# File LineSurface.hpp¶

namespace Acts

Note

This file is foreseen for the Geometry module to replace Extent

Note

this is foreseen for the ‘Geometry’ module

class LineSurface : public Acts::Surface
#include <Acts/Surfaces/LineSurface.hpp>

Base class for a linear surfaces in the TrackingGeometry to describe dirft tube, straw like detectors or the Perigee It inherits from Surface.

Note

It leaves the type() method virtual, so it can not be instantiated

Subclassed by Acts::PerigeeSurface, Acts::StrawSurface

Public Functions

LineSurface() = delete
~LineSurface() override = default
virtual AlignmentToPathMatrix alignmentToPathDerivative(const GeometryContext &gctx, const FreeVector &parameters) const final

Calculate the derivative of path length at the geometry constraint or point-of-closest-approach w.r.t.

alignment parameters of the surface (i.e. local frame origin in global 3D Cartesian coordinates and its rotation represented with extrinsic Euler angles)

Parameters
• gctx – The current geometry context object, e.g. alignment

• parameters – is the free parameters

Returns

Derivative of path length w.r.t. the alignment parameters

virtual Vector3 binningPosition(const GeometryContext &gctx, BinningValue bValue) const final

The binning position is the position calcualted for a certain binning type.

Parameters
• gctx – The current geometry context object, e.g. alignment

• bValue – is the binning type to be used

Returns

position that can beused for this binning

virtual const SurfaceBounds &bounds() const final

This method returns the bounds of the Surface by reference */.

virtual BoundToFreeMatrix boundToFreeJacobian(const GeometryContext &gctx, const BoundVector &boundParams) const final

Calculate the jacobian from local to global which the surface knows best, hence the calculation is done here.

Parameters
• gctx – The current geometry context object, e.g. alignment

• boundParams – is the bound parameters vector

Returns

Jacobian from local to global

virtual FreeToPathMatrix freeToPathDerivative(const GeometryContext &gctx, const FreeVector &parameters) const final

Calculate the derivative of path length at the geometry constraint or point-of-closest-approach w.r.t.

free parameters

Parameters
• gctx – The current geometry context object, e.g. alignment

• parameters – is the free parameters

Returns

Derivative of path length w.r.t. free parameters

virtual Result<Vector2> globalToLocal(const GeometryContext &gctx, const Vector3 &position, const Vector3 &momentum, double tolerance = s_onSurfaceTolerance) const final

Specified for LineSurface: global to local method without dynamic memory allocation.

This method is the true global->local transformation.

makes use of globalToLocal and indicates the sign of the Acts::eBoundLoc0 by the given momentum

The calculation of the sign of the radius (or $$d_0$$

) can be done as follows:

May

$$\vec d = \vec m - \vec c$$ denote the difference between the center of the line and the global position of the measurement/predicted state, then $$\vec d$$ lies within the so called measurement plane. The measurement plane is determined by the two orthogonal vectors $$\vec{measY}= \vec{Acts::eBoundLoc1}$$ and $$\vec{measX} = \vec{measY} \times \frac{\vec{p}}{|\vec{p}|}$$.

The sign of the radius ( $$d_{0}$$ ) is then defined by the projection of $$\vec{d}$$ onto $$\vec{measX}$$:$$sign = -sign(\vec{d} \cdot \vec{measX})$$

Parameters
• gctx – The current geometry context object, e.g. alignment

• position – global 3D position - considered to be on surface but not inside bounds (check is done)

• momentum – global 3D momentum representation (optionally ignored)

• tolerance – (unused)

Returns

a Result<Vector2> which can be !ok() if the operation fails

virtual SurfaceIntersection intersect(const GeometryContext &gctx, const Vector3 &position, const Vector3 &direction, const BoundaryCheck &bcheck = false) const final

Straight line intersection schema.

mathematical motivation: Given two lines in parameteric form:

• $$\vec l_{a}(\lambda) = \vec m_a + \lambda \cdot \vec e_{a}$$

• $$\vec l_{b}(\mu) = \vec m_b + \mu \cdot \vec e_{b}$$ the vector between any two points on the two lines is given by:

• $$\vec s(\lambda, \mu) = \vec l_{b} - l_{a} = \vec m_{ab} + \mu \cdot \vec e_{b} - \lambda \cdot \vec e_{a}$$

,

when

$$\vec m_{ab} = \vec m_{b} - \vec m_{a}$$.$$\vec s(u, \mu_0)$$ denotes the vector between the two closest points $$\vec l_{a,0} = l_{a}(u)$$ and $$\vec l_{b,0} = l_{b}(\mu_0)$$ and is perpendicular to both, $$\vec e_{a}$$ and $$\vec e_{b}$$.

This results in a system of two linear equations:

• (i) $$0 = \vec s(u, \mu_0) \cdot \vec e_a = \vec m_ab \cdot \vec e_a + \mu_0 \vec e_a \cdot \vec e_b - u$$

• (ii) $$0 = \vec s(u, \mu_0) \cdot \vec e_b = \vec m_ab \cdot \vec e_b + \mu_0 - u \vec e_b \cdot \vec e_a$$

Solving (i), (ii) for $$u$$ and $$\mu_0$$ yields:

• $$u = \frac{(\vec m_ab \cdot \vec e_a)-(\vec m_ab \cdot \vec e_b)(\vec e_a \cdot \vec e_b)}{1-(\vec e_a \cdot \vec e_b)^2}$$

• $$\mu_0 = - \frac{(\vec m_ab \cdot \vec e_b)-(\vec m_ab \cdot \vec e_a)(\vec e_a \cdot \vec e_b)}{1-(\vec e_a \cdot \vec e_b)^2}$$

Note

exptected to be normalized

Parameters
• gctx – The current geometry context object, e.g. alignment

• position – The global position as a starting point

• direction – The global direction at the starting point

• bcheck – The boundary check directive for the estimate

Returns

is the intersection object

virtual ActsMatrix<2, 3> localCartesianToBoundLocalDerivative(const GeometryContext &gctx, const Vector3 &position) const final

Calculate the derivative of bound track parameters local position w.r.t.

position in local 3D Cartesian coordinates

Parameters
• gctx – The current geometry context object, e.g. alignment

• position – The position of the paramters in global

Returns

Derivative of bound local position w.r.t. position in local 3D cartesian coordinates

virtual Vector3 localToGlobal(const GeometryContext &gctx, const Vector2 &lposition, const Vector3 &momentum) const final

Local to global transformation for line surfaces the momentum is used in order to interpret the drift radius.

Parameters
• gctx – The current geometry context object, e.g. alignment

• lposition – is the local position to be transformed

• momentum – is the global momentum (used to sign the closest approach)

Returns

global position by value

virtual std::string name() const override

Return properly formatted class name for screen output */.

virtual Vector3 normal(const GeometryContext &gctx, const Vector2 &lposition) const final

Normal vector return.

Parameters
• gctx – The current geometry context object, e.g. alignment

• lposition – is the local position is ignored

Returns

a Vector3 by value

LineSurface &operator=(const LineSurface &other)

Assignment operator.

Parameters

other – is the source surface dor copying

virtual double pathCorrection(const GeometryContext &gctx, const Vector3 &position, const Vector3 &momentum) const override

the pathCorrection for derived classes with thickness is by definition 1 for LineSurfaces

Note

input parameters are ignored

Note

there’s no material associated to the line surface

virtual RotationMatrix3 referenceFrame(const GeometryContext &gctx, const Vector3 &position, const Vector3 &momentum) const final

Return the measurement frame - this is needed for alignment, in particular.

for StraightLine and Perigee Surface

• the default implementation is the RotationMatrix3 of the transform

Parameters
• gctx – The current geometry context object, e.g. alignment

• position – is the global position where the measurement frame is constructed

• momentum – is the momentum used for the measurement frame construction

Returns

is a rotation matrix that indicates the measurement frame

Protected Functions

LineSurface(const Transform3 &transform, double radius, double halez)

Constructor from Transform3 and bounds.

Parameters
• transform – The transform that positions the surface in the global frame

• halez – The half length in z

LineSurface(const Transform3 &transform, std::shared_ptr<const LineBounds> lbounds = nullptr)

Constructor from Transform3 and a shared bounds object.

Parameters
• transform – The transform that positions the surface in the global frame

• lbounds – The bounds describing the straw dimensions, can be optionally nullptr

LineSurface(std::shared_ptr<const LineBounds> lbounds, const DetectorElementBase &detelement)

Constructor from DetectorElementBase : Element proxy.

Parameters
• lbounds – The bounds describing the straw dimensions

• detelement – for which this surface is (at least) one representation

LineSurface(const LineSurface &other)

Copy constructor.

Parameters

other – The source surface for copying

LineSurface(const GeometryContext &gctx, const LineSurface &other, const Transform3 &shift)

Copy constructor - with shift.

Parameters
• gctx – The current geometry context object, e.g. alignment

• other – is the source cone surface

• shift – is the additional transform applied after copying

Protected Attributes

std::shared_ptr<const LineBounds> m_bounds

bounds (shared)

Private Functions

bool globalToLocalPlain(const GeometryContext &gctx, const Vector3 &position, const Vector3 &momentum, Vector2 &lposition) const

helper function to apply the globalToLocal with out transform

Parameters
• gctx – The current geometry context object, e.g. alignment

• position – is the global position

• momentum – is the momentum

• lposition – is the local position to be filled