示例#1
0
文件: petab.py 项目: aduc812/pepsam
    def eval_expr(self, expression):
        ''' \
This function evaluates peTab-related expressions, replacing the variable by corresponding 
parameter value, i.e. var('parameter_name') -> peTab['parameter_name']
Is  recursive, as the parameter value may be itself an expression
!!!! Beware of circular links in parameters-expressions !!!!
'''

        # check if we have string - treat as a variable with that name

        if isinstance(expression, string_types):
            expression = var(expression)

        #expand the expression
        expression = self._expand_expression(expression)

        try:  #check if we have a collection of expressions
            expression_iterator = iter(expression)
        except TypeError:  #this is a single expression
            return self._eval_single_expr(expression)
        else:  # expression is iterable
            if len(expression
                   ) == 1:  # treat iterable with one element as this element
                return self._eval_single_expr(expression[0])
            return list(map(self._eval_single_expr, expression))
示例#2
0
文件: petab.py 项目: aduc812/pepsam
    def short_pars(self, names=True, prec=3):
        '''\
Show the values of parameters specified by strings in self['_params_to_show']
'''
        # this was an attempt to set the precision of output.
        # however, quantities package does not implement this.

        #oldprec=np.get_printoptions()['precision']
        #np.set_printoptions(precision=3)

        # using np.around() instead
        output = ''
        for par in self['_params_to_show']:
            outval = self.eval_expr(var(par))
            try:
                outval = np.around(outval, prec)
            except TypeError:
                pass
            output += (par + ':' if names else '') + str(outval) + '    '

        #np.set_printoptions(precision=oldprec)
        return output
示例#3
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文件: shapes2.py 项目: shrutig/sage
def bezier3d(path, **options):
    """
    Draws a 3-dimensional bezier path.  Input is similar to bezier_path, but each
    point in the path and each control point is required to have 3 coordinates.

    INPUT:

    -  ``path`` - a list of curves, which each is a list of points. See further
        detail below.

    -  ``thickness`` - (default: 2)

    -  ``color`` - a word that describes a color

    -  ``opacity`` - (default: 1) if less than 1 then is
       transparent

    -  ``aspect_ratio`` - (default:[1,1,1])

    The path is a list of curves, and each curve is a list of points.
    Each point is a tuple (x,y,z).

    The first curve contains the endpoints as the first and last point
    in the list.  All other curves assume a starting point given by the
    last entry in the preceding list, and take the last point in the list
    as their opposite endpoint.  A curve can have 0, 1 or 2 control points
    listed between the endpoints.  In the input example for path below,
    the first and second curves have 2 control points, the third has one,
    and the fourth has no control points::

        path = [[p1, c1, c2, p2], [c3, c4, p3], [c5, p4], [p5], ...]

    In the case of no control points, a straight line will be drawn
    between the two endpoints.  If one control point is supplied, then
    the curve at each of the endpoints will be tangent to the line from
    that endpoint to the control point.  Similarly, in the case of two
    control points, at each endpoint the curve will be tangent to the line
    connecting that endpoint with the control point immediately after or
    immediately preceding it in the list.

    So in our example above, the curve between p1 and p2 is tangent to the
    line through p1 and c1 at p1, and tangent to the line through p2 and c2
    at p2.  Similarly, the curve between p2 and p3 is tangent to line(p2,c3)
    at p2 and tangent to line(p3,c4) at p3.  Curve(p3,p4) is tangent to
    line(p3,c5) at p3 and tangent to line(p4,c5) at p4.  Curve(p4,p5) is a
    straight line.

    EXAMPLES::

        sage: path = [[(0,0,0),(.5,.1,.2),(.75,3,-1),(1,1,0)],[(.5,1,.2),(1,.5,0)],[(.7,.2,.5)]]
        sage: b = bezier3d(path, color='green')
        sage: b

    To construct a simple curve, create a list containing a single list::

        sage: path = [[(0,0,0),(1,0,0),(0,1,0),(0,1,1)]]
        sage: curve = bezier3d(path, thickness=5, color='blue')
        sage: curve
    """
    import parametric_plot3d as P3D
    from sage.modules.free_module_element import vector
    from sage.calculus.calculus import var

    p0 = vector(path[0][-1])
    t = var('t')
    if len(path[0]) > 2:
        B = (1-t)**3*vector(path[0][0])+3*t*(1-t)**2*vector(path[0][1])+3*t**2*(1-t)*vector(path[0][-2])+t**3*p0
        G = P3D.parametric_plot3d(list(B), (0, 1), color=options['color'], aspect_ratio=options['aspect_ratio'], thickness=options['thickness'], opacity=options['opacity'])
    else:
        G = line3d([path[0][0], p0], color=options['color'], thickness=options['thickness'], opacity=options['opacity'])

    for curve in path[1:]:
        if len(curve) > 1:
            p1 = vector(curve[0])
            p2 = vector(curve[-2])
            p3 = vector(curve[-1])
            B = (1-t)**3*p0+3*t*(1-t)**2*p1+3*t**2*(1-t)*p2+t**3*p3
            G += P3D.parametric_plot3d(list(B), (0, 1), color=options['color'], aspect_ratio=options['aspect_ratio'], thickness=options['thickness'], opacity=options['opacity'])
        else:
            G += line3d([p0,curve[0]], color=options['color'], thickness=options['thickness'], opacity=options['opacity'])
        p0 = curve[-1]
    return G