G.3.2 Complex Vectors and Matrices
Static Semantics
The generic library
package Numerics.Generic_Complex_Arrays has the following declaration:
with Ada.Numerics.Generic_Real_Arrays, Ada.Numerics.Generic_Complex_Types;
generic
with package Real_Arrays
is new
Ada.Numerics.Generic_Real_Arrays (<>);
use Real_Arrays;
with package Complex_Types
is new
Ada.Numerics.Generic_Complex_Types (Real);
use Complex_Types;
package Ada.Numerics.Generic_Complex_Arrays
is
pragma Pure(Generic_Complex_Arrays);
-- Types
type Complex_Vector
is array (Integer
range <>)
of Complex;
type Complex_Matrix
is array (Integer
range <>,
Integer
range <>)
of Complex;
-- Subprograms for Complex_Vector types
-- Complex_Vector selection, conversion and composition operations
function Re (X : Complex_Vector)
return Real_Vector;
function Im (X : Complex_Vector)
return Real_Vector;
procedure Set_Re (X :
in out Complex_Vector;
Re :
in Real_Vector);
procedure Set_Im (X :
in out Complex_Vector;
Im :
in Real_Vector);
function Compose_From_Cartesian (Re : Real_Vector)
return Complex_Vector;
function Compose_From_Cartesian (Re, Im : Real_Vector)
return Complex_Vector;
function Modulus (X : Complex_Vector)
return Real_Vector;
function "
abs" (Right : Complex_Vector)
return Real_Vector
renames Modulus;
function Argument (X : Complex_Vector)
return Real_Vector;
function Argument (X : Complex_Vector;
Cycle : Real'Base)
return Real_Vector;
function Compose_From_Polar (Modulus, Argument : Real_Vector)
return Complex_Vector;
function Compose_From_Polar (Modulus, Argument : Real_Vector;
Cycle : Real'Base)
return Complex_Vector;
-- Complex_Vector arithmetic operations
function "+" (Right : Complex_Vector)
return Complex_Vector;
function "-" (Right : Complex_Vector)
return Complex_Vector;
function Conjugate (X : Complex_Vector)
return Complex_Vector;
function "+" (Left, Right : Complex_Vector) return Complex_Vector;
function "-" (Left, Right : Complex_Vector) return Complex_Vector;
function "*" (Left, Right : Complex_Vector) return Complex;
function "abs" (Right : Complex_Vector) return Complex;
-- Mixed Real_Vector and Complex_Vector arithmetic operations
function "+" (Left : Real_Vector;
Right : Complex_Vector) return Complex_Vector;
function "+" (Left : Complex_Vector;
Right : Real_Vector) return Complex_Vector;
function "-" (Left : Real_Vector;
Right : Complex_Vector) return Complex_Vector;
function "-" (Left : Complex_Vector;
Right : Real_Vector) return Complex_Vector;
function "*" (Left : Real_Vector; Right : Complex_Vector)
return Complex;
function "*" (Left : Complex_Vector; Right : Real_Vector)
return Complex;
-- Complex_Vector scaling operations
function "*" (Left : Complex;
Right : Complex_Vector) return Complex_Vector;
function "*" (Left : Complex_Vector;
Right : Complex) return Complex_Vector;
function "/" (Left : Complex_Vector;
Right : Complex) return Complex_Vector;
function "*" (Left : Real'Base;
Right : Complex_Vector) return Complex_Vector;
function "*" (Left : Complex_Vector;
Right : Real'Base) return Complex_Vector;
function "/" (Left : Complex_Vector;
Right : Real'Base) return Complex_Vector;
-- Other Complex_Vector operations
function Unit_Vector (Index : Integer;
Order : Positive;
First : Integer := 1)
return Complex_Vector;
-- Subprograms for Complex_Matrix types
-- Complex_Matrix selection, conversion and composition operations
function Re (X : Complex_Matrix)
return Real_Matrix;
function Im (X : Complex_Matrix)
return Real_Matrix;
procedure Set_Re (X :
in out Complex_Matrix;
Re :
in Real_Matrix);
procedure Set_Im (X :
in out Complex_Matrix;
Im :
in Real_Matrix);
function Compose_From_Cartesian (Re : Real_Matrix)
return Complex_Matrix;
function Compose_From_Cartesian (Re, Im : Real_Matrix)
return Complex_Matrix;
function Modulus (X : Complex_Matrix)
return Real_Matrix;
function "
abs" (Right : Complex_Matrix)
return Real_Matrix
renames Modulus;
function Argument (X : Complex_Matrix)
return Real_Matrix;
function Argument (X : Complex_Matrix;
Cycle : Real'Base)
return Real_Matrix;
function Compose_From_Polar (Modulus, Argument : Real_Matrix)
return Complex_Matrix;
function Compose_From_Polar (Modulus, Argument : Real_Matrix;
Cycle : Real'Base)
return Complex_Matrix;
-- Complex_Matrix arithmetic operations
function "+" (Right : Complex_Matrix)
return Complex_Matrix;
function "-" (Right : Complex_Matrix)
return Complex_Matrix;
function Conjugate (X : Complex_Matrix)
return Complex_Matrix;
function Transpose (X : Complex_Matrix)
return Complex_Matrix;
function "+" (Left, Right : Complex_Matrix) return Complex_Matrix;
function "-" (Left, Right : Complex_Matrix) return Complex_Matrix;
function "*" (Left, Right : Complex_Matrix) return Complex_Matrix;
function "*" (Left, Right : Complex_Vector) return Complex_Matrix;
function "*" (Left : Complex_Vector;
Right : Complex_Matrix) return Complex_Vector;
function "*" (Left : Complex_Matrix;
Right : Complex_Vector) return Complex_Vector;
-- Mixed Real_Matrix and Complex_Matrix arithmetic operations
function "+" (Left : Real_Matrix;
Right : Complex_Matrix) return Complex_Matrix;
function "+" (Left : Complex_Matrix;
Right : Real_Matrix) return Complex_Matrix;
function "-" (Left : Real_Matrix;
Right : Complex_Matrix) return Complex_Matrix;
function "-" (Left : Complex_Matrix;
Right : Real_Matrix) return Complex_Matrix;
function "*" (Left : Real_Matrix;
Right : Complex_Matrix) return Complex_Matrix;
function "*" (Left : Complex_Matrix;
Right : Real_Matrix) return Complex_Matrix;
function "*" (Left : Real_Vector;
Right : Complex_Vector) return Complex_Matrix;
function "*" (Left : Complex_Vector;
Right : Real_Vector) return Complex_Matrix;
function "*" (Left : Real_Vector;
Right : Complex_Matrix) return Complex_Vector;
function "*" (Left : Complex_Vector;
Right : Real_Matrix) return Complex_Vector;
function "*" (Left : Real_Matrix;
Right : Complex_Vector) return Complex_Vector;
function "*" (Left : Complex_Matrix;
Right : Real_Vector) return Complex_Vector;
-- Complex_Matrix scaling operations
function "*" (Left : Complex;
Right : Complex_Matrix) return Complex_Matrix;
function "*" (Left : Complex_Matrix;
Right : Complex) return Complex_Matrix;
function "/" (Left : Complex_Matrix;
Right : Complex) return Complex_Matrix;
function "*" (Left : Real'Base;
Right : Complex_Matrix) return Complex_Matrix;
function "*" (Left : Complex_Matrix;
Right : Real'Base) return Complex_Matrix;
function "/" (Left : Complex_Matrix;
Right : Real'Base) return Complex_Matrix;
-- Complex_Matrix inversion and related operations
function Solve (A : Complex_Matrix; X : Complex_Vector)
return Complex_Vector;
function Solve (A, X : Complex_Matrix)
return Complex_Matrix;
function Inverse (A : Complex_Matrix)
return Complex_Matrix;
function Determinant (A : Complex_Matrix)
return Complex;
-- Eigenvalues and vectors of a Hermitian matrix
function Eigenvalues(A : Complex_Matrix)
return Real_Vector;
procedure Eigensystem(A :
in Complex_Matrix;
Values :
out Real_Vector;
Vectors :
out Complex_Matrix);
-- Other Complex_Matrix operations
function Unit_Matrix (Order : Positive;
First_1, First_2 : Integer := 1)
return Complex_Matrix;
end Ada.Numerics.Generic_Complex_Arrays;
The library package Numerics.Complex_Arrays
is declared pure and defines the same types and subprograms as Numerics.Generic_Complex_Arrays,
except that the predefined type Float is systematically substituted for
Real'Base, and the Real_Vector and Real_Matrix types exported by Numerics.Real_Arrays
are systematically substituted for Real_Vector and Real_Matrix, and the
Complex type exported by Numerics.Complex_Types is systematically substituted
for Complex, throughout. Nongeneric equivalents for each of the other
predefined floating point types are defined similarly, with the names
Numerics.Short_Complex_Arrays, Numerics.Long_Complex_Arrays, etc.
Two types are defined and exported by Numerics.Generic_Complex_Arrays.
The composite type Complex_Vector is provided to represent a vector with
components of type Complex; it is defined as an unconstrained one-dimensional
array with an index of type Integer. The composite type Complex_Matrix
is provided to represent a matrix with components of type Complex; it
is defined as an unconstrained, two-dimensional array with indices of
type Integer.
The effect of the various subprograms is as described
below. In many cases they are described in terms of corresponding scalar
operations in Numerics.Generic_Complex_Types. Any exception raised by
those operations is propagated by the array subprogram. Moreover, any
constraints on the parameters and the accuracy of the result for each
individual component are as defined for the scalar operation.
In the case of those operations which are defined
to
involve an inner product, Constraint_Error may be raised if
an intermediate result has a component outside the range of Real'Base
even though the final mathematical result would not.
function Re (X : Complex_Vector) return Real_Vector;
function Im (X : Complex_Vector) return Real_Vector;
Each function returns a vector of the specified
Cartesian components of X. The index range of the result is X'Range.
procedure Set_Re (X : in out Complex_Vector; Re : in Real_Vector);
procedure Set_Im (X : in out Complex_Vector; Im : in Real_Vector);
Each procedure replaces the specified (Cartesian)
component of each of the components of X by the value of the matching
component of Re or Im; the other (Cartesian) component of each of the
components is unchanged. Constraint_Error is raised if X'Length is not
equal to Re'Length or Im'Length.
function Compose_From_Cartesian (Re : Real_Vector)
return Complex_Vector;
function Compose_From_Cartesian (Re, Im : Real_Vector)
return Complex_Vector;
Each function constructs a vector of Complex results
(in Cartesian representation) formed from given vectors of Cartesian
components; when only the real components are given, imaginary components
of zero are assumed. The index range of the result is Re'Range. Constraint_Error
is raised if Re'Length is not equal to Im'Length.
function Modulus (X : Complex_Vector) return Real_Vector;
function "abs" (Right : Complex_Vector) return Real_Vector
renames Modulus;
function Argument (X : Complex_Vector) return Real_Vector;
function Argument (X : Complex_Vector;
Cycle : Real'Base) return Real_Vector;
Each function calculates and returns a vector
of the specified polar components of X or Right using the corresponding
function in numerics.generic_complex_types. The index range of the result
is X'Range or Right'Range.
function Compose_From_Polar (Modulus, Argument : Real_Vector)
return Complex_Vector;
function Compose_From_Polar (Modulus, Argument : Real_Vector;
Cycle : Real'Base)
return Complex_Vector;
Each function constructs a vector of Complex results
(in Cartesian representation) formed from given vectors of polar components
using the corresponding function in numerics.generic_complex_types on
matching components of Modulus and Argument. The index range of the result
is Modulus'Range. Constraint_Error is raised if Modulus'Length is not
equal to Argument'Length.
function "+" (Right : Complex_Vector) return Complex_Vector;
function "-" (Right : Complex_Vector) return Complex_Vector;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of Right. The index range of the result is Right'Range.
function Conjugate (X : Complex_Vector) return Complex_Vector;
This function returns the result of applying the
appropriate function Conjugate in numerics.generic_complex_types to each
component of X. The index range of the result is X'Range.
function "+" (Left, Right : Complex_Vector) return Complex_Vector;
function "-" (Left, Right : Complex_Vector) return Complex_Vector;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of Left and the matching component of Right. The index range
of the result is Left'Range. Constraint_Error is raised if Left'Length
is not equal to Right'Length.
function "*" (Left, Right : Complex_Vector) return Complex;
This operation returns the inner product of Left
and Right. Constraint_Error is raised if Left'Length is not equal to
Right'Length. This operation involves an inner product.
function "abs" (Right : Complex_Vector) return Complex;
This operation returns the Hermitian L2-norm of
Right (the square root of the inner product of the vector with its conjugate).
function "+" (Left : Real_Vector;
Right : Complex_Vector) return Complex_Vector;
function "+" (Left : Complex_Vector;
Right : Real_Vector) return Complex_Vector;
function "-" (Left : Real_Vector;
Right : Complex_Vector) return Complex_Vector;
function "-" (Left : Complex_Vector;
Right : Real_Vector) return Complex_Vector;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of Left and the matching component of Right. The index range
of the result is Left'Range. Constraint_Error is raised if Left'Length
is not equal to Right'Length.
function "*" (Left : Real_Vector; Right : Complex_Vector) return Complex;
function "*" (Left : Complex_Vector; Right : Real_Vector) return Complex;
Each operation returns the inner product of Left
and Right. Constraint_Error is raised if Left'Length is not equal to
Right'Length. These operations involve an inner product.
function "*" (Left : Complex; Right : Complex_Vector) return Complex_Vector;
This operation returns the result of multiplying
each component of Right by the complex number Left using the appropriate
operation "*" in numerics.generic_complex_types. The index
range of the result is Right'Range.
function "*" (Left : Complex_Vector; Right : Complex) return Complex_Vector;
function "/" (Left : Complex_Vector; Right : Complex) return Complex_Vector;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of the vector Left and the complex number Right. The index
range of the result is Left'Range.
function "*" (Left : Real'Base;
Right : Complex_Vector) return Complex_Vector;
This operation returns the result of multiplying
each component of Right by the real number Left using the appropriate
operation "*" in numerics.generic_complex_types. The index
range of the result is Right'Range.
function "*" (Left : Complex_Vector;
Right : Real'Base) return Complex_Vector;
function "/" (Left : Complex_Vector;
Right : Real'Base) return Complex_Vector;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of the vector Left and the real number Right. The index range
of the result is Left'Range.
function Unit_Vector (Index : Integer;
Order : Positive;
First : Integer := 1) return Complex_Vector;
This function returns a
unit vector
with Order components and a lower bound of First. All components are
set to (0.0, 0.0) except for the Index component which is set to (1.0,
0.0). Constraint_Error is raised if Index < First, Index > First
+ Order – 1, or if First + Order – 1 > Integer'Last.
function Re (X : Complex_Matrix) return Real_Matrix;
function Im (X : Complex_Matrix) return Real_Matrix;
Each function returns a matrix of the specified
Cartesian components of X. The index ranges of the result are those of
X.
procedure Set_Re (X : in out Complex_Matrix; Re : in Real_Matrix);
procedure Set_Im (X : in out Complex_Matrix; Im : in Real_Matrix);
Each procedure replaces the specified (Cartesian)
component of each of the components of X by the value of the matching
component of Re or Im; the other (Cartesian) component of each of the
components is unchanged. Constraint_Error is raised if X'Length(1) is
not equal to Re'Length(1) or Im'Length(1) or if X'Length(2) is not equal
to Re'Length(2) or Im'Length(2).
function Compose_From_Cartesian (Re : Real_Matrix)
return Complex_Matrix;
function Compose_From_Cartesian (Re, Im : Real_Matrix)
return Complex_Matrix;
Each function constructs a matrix of Complex results
(in Cartesian representation) formed from given matrices of Cartesian
components; when only the real components are given, imaginary components
of zero are assumed. The index ranges of the result are those of Re.
Constraint_Error is raised if Re'Length(1) is not equal to Im'Length(1)
or Re'Length(2) is not equal to Im'Length(2).
function Modulus (X : Complex_Matrix) return Real_Matrix;
function "abs" (Right : Complex_Matrix) return Real_Matrix
renames Modulus;
function Argument (X : Complex_Matrix) return Real_Matrix;
function Argument (X : Complex_Matrix;
Cycle : Real'Base) return Real_Matrix;
Each function calculates and returns a matrix
of the specified polar components of X or Right using the corresponding
function in numerics.generic_complex_types. The index ranges of the result
are those of X or Right.
function Compose_From_Polar (Modulus, Argument : Real_Matrix)
return Complex_Matrix;
function Compose_From_Polar (Modulus, Argument : Real_Matrix;
Cycle : Real'Base)
return Complex_Matrix;
Each function constructs a matrix of Complex results
(in Cartesian representation) formed from given matrices of polar components
using the corresponding function in numerics.generic_complex_types on
matching components of Modulus and Argument. The index ranges of the
result are those of Modulus. Constraint_Error is raised if Modulus'Length(1)
is not equal to Argument'Length(1) or Modulus'Length(2) is not equal
to Argument'Length(2).
function "+" (Right : Complex_Matrix) return Complex_Matrix;
function "-" (Right : Complex_Matrix) return Complex_Matrix;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of Right. The index ranges of the result are those of Right.
function Conjugate (X : Complex_Matrix) return Complex_Matrix;
This function returns the result of applying the
appropriate function Conjugate in numerics.generic_complex_types to each
component of X. The index ranges of the result are those of X.
function Transpose (X : Complex_Matrix) return Complex_Matrix;
This function returns the transpose of a matrix
X. The first and second index ranges of the result are X'Range(2) and
X'Range(1) respectively.
function "+" (Left, Right : Complex_Matrix) return Complex_Matrix;
function "-" (Left, Right : Complex_Matrix) return Complex_Matrix;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of Left and the matching component of Right. The index ranges
of the result are those of Left. Constraint_Error is raised if Left'Length(1)
is not equal to Right'Length(1) or Left'Length(2) is not equal to Right'Length(2).
function "*" (Left, Right : Complex_Matrix) return Complex_Matrix;
This operation provides the standard mathematical
operation for matrix multiplication. The first and second index ranges
of the result are Left'Range(1) and Right'Range(2) respectively. Constraint_Error
is raised if Left'Length(2) is not equal to Right'Length(1). This operation
involves inner products.
function "*" (Left, Right : Complex_Vector) return Complex_Matrix;
This operation returns the outer product of a
(column) vector Left by a (row) vector Right using the appropriate operation
"*" in numerics.generic_complex_types for computing the individual
components. The first and second index ranges of the result are Left'Range
and Right'Range respectively.
function "*" (Left : Complex_Vector;
Right : Complex_Matrix) return Complex_Vector;
This operation provides the standard mathematical
operation for multiplication of a (row) vector Left by a matrix Right.
The index range of the (row) vector result is Right'Range(2). Constraint_Error
is raised if Left'Length is not equal to Right'Length(1). This operation
involves inner products.
function "*" (Left : Complex_Matrix;
Right : Complex_Vector) return Complex_Vector;
This operation provides the standard mathematical
operation for multiplication of a matrix Left by a (column) vector Right.
The index range of the (column) vector result is Left'Range(1). Constraint_Error
is raised if Left'Length(2) is not equal to Right'Length. This operation
involves inner products.
function "+" (Left : Real_Matrix;
Right : Complex_Matrix) return Complex_Matrix;
function "+" (Left : Complex_Matrix;
Right : Real_Matrix) return Complex_Matrix;
function "-" (Left : Real_Matrix;
Right : Complex_Matrix) return Complex_Matrix;
function "-" (Left : Complex_Matrix;
Right : Real_Matrix) return Complex_Matrix;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of Left and the matching component of Right. The index ranges
of the result are those of Left. Constraint_Error is raised if Left'Length(1)
is not equal to Right'Length(1) or Left'Length(2) is not equal to Right'Length(2).
function "*" (Left : Real_Matrix;
Right : Complex_Matrix) return Complex_Matrix;
function "*" (Left : Complex_Matrix;
Right : Real_Matrix) return Complex_Matrix;
Each operation provides the standard mathematical
operation for matrix multiplication. The first and second index ranges
of the result are Left'Range(1) and Right'Range(2) respectively. Constraint_Error
is raised if Left'Length(2) is not equal to Right'Length(1). These operations
involve inner products.
function "*" (Left : Real_Vector;
Right : Complex_Vector) return Complex_Matrix;
function "*" (Left : Complex_Vector;
Right : Real_Vector) return Complex_Matrix;
Each operation returns the outer product of a
(column) vector Left by a (row) vector Right using the appropriate operation
"*" in numerics.generic_complex_types for computing the individual
components. The first and second index ranges of the result are Left'Range
and Right'Range respectively.
function "*" (Left : Real_Vector;
Right : Complex_Matrix) return Complex_Vector;
function "*" (Left : Complex_Vector;
Right : Real_Matrix) return Complex_Vector;
Each operation provides the standard mathematical
operation for multiplication of a (row) vector Left by a matrix Right.
The index range of the (row) vector result is Right'Range(2). Constraint_Error
is raised if Left'Length is not equal to Right'Length(1). These operations
involve inner products.
function "*" (Left : Real_Matrix;
Right : Complex_Vector) return Complex_Vector;
function "*" (Left : Complex_Matrix;
Right : Real_Vector) return Complex_Vector;
Each operation provides the standard mathematical
operation for multiplication of a matrix Left by a (column) vector Right.
The index range of the (column) vector result is Left'Range(1). Constraint_Error
is raised if Left'Length(2) is not equal to Right'Length. These operations
involve inner products.
function "*" (Left : Complex; Right : Complex_Matrix) return Complex_Matrix;
This operation returns the result of multiplying
each component of Right by the complex number Left using the appropriate
operation "*" in numerics.generic_complex_types. The index
ranges of the result are those of Right.
function "*" (Left : Complex_Matrix; Right : Complex) return Complex_Matrix;
function "/" (Left : Complex_Matrix; Right : Complex) return Complex_Matrix;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of the matrix Left and the complex number Right. The index
ranges of the result are those of Left.
function "*" (Left : Real'Base;
Right : Complex_Matrix) return Complex_Matrix;
This operation returns the result of multiplying
each component of Right by the real number Left using the appropriate
operation "*" in numerics.generic_complex_types. The index
ranges of the result are those of Right.
function "*" (Left : Complex_Matrix;
Right : Real'Base) return Complex_Matrix;
function "/" (Left : Complex_Matrix;
Right : Real'Base) return Complex_Matrix;
Each operation returns the result of applying
the corresponding operation in numerics.generic_complex_types to each
component of the matrix Left and the real number Right. The index ranges
of the result are those of Left.
function Solve (A : Complex_Matrix; X : Complex_Vector) return Complex_Vector;
This function returns a vector Y such that X is
(nearly) equal to A * Y. This is the standard mathematical operation
for solving a single set of linear equations. The index range of the
result is A'Range(2). Constraint_Error is raised if A'Length(1), A'Length(2),
and X'Length are not equal. Constraint_Error is raised if the matrix
A is ill-conditioned.
function Solve (A, X : Complex_Matrix) return Complex_Matrix;
This function returns a matrix Y such that X is
(nearly) equal to A * Y. This is the standard mathematical operation
for solving several sets of linear equations. The index ranges of the
result are A'Range(2) and X'Range(2). Constraint_Error is raised if A'Length(1),
A'Length(2), and X'Length(1) are not equal. Constraint_Error is raised
if the matrix A is ill-conditioned.
function Inverse (A : Complex_Matrix) return Complex_Matrix;
This function returns a matrix B such that A *
B is (nearly) equal to the unit matrix. The index ranges of the result
are A'Range(2) and A'Range(1). Constraint_Error is raised if A'Length(1)
is not equal to A'Length(2). Constraint_Error is raised if the matrix
A is ill-conditioned.
function Determinant (A : Complex_Matrix) return Complex;
This function returns the determinant of the matrix
A. Constraint_Error is raised if A'Length(1) is not equal to A'Length(2).
function Eigenvalues(A : Complex_Matrix) return Real_Vector;
This function returns the eigenvalues of the Hermitian
matrix A as a vector sorted into order with the largest first. Constraint_Error
is raised if A'Length(1) is not equal to A'Length(2). The index range
of the result is A'Range(1). Argument_Error is raised if the matrix A
is not Hermitian.
procedure Eigensystem(A : in Complex_Matrix;
Values : out Real_Vector;
Vectors : out Complex_Matrix);
This procedure computes both the eigenvalues and
eigenvectors of the Hermitian matrix A. The out parameter Values is the
same as that obtained by calling the function Eigenvalues. The out parameter
Vectors is a matrix whose columns are the eigenvectors of the matrix
A. The order of the columns corresponds to the order of the eigenvalues.
The eigenvectors are mutually orthonormal, including when there are repeated
eigenvalues. Constraint_Error is raised if A'Length(1) is not equal to
A'Length(2). The index ranges of the parameter Vectors are those of A.
Argument_Error is raised if the matrix A is not Hermitian.
function Unit_Matrix (Order : Positive;
First_1, First_2 : Integer := 1)
return Complex_Matrix;
This function returns a square
unit matrix
with Order**2 components and lower bounds of First_1 and First_2 (for
the first and second index ranges respectively). All components are set
to (0.0, 0.0) except for the main diagonal, whose components are set
to (1.0, 0.0). Constraint_Error is raised if First_1 + Order –
1 > Integer'Last or First_2 + Order – 1 > Integer'Last.
Implementation Requirements
Accuracy requirements for the subprograms Solve,
Inverse, Determinant, Eigenvalues and Eigensystem are implementation
defined.
For operations not involving an inner product, the
accuracy requirements are those of the corresponding operations of the
type Real'Base and Complex in both the strict mode and the relaxed mode
(see
G.2).
For operations involving an inner product, no requirements
are specified in the relaxed mode. In the strict mode the modulus of
the absolute error of the inner product X*Y shall not exceed
g*abs(X)*abs(Y) where g is
defined as
g = X'Length * Real'Machine_Radix**(1 – Real'Model_Mantissa)
for mixed complex and real operands
g = sqrt(2.0) * X'Length * Real'Machine_Radix**(1 – Real'Model_Mantissa)
for two complex operands
For the L2-norm, no accuracy requirements are specified
in the relaxed mode. In the strict mode the relative error on the norm
shall not exceed g / 2.0 + 3.0 * Real'Model_Epsilon where g
has the definition appropriate for two complex operands.
Documentation Requirements
Implementations shall document any techniques used
to reduce cancellation errors such as extended precision arithmetic.
Implementation Permissions
The nongeneric equivalent packages may, but need
not, be actual instantiations of the generic package for the appropriate
predefined type.
Although many operations are defined in terms of
operations from numerics.generic_complex_types, they need not be implemented
by calling those operations provided that the effect is the same.
Implementation Advice
Implementations should implement the Solve and Inverse
functions using established techniques. Implementations are recommended
to refine the result by performing an iteration on the residuals; if
this is done then it should be documented.
It is not the intention that any special provision
should be made to determine whether a matrix is ill-conditioned or not.
The naturally occurring overflow (including division by zero) which will
result from executing these functions with an ill-conditioned matrix
and thus raise Constraint_Error is sufficient.
The test that a matrix is Hermitian should use the
equality operator to compare the real components and negation followed
by equality to compare the imaginary components (see
G.2.1).
Implementations should not perform operations on
mixed complex and real operands by first converting the real operand
to complex. See
G.1.1.