Index of Functions: A  B  C  D  E  F  G  H  I  J  K  L  M  N  O  P  Q  R  S  T  U  V  W  X 
Index Page
vprjpi_c

Table of contents
Procedure
Abstract
Required_Reading
Keywords
Brief_I/O
Detailed_Input
Detailed_Output
Parameters
Exceptions
Files
Particulars
Examples
Restrictions
Literature_References
Author_and_Institution
Version
Index_Entries

Procedure

   vprjpi_c ( Vector projection onto plane, inverted ) 

   void vprjpi_c ( ConstSpiceDouble    vin    [3],
                   ConstSpicePlane   * projpl,
                   ConstSpicePlane   * invpl,
                   SpiceDouble         vout   [3],
                   SpiceBoolean      * found       )

Abstract

   Find the vector in a specified plane that maps to a specified
   vector in another plane under orthogonal projection.

Required_Reading

   PLANES

Keywords

   GEOMETRY
   MATH
   PLANE
   VECTOR


Brief_I/O

   VARIABLE  I/O  DESCRIPTION
   --------  ---  --------------------------------------------------
   vin        I   The projected vector.
   projpl     I   Plane containing `vin'.
   invpl      I   Plane containing inverse image of `vin'.
   vout       O   Inverse projection of `vin'.
   found      O   Flag indicating whether `vout' could be calculated.

Detailed_Input

   vin,
   projpl,
   invpl       are, respectively, a 3-vector, a SPICE plane
               containing the vector, and a SPICE plane
               containing the inverse image of the vector under
               orthogonal projection onto `projpl'.

Detailed_Output

   vout        is the inverse orthogonal projection of `vin'. This
               is the vector lying in the plane `invpl' whose
               orthogonal projection onto the plane `projpl' is
               `vin'. `vout' is valid only when `found' (defined below)
               is SPICETRUE. Otherwise, `vout' is undefined.

   found       indicates whether the inverse orthogonal projection
               of `vin' could be computed. `found' is SPICETRUE if so,
               SPICEFALSE otherwise.

Parameters

   None.

Exceptions

   1)  If the normal vector of either input plane does not have unit
       length (allowing for round-off error), the error
       SPICE(NONUNITNORMAL) is signaled by a routine in the call tree
       of this routine.

   2)  If the geometric planes defined by `projpl' and `invpl' are
       orthogonal, or nearly so, the inverse orthogonal projection
       of `vin' may be undefined or have magnitude too large to
       represent with double precision numbers. In either such
       case, `found' will be set to SPICEFALSE.

   3)  Even when `found' is SPICETRUE, `vout' may be a vector of extremely
       large magnitude, perhaps so large that it is impractical to
       compute with it. It's up to you to make sure that this
       situation does not occur in your application of this routine.

Files

   None.

Particulars

   Projecting a vector orthogonally onto a plane can be thought of
   as finding the closest vector in the plane to the original vector.
   This "closest vector" always exists; it may be coincident with the
   original vector. Inverting an orthogonal projection means finding
   the vector in a specified plane whose orthogonal projection onto
   a second specified plane is a specified vector. The vector whose
   projection is the specified vector is the inverse projection of
   the specified vector, also called the "inverse image under
   orthogonal projection" of the specified vector. This routine
   finds the inverse orthogonal projection of a vector onto a plane.

   Related routines are vprjp_c, which projects a vector onto a plane
   orthogonally, and vproj_c, which projects a vector onto another
   vector orthogonally.

Examples

   1)   Suppose

           vin    =  ( 0.0, 1.0, 0.0 ),

        and that projpl has normal vector

           projn  =  ( 0.0, 0.0, 1.0 ).

        Also, let's suppose that invpl has normal vector and constant

           invn   =  ( 0.0, 2.0, 2.0 )
           invc   =    4.0.

        Then vin lies on the y-axis in the x-y plane, and we want to
        find the vector vout lying in invpl such that the orthogonal
        projection of vout the x-y plane is vin. Let the notation
        < a, b > indicate the inner product of vectors a and b.
        Since every point x in invpl satisfies the equation

           <  x,  (0.0, 2.0, 2.0)  >  =  4.0,

        we can verify by inspection that the vector

           ( 0.0, 1.0, 1.0 )

        is in invpl and differs from vin by a multiple of projn. So

           ( 0.0, 1.0, 1.0 )

        must be vout.

        To find this result using CSPICE, we can create the
        SPICE planes projpl and invpl using the code fragment

           nvp2pl_c  ( projn,  vin,  &projpl );
           nvc2pl_c  ( invn,   invc, &invpl  );

        and then perform the inverse projection using the call

           vprjpi_c ( vin, &projpl, &invpl, vout );

        vprjpi_c will return the value

           vout = ( 0.0, 1.0, 1.0 );

Restrictions

   1)  It is recommended that the input planes be created by one of
       the CSPICE routines

          nvc2pl_c ( Normal vector and constant to plane )
          nvp2pl_c ( Normal vector and point to plane    )
          psv2pl_c ( Point and spanning vectors to plane )

       In any case each input plane must have a unit length normal
       vector and a plane constant consistent with the normal
       vector.

Literature_References

   [1]  G. Thomas and R. Finney, "Calculus and Analytic Geometry,"
        7th Edition, Addison Wesley, 1988.

Author_and_Institution

   N.J. Bachman        (JPL)
   J. Diaz del Rio     (ODC Space)

Version

   -CSPICE Version 1.1.1, 25-AUG-2021 (JDR) (NJB)

       Edited the header to comply with NAIF standard.

       Added entry #1 to -Exceptions section, and entry #1 to -Restrictions.

   -CSPICE Version 1.1.0, 05-APR-2004 (NJB)

       Computation of LIMIT was re-structured to avoid
       run-time underflow warnings on some platforms.

   -CSPICE Version 1.0.0, 05-MAR-1999 (NJB)

Index_Entries

   vector projection onto plane inverted
Fri Dec 31 18:41:15 2021