Generateurv2/backend/env/lib/python3.10/site-packages/sympy/vector/dyadic.py

from typing import Type

from sympy.vector.basisdependent import (BasisDependent, BasisDependentAdd,
                                         BasisDependentMul, BasisDependentZero)
from sympy.core import S, Pow
from sympy.core.expr import AtomicExpr
from sympy import ImmutableMatrix as Matrix
import sympy.vector


class Dyadic(BasisDependent):
    """
    Super class for all Dyadic-classes.

    References
    ==========

    .. [1] https://en.wikipedia.org/wiki/Dyadic_tensor
    .. [2] Kane, T., Levinson, D. Dynamics Theory and Applications. 1985
           McGraw-Hill

    """

    _op_priority = 13.0

    _expr_type = None  # type: Type[Dyadic]
    _mul_func = None  # type: Type[Dyadic]
    _add_func = None  # type: Type[Dyadic]
    _zero_func = None  # type: Type[Dyadic]
    _base_func = None  # type: Type[Dyadic]
    zero = None  # type: DyadicZero

    @property
    def components(self):
        """
        Returns the components of this dyadic in the form of a
        Python dictionary mapping BaseDyadic instances to the
        corresponding measure numbers.

        """
        # The '_components' attribute is defined according to the
        # subclass of Dyadic the instance belongs to.
        return self._components

    def dot(self, other):
        """
        Returns the dot product(also called inner product) of this
        Dyadic, with another Dyadic or Vector.
        If 'other' is a Dyadic, this returns a Dyadic. Else, it returns
        a Vector (unless an error is encountered).

        Parameters
        ==========

        other : Dyadic/Vector
            The other Dyadic or Vector to take the inner product with

        Examples
        ========

        >>> from sympy.vector import CoordSys3D
        >>> N = CoordSys3D('N')
        >>> D1 = N.i.outer(N.j)
        >>> D2 = N.j.outer(N.j)
        >>> D1.dot(D2)
        (N.i|N.j)
        >>> D1.dot(N.j)
        N.i

        """

        Vector = sympy.vector.Vector
        if isinstance(other, BasisDependentZero):
            return Vector.zero
        elif isinstance(other, Vector):
            outvec = Vector.zero
            for k, v in self.components.items():
                vect_dot = k.args[1].dot(other)
                outvec += vect_dot * v * k.args[0]
            return outvec
        elif isinstance(other, Dyadic):
            outdyad = Dyadic.zero
            for k1, v1 in self.components.items():
                for k2, v2 in other.components.items():
                    vect_dot = k1.args[1].dot(k2.args[0])
                    outer_product = k1.args[0].outer(k2.args[1])
                    outdyad += vect_dot * v1 * v2 * outer_product
            return outdyad
        else:
            raise TypeError("Inner product is not defined for " +
                            str(type(other)) + " and Dyadics.")

    def __and__(self, other):
        return self.dot(other)

    __and__.__doc__ = dot.__doc__

    def cross(self, other):
        """
        Returns the cross product between this Dyadic, and a Vector, as a
        Vector instance.

        Parameters
        ==========

        other : Vector
            The Vector that we are crossing this Dyadic with

        Examples
        ========

        >>> from sympy.vector import CoordSys3D
        >>> N = CoordSys3D('N')
        >>> d = N.i.outer(N.i)
        >>> d.cross(N.j)
        (N.i|N.k)

        """

        Vector = sympy.vector.Vector
        if other == Vector.zero:
            return Dyadic.zero
        elif isinstance(other, Vector):
            outdyad = Dyadic.zero
            for k, v in self.components.items():
                cross_product = k.args[1].cross(other)
                outer = k.args[0].outer(cross_product)
                outdyad += v * outer
            return outdyad
        else:
            raise TypeError(str(type(other)) + " not supported for " +
                            "cross with dyadics")

    def __xor__(self, other):
        return self.cross(other)

    __xor__.__doc__ = cross.__doc__

    def to_matrix(self, system, second_system=None):
        """
        Returns the matrix form of the dyadic with respect to one or two
        coordinate systems.

        Parameters
        ==========

        system : CoordSys3D
            The coordinate system that the rows and columns of the matrix
            correspond to. If a second system is provided, this
            only corresponds to the rows of the matrix.
        second_system : CoordSys3D, optional, default=None
            The coordinate system that the columns of the matrix correspond
            to.

        Examples
        ========

        >>> from sympy.vector import CoordSys3D
        >>> N = CoordSys3D('N')
        >>> v = N.i + 2*N.j
        >>> d = v.outer(N.i)
        >>> d.to_matrix(N)
        Matrix([
        [1, 0, 0],
        [2, 0, 0],
        [0, 0, 0]])
        >>> from sympy import Symbol
        >>> q = Symbol('q')
        >>> P = N.orient_new_axis('P', q, N.k)
        >>> d.to_matrix(N, P)
        Matrix([
        [  cos(q),   -sin(q), 0],
        [2*cos(q), -2*sin(q), 0],
        [       0,         0, 0]])

        """

        if second_system is None:
            second_system = system

        return Matrix([i.dot(self).dot(j) for i in system for j in
                       second_system]).reshape(3, 3)

    def _div_helper(one, other):
        """ Helper for division involving dyadics """
        if isinstance(one, Dyadic) and isinstance(other, Dyadic):
            raise TypeError("Cannot divide two dyadics")
        elif isinstance(one, Dyadic):
            return DyadicMul(one, Pow(other, S.NegativeOne))
        else:
            raise TypeError("Cannot divide by a dyadic")


class BaseDyadic(Dyadic, AtomicExpr):
    """
    Class to denote a base dyadic tensor component.
    """

    def __new__(cls, vector1, vector2):
        Vector = sympy.vector.Vector
        BaseVector = sympy.vector.BaseVector
        VectorZero = sympy.vector.VectorZero
        # Verify arguments
        if not isinstance(vector1, (BaseVector, VectorZero)) or \
                not isinstance(vector2, (BaseVector, VectorZero)):
            raise TypeError("BaseDyadic cannot be composed of non-base " +
                            "vectors")
        # Handle special case of zero vector
        elif vector1 == Vector.zero or vector2 == Vector.zero:
            return Dyadic.zero
        # Initialize instance
        obj = super().__new__(cls, vector1, vector2)
        obj._base_instance = obj
        obj._measure_number = 1
        obj._components = {obj: S.One}
        obj._sys = vector1._sys
        obj._pretty_form = ('(' + vector1._pretty_form + '|' +
                             vector2._pretty_form + ')')
        obj._latex_form = ('(' + vector1._latex_form + "{|}" +
                           vector2._latex_form + ')')

        return obj

    def _sympystr(self, printer):
        return "({}|{})".format(
            printer._print(self.args[0]), printer._print(self.args[1]))


class DyadicMul(BasisDependentMul, Dyadic):
    """ Products of scalars and BaseDyadics """

    def __new__(cls, *args, **options):
        obj = BasisDependentMul.__new__(cls, *args, **options)
        return obj

    @property
    def base_dyadic(self):
        """ The BaseDyadic involved in the product. """
        return self._base_instance

    @property
    def measure_number(self):
        """ The scalar expression involved in the definition of
        this DyadicMul.
        """
        return self._measure_number


class DyadicAdd(BasisDependentAdd, Dyadic):
    """ Class to hold dyadic sums """

    def __new__(cls, *args, **options):
        obj = BasisDependentAdd.__new__(cls, *args, **options)
        return obj

    def _sympystr(self, printer):
        items = list(self.components.items())
        items.sort(key=lambda x: x[0].__str__())
        return " + ".join(printer._print(k * v) for k, v in items)


class DyadicZero(BasisDependentZero, Dyadic):
    """
    Class to denote a zero dyadic
    """

    _op_priority = 13.1
    _pretty_form = '(0|0)'
    _latex_form = r'(\mathbf{\hat{0}}|\mathbf{\hat{0}})'

    def __new__(cls):
        obj = BasisDependentZero.__new__(cls)
        return obj


Dyadic._expr_type = Dyadic
Dyadic._mul_func = DyadicMul
Dyadic._add_func = DyadicAdd
Dyadic._zero_func = DyadicZero
Dyadic._base_func = BaseDyadic
Dyadic.zero = DyadicZero()
test 2022-06-24 17:14:37 +02:00			`from typing import Type`

			`from sympy.vector.basisdependent import (BasisDependent, BasisDependentAdd,`
			`BasisDependentMul, BasisDependentZero)`
			`from sympy.core import S, Pow`
			`from sympy.core.expr import AtomicExpr`
			`from sympy import ImmutableMatrix as Matrix`
			`import sympy.vector`


			`class Dyadic(BasisDependent):`
			`"""`
			`Super class for all Dyadic-classes.`

			`References`
			`==========`

			`.. [1] https://en.wikipedia.org/wiki/Dyadic_tensor`
			`.. [2] Kane, T., Levinson, D. Dynamics Theory and Applications. 1985`
			`McGraw-Hill`

			`"""`

			`_op_priority = 13.0`

			`_expr_type = None # type: Type[Dyadic]`
			`_mul_func = None # type: Type[Dyadic]`
			`_add_func = None # type: Type[Dyadic]`
			`_zero_func = None # type: Type[Dyadic]`
			`_base_func = None # type: Type[Dyadic]`
			`zero = None # type: DyadicZero`

			`@property`
			`def components(self):`
			`"""`
			`Returns the components of this dyadic in the form of a`
			`Python dictionary mapping BaseDyadic instances to the`
			`corresponding measure numbers.`

			`"""`
			`# The '_components' attribute is defined according to the`
			`# subclass of Dyadic the instance belongs to.`
			`return self._components`

			`def dot(self, other):`
			`"""`
			`Returns the dot product(also called inner product) of this`
			`Dyadic, with another Dyadic or Vector.`
			`If 'other' is a Dyadic, this returns a Dyadic. Else, it returns`
			`a Vector (unless an error is encountered).`

			`Parameters`
			`==========`

			`other : Dyadic/Vector`
			`The other Dyadic or Vector to take the inner product with`

			`Examples`
			`========`

			`>>> from sympy.vector import CoordSys3D`
			`>>> N = CoordSys3D('N')`
			`>>> D1 = N.i.outer(N.j)`
			`>>> D2 = N.j.outer(N.j)`
			`>>> D1.dot(D2)`
			`(N.i\|N.j)`
			`>>> D1.dot(N.j)`
			`N.i`

			`"""`

			`Vector = sympy.vector.Vector`
			`if isinstance(other, BasisDependentZero):`
			`return Vector.zero`
			`elif isinstance(other, Vector):`
			`outvec = Vector.zero`
			`for k, v in self.components.items():`
			`vect_dot = k.args[1].dot(other)`
			`outvec += vect_dot * v * k.args[0]`
			`return outvec`
			`elif isinstance(other, Dyadic):`
			`outdyad = Dyadic.zero`
			`for k1, v1 in self.components.items():`
			`for k2, v2 in other.components.items():`
			`vect_dot = k1.args[1].dot(k2.args[0])`
			`outer_product = k1.args[0].outer(k2.args[1])`
			`outdyad += vect_dot * v1 * v2 * outer_product`
			`return outdyad`
			`else:`
			`raise TypeError("Inner product is not defined for " +`
			`str(type(other)) + " and Dyadics.")`

			`def __and__(self, other):`
			`return self.dot(other)`

			`__and__.__doc__ = dot.__doc__`

			`def cross(self, other):`
			`"""`
			`Returns the cross product between this Dyadic, and a Vector, as a`
			`Vector instance.`

			`Parameters`
			`==========`

			`other : Vector`
			`The Vector that we are crossing this Dyadic with`

			`Examples`
			`========`

			`>>> from sympy.vector import CoordSys3D`
			`>>> N = CoordSys3D('N')`
			`>>> d = N.i.outer(N.i)`
			`>>> d.cross(N.j)`
			`(N.i\|N.k)`

			`"""`

			`Vector = sympy.vector.Vector`
			`if other == Vector.zero:`
			`return Dyadic.zero`
			`elif isinstance(other, Vector):`
			`outdyad = Dyadic.zero`
			`for k, v in self.components.items():`
			`cross_product = k.args[1].cross(other)`
			`outer = k.args[0].outer(cross_product)`
			`outdyad += v * outer`
			`return outdyad`
			`else:`
			`raise TypeError(str(type(other)) + " not supported for " +`
			`"cross with dyadics")`

			`def __xor__(self, other):`
			`return self.cross(other)`

			`__xor__.__doc__ = cross.__doc__`

			`def to_matrix(self, system, second_system=None):`
			`"""`
			`Returns the matrix form of the dyadic with respect to one or two`
			`coordinate systems.`

			`Parameters`
			`==========`

			`system : CoordSys3D`
			`The coordinate system that the rows and columns of the matrix`
			`correspond to. If a second system is provided, this`
			`only corresponds to the rows of the matrix.`
			`second_system : CoordSys3D, optional, default=None`
			`The coordinate system that the columns of the matrix correspond`
			`to.`

			`Examples`
			`========`

			`>>> from sympy.vector import CoordSys3D`
			`>>> N = CoordSys3D('N')`
			`>>> v = N.i + 2*N.j`
			`>>> d = v.outer(N.i)`
			`>>> d.to_matrix(N)`
			`Matrix([`
			`[1, 0, 0],`
			`[2, 0, 0],`
			`[0, 0, 0]])`
			`>>> from sympy import Symbol`
			`>>> q = Symbol('q')`
			`>>> P = N.orient_new_axis('P', q, N.k)`
			`>>> d.to_matrix(N, P)`
			`Matrix([`
			`[ cos(q), -sin(q), 0],`
			`[2cos(q), -2sin(q), 0],`
			`[ 0, 0, 0]])`

			`"""`

			`if second_system is None:`
			`second_system = system`

			`return Matrix([i.dot(self).dot(j) for i in system for j in`
			`second_system]).reshape(3, 3)`

			`def _div_helper(one, other):`
			`""" Helper for division involving dyadics """`
			`if isinstance(one, Dyadic) and isinstance(other, Dyadic):`
			`raise TypeError("Cannot divide two dyadics")`
			`elif isinstance(one, Dyadic):`
			`return DyadicMul(one, Pow(other, S.NegativeOne))`
			`else:`
			`raise TypeError("Cannot divide by a dyadic")`


			`class BaseDyadic(Dyadic, AtomicExpr):`
			`"""`
			`Class to denote a base dyadic tensor component.`
			`"""`

			`def __new__(cls, vector1, vector2):`
			`Vector = sympy.vector.Vector`
			`BaseVector = sympy.vector.BaseVector`
			`VectorZero = sympy.vector.VectorZero`
			`# Verify arguments`
			`if not isinstance(vector1, (BaseVector, VectorZero)) or \`
			`not isinstance(vector2, (BaseVector, VectorZero)):`
			`raise TypeError("BaseDyadic cannot be composed of non-base " +`
			`"vectors")`
			`# Handle special case of zero vector`
			`elif vector1 == Vector.zero or vector2 == Vector.zero:`
			`return Dyadic.zero`
			`# Initialize instance`
			`obj = super().__new__(cls, vector1, vector2)`
			`obj._base_instance = obj`
			`obj._measure_number = 1`
			`obj._components = {obj: S.One}`
			`obj._sys = vector1._sys`
			`obj._pretty_form = ('(' + vector1._pretty_form + '\|' +`
			`vector2._pretty_form + ')')`
			`obj._latex_form = ('(' + vector1._latex_form + "{\|}" +`
			`vector2._latex_form + ')')`

			`return obj`

			`def _sympystr(self, printer):`
			`return "({}\|{})".format(`
			`printer._print(self.args[0]), printer._print(self.args[1]))`


			`class DyadicMul(BasisDependentMul, Dyadic):`
			`""" Products of scalars and BaseDyadics """`

			`def __new__(cls, args, *options):`
			`obj = BasisDependentMul.__new__(cls, args, *options)`
			`return obj`

			`@property`
			`def base_dyadic(self):`
			`""" The BaseDyadic involved in the product. """`
			`return self._base_instance`

			`@property`
			`def measure_number(self):`
			`""" The scalar expression involved in the definition of`
			`this DyadicMul.`
			`"""`
			`return self._measure_number`


			`class DyadicAdd(BasisDependentAdd, Dyadic):`
			`""" Class to hold dyadic sums """`

			`def __new__(cls, args, *options):`
			`obj = BasisDependentAdd.__new__(cls, args, *options)`
			`return obj`

			`def _sympystr(self, printer):`
			`items = list(self.components.items())`
			`items.sort(key=lambda x: x[0].__str__())`
			`return " + ".join(printer._print(k * v) for k, v in items)`


			`class DyadicZero(BasisDependentZero, Dyadic):`
			`"""`
			`Class to denote a zero dyadic`
			`"""`

			`_op_priority = 13.1`
			`_pretty_form = '(0\|0)'`
			`_latex_form = r'(\mathbf{\hat{0}}\|\mathbf{\hat{0}})'`

			`def __new__(cls):`
			`obj = BasisDependentZero.__new__(cls)`
			`return obj`


			`Dyadic._expr_type = Dyadic`
			`Dyadic._mul_func = DyadicMul`
			`Dyadic._add_func = DyadicAdd`
			`Dyadic._zero_func = DyadicZero`
			`Dyadic._base_func = BaseDyadic`
			`Dyadic.zero = DyadicZero()`