AWS SDK for C++  1.9.128
AWS SDK for C++
Public Member Functions | List of all members
Aws::LocationService::Model::GeofenceGeometry Class Reference

#include <GeofenceGeometry.h>

Public Member Functions

 GeofenceGeometry ()
 
 GeofenceGeometry (Aws::Utils::Json::JsonView jsonValue)
 
GeofenceGeometryoperator= (Aws::Utils::Json::JsonView jsonValue)
 
Aws::Utils::Json::JsonValue Jsonize () const
 
const Aws::Vector< Aws::Vector< Aws::Vector< double > > > & GetPolygon () const
 
bool PolygonHasBeenSet () const
 
void SetPolygon (const Aws::Vector< Aws::Vector< Aws::Vector< double >>> &value)
 
void SetPolygon (Aws::Vector< Aws::Vector< Aws::Vector< double >>> &&value)
 
GeofenceGeometryWithPolygon (const Aws::Vector< Aws::Vector< Aws::Vector< double >>> &value)
 
GeofenceGeometryWithPolygon (Aws::Vector< Aws::Vector< Aws::Vector< double >>> &&value)
 
GeofenceGeometryAddPolygon (const Aws::Vector< Aws::Vector< double >> &value)
 
GeofenceGeometryAddPolygon (Aws::Vector< Aws::Vector< double >> &&value)
 

Detailed Description

Contains the geofence geometry details.

Amazon Location doesn't currently support polygons with holes, multipolygons, polygons that are wound clockwise, or that cross the antimeridian.

See Also:


AWS API Reference

Definition at line 34 of file GeofenceGeometry.h.

Constructor & Destructor Documentation

◆ GeofenceGeometry() [1/2]

Aws::LocationService::Model::GeofenceGeometry::GeofenceGeometry ( )

◆ GeofenceGeometry() [2/2]

Aws::LocationService::Model::GeofenceGeometry::GeofenceGeometry ( Aws::Utils::Json::JsonView  jsonValue)

Member Function Documentation

◆ AddPolygon() [1/2]

GeofenceGeometry& Aws::LocationService::Model::GeofenceGeometry::AddPolygon ( Aws::Vector< Aws::Vector< double >> &&  value)
inline

An array of 1 or more linear rings. A linear ring is an array of 4 or more vertices, where the first and last vertex are the same to form a closed boundary. Each vertex is a 2-dimensional point of the form: [longitude, latitude].

The first linear ring is an outer ring, describing the polygon's boundary. Subsequent linear rings may be inner or outer rings to describe holes and islands. Outer rings must list their vertices in counter-clockwise order around the ring's center, where the left side is the polygon's exterior. Inner rings must list their vertices in clockwise order, where the left side is the polygon's interior.

Definition at line 145 of file GeofenceGeometry.h.

◆ AddPolygon() [2/2]

GeofenceGeometry& Aws::LocationService::Model::GeofenceGeometry::AddPolygon ( const Aws::Vector< Aws::Vector< double >> &  value)
inline

An array of 1 or more linear rings. A linear ring is an array of 4 or more vertices, where the first and last vertex are the same to form a closed boundary. Each vertex is a 2-dimensional point of the form: [longitude, latitude].

The first linear ring is an outer ring, describing the polygon's boundary. Subsequent linear rings may be inner or outer rings to describe holes and islands. Outer rings must list their vertices in counter-clockwise order around the ring's center, where the left side is the polygon's exterior. Inner rings must list their vertices in clockwise order, where the left side is the polygon's interior.

Definition at line 132 of file GeofenceGeometry.h.

◆ GetPolygon()

const Aws::Vector<Aws::Vector<Aws::Vector<double> > >& Aws::LocationService::Model::GeofenceGeometry::GetPolygon ( ) const
inline

An array of 1 or more linear rings. A linear ring is an array of 4 or more vertices, where the first and last vertex are the same to form a closed boundary. Each vertex is a 2-dimensional point of the form: [longitude, latitude].

The first linear ring is an outer ring, describing the polygon's boundary. Subsequent linear rings may be inner or outer rings to describe holes and islands. Outer rings must list their vertices in counter-clockwise order around the ring's center, where the left side is the polygon's exterior. Inner rings must list their vertices in clockwise order, where the left side is the polygon's interior.

Definition at line 54 of file GeofenceGeometry.h.

◆ Jsonize()

Aws::Utils::Json::JsonValue Aws::LocationService::Model::GeofenceGeometry::Jsonize ( ) const

◆ operator=()

GeofenceGeometry& Aws::LocationService::Model::GeofenceGeometry::operator= ( Aws::Utils::Json::JsonView  jsonValue)

◆ PolygonHasBeenSet()

bool Aws::LocationService::Model::GeofenceGeometry::PolygonHasBeenSet ( ) const
inline

An array of 1 or more linear rings. A linear ring is an array of 4 or more vertices, where the first and last vertex are the same to form a closed boundary. Each vertex is a 2-dimensional point of the form: [longitude, latitude].

The first linear ring is an outer ring, describing the polygon's boundary. Subsequent linear rings may be inner or outer rings to describe holes and islands. Outer rings must list their vertices in counter-clockwise order around the ring's center, where the left side is the polygon's exterior. Inner rings must list their vertices in clockwise order, where the left side is the polygon's interior.

Definition at line 67 of file GeofenceGeometry.h.

◆ SetPolygon() [1/2]

void Aws::LocationService::Model::GeofenceGeometry::SetPolygon ( Aws::Vector< Aws::Vector< Aws::Vector< double >>> &&  value)
inline

An array of 1 or more linear rings. A linear ring is an array of 4 or more vertices, where the first and last vertex are the same to form a closed boundary. Each vertex is a 2-dimensional point of the form: [longitude, latitude].

The first linear ring is an outer ring, describing the polygon's boundary. Subsequent linear rings may be inner or outer rings to describe holes and islands. Outer rings must list their vertices in counter-clockwise order around the ring's center, where the left side is the polygon's exterior. Inner rings must list their vertices in clockwise order, where the left side is the polygon's interior.

Definition at line 93 of file GeofenceGeometry.h.

◆ SetPolygon() [2/2]

void Aws::LocationService::Model::GeofenceGeometry::SetPolygon ( const Aws::Vector< Aws::Vector< Aws::Vector< double >>> &  value)
inline

An array of 1 or more linear rings. A linear ring is an array of 4 or more vertices, where the first and last vertex are the same to form a closed boundary. Each vertex is a 2-dimensional point of the form: [longitude, latitude].

The first linear ring is an outer ring, describing the polygon's boundary. Subsequent linear rings may be inner or outer rings to describe holes and islands. Outer rings must list their vertices in counter-clockwise order around the ring's center, where the left side is the polygon's exterior. Inner rings must list their vertices in clockwise order, where the left side is the polygon's interior.

Definition at line 80 of file GeofenceGeometry.h.

◆ WithPolygon() [1/2]

GeofenceGeometry& Aws::LocationService::Model::GeofenceGeometry::WithPolygon ( Aws::Vector< Aws::Vector< Aws::Vector< double >>> &&  value)
inline

An array of 1 or more linear rings. A linear ring is an array of 4 or more vertices, where the first and last vertex are the same to form a closed boundary. Each vertex is a 2-dimensional point of the form: [longitude, latitude].

The first linear ring is an outer ring, describing the polygon's boundary. Subsequent linear rings may be inner or outer rings to describe holes and islands. Outer rings must list their vertices in counter-clockwise order around the ring's center, where the left side is the polygon's exterior. Inner rings must list their vertices in clockwise order, where the left side is the polygon's interior.

Definition at line 119 of file GeofenceGeometry.h.

◆ WithPolygon() [2/2]

GeofenceGeometry& Aws::LocationService::Model::GeofenceGeometry::WithPolygon ( const Aws::Vector< Aws::Vector< Aws::Vector< double >>> &  value)
inline

An array of 1 or more linear rings. A linear ring is an array of 4 or more vertices, where the first and last vertex are the same to form a closed boundary. Each vertex is a 2-dimensional point of the form: [longitude, latitude].

The first linear ring is an outer ring, describing the polygon's boundary. Subsequent linear rings may be inner or outer rings to describe holes and islands. Outer rings must list their vertices in counter-clockwise order around the ring's center, where the left side is the polygon's exterior. Inner rings must list their vertices in clockwise order, where the left side is the polygon's interior.

Definition at line 106 of file GeofenceGeometry.h.


The documentation for this class was generated from the following file: