorene::Connection::flat_met, and Lorene::Tensor::set().
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inlineinherited |
Returns the tensor
The connection coefficients with respect to the triad
Note that
delta}
(i,j,k) = Definition at line 271 of file connection.h.
References Lorene::Connection::delta.
Returns the mapping.
Definition at line 253 of file connection.h.
References Lorene::Connection::mp.
void Lorene::Connection_flat::operator= | ( | const Connection_flat & | ) |
Assignment to another Connection_flat
.
Definition at line 107 of file connection_flat.C.
Computes the covariant derivative
The extra index (with respect to the indices of \f$T\f$) of \f$\nabla T\f$ is chosen to be the \b last one. This convention agrees with that of MTW (see Eq. (10.17) of MTW). For instance, if \f$T\f$ is a 1-form, whose components w.r.t. the triad \f$e^i\f$ are \f$T_i\f$: \f$T=T_i \; e^i\f$, then the covariant derivative of \f$T\f$ is the bilinear form \f$\nabla T\f$ whose components \f$\nabla_j T_i\f$ are such that \f[ \nabla T = \nabla_j T_i \; e^i \otimes e^j \f] @param tens tensor \f$T\f$ @return pointer on the covariant derivative \f$\nabla T\f$ ; this pointer is polymorphe, i.e. it is a pointer on a \c Vector if the argument is a \c Scalar , and on a \c Tensor otherwise. NB: The corresponding memory is allocated by the method \c p_derive_cov() and must be deallocated by the user afterwards.
Reimplemented from Lorene::Connection.
Implemented in Lorene::Connection_fspher, and Lorene::Connection_fcart.
Computes the divergence of a tensor
The divergence is taken with respect of the last index of
where
tens | tensor ![]() |
Scalar
if Vector
, on a Vector
if Tensor
otherwise. NB: The corresponding memory is allocated by the method p_divergence()
and must be deallocated by the user afterwards. Reimplemented from Lorene::Connection.
Implemented in Lorene::Connection_fspher, and Lorene::Connection_fcart.
Computes (if not up to date) and returns the Ricci tensor associated with the current connection.
Reimplemented from Lorene::Connection.
Definition at line 121 of file connection_flat.C.
References Lorene::Connection::mp, Lorene::Connection::p_ricci, Lorene::Tensor::set_etat_zero(), and Lorene::Connection::triad.
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protectedinherited |
Sets to 0x0
all the pointers on derived quantities.
Definition at line 213 of file connection.C.
References Lorene::Connection::p_ricci.
Update the connection when it is associated with a metric.
met | Metric to which the connection is associated |
Definition at line 255 of file connection.C.
References Lorene::Connection::assoc_metric, Lorene::Connection::del_deriv(), Lorene::Connection::fait_delta(), and Lorene::Connection::flat_met.
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inherited |
Update the connection when it is defined ab initio.
delta_i | tensor ![]() ![]() ![]() ![]() ![]() |
Definition at line 235 of file connection.C.
References Lorene::Connection::assoc_metric, Lorene::Connection::del_deriv(), Lorene::Connection::delta, Lorene::Connection::flat_met, Lorene::Tensor::get_index_type(), Lorene::Tensor::get_valence(), Lorene::Tensor_sym::sym_index1(), and Lorene::Tensor_sym::sym_index2().
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protectedinherited |
Indicates whether the connection is associated with a metric (in which case the Ricci tensor is symmetric, i.e.
the actual type of p_ricci
is a Sym_tensor
)
Definition at line 147 of file connection.h.
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protectedinherited |
Tensor
The connection coefficients with respect to the triad
Note that
Definition at line 141 of file connection.h.
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privateinherited |
Flat metric with respect to which delta
) is defined.
Definition at line 156 of file connection.h.
Reference mapping.
Definition at line 119 of file connection.h.
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mutableprotectedinherited |
Pointer of the Ricci tensor associated with the connection.
Definition at line 164 of file connection.h.
Triad
Definition at line 124 of file connection.h.