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405 lines
13 KiB
405 lines
13 KiB
"""fontTools.pens.basePen.py -- Tools and base classes to build pen objects.
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The Pen Protocol
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A Pen is a kind of object that standardizes the way how to "draw" outlines:
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it is a middle man between an outline and a drawing. In other words:
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it is an abstraction for drawing outlines, making sure that outline objects
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don't need to know the details about how and where they're being drawn, and
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that drawings don't need to know the details of how outlines are stored.
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The most basic pattern is this:
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outline.draw(pen) # 'outline' draws itself onto 'pen'
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Pens can be used to render outlines to the screen, but also to construct
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new outlines. Eg. an outline object can be both a drawable object (it has a
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draw() method) as well as a pen itself: you *build* an outline using pen
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methods.
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The AbstractPen class defines the Pen protocol. It implements almost
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nothing (only no-op closePath() and endPath() methods), but is useful
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for documentation purposes. Subclassing it basically tells the reader:
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"this class implements the Pen protocol.". An examples of an AbstractPen
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subclass is fontTools.pens.transformPen.TransformPen.
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The BasePen class is a base implementation useful for pens that actually
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draw (for example a pen renders outlines using a native graphics engine).
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BasePen contains a lot of base functionality, making it very easy to build
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a pen that fully conforms to the pen protocol. Note that if you subclass
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BasePen, you _don't_ override moveTo(), lineTo(), etc., but _moveTo(),
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_lineTo(), etc. See the BasePen doc string for details. Examples of
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BasePen subclasses are fontTools.pens.boundsPen.BoundsPen and
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fontTools.pens.cocoaPen.CocoaPen.
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Coordinates are usually expressed as (x, y) tuples, but generally any
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sequence of length 2 will do.
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"""
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from typing import Tuple
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from fontTools.misc.loggingTools import LogMixin
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__all__ = ["AbstractPen", "NullPen", "BasePen",
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"decomposeSuperBezierSegment", "decomposeQuadraticSegment"]
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class AbstractPen:
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def moveTo(self, pt: Tuple[float, float]) -> None:
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"""Begin a new sub path, set the current point to 'pt'. You must
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end each sub path with a call to pen.closePath() or pen.endPath().
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"""
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raise NotImplementedError
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def lineTo(self, pt: Tuple[float, float]) -> None:
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"""Draw a straight line from the current point to 'pt'."""
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raise NotImplementedError
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def curveTo(self, *points: Tuple[float, float]) -> None:
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"""Draw a cubic bezier with an arbitrary number of control points.
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The last point specified is on-curve, all others are off-curve
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(control) points. If the number of control points is > 2, the
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segment is split into multiple bezier segments. This works
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like this:
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Let n be the number of control points (which is the number of
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arguments to this call minus 1). If n==2, a plain vanilla cubic
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bezier is drawn. If n==1, we fall back to a quadratic segment and
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if n==0 we draw a straight line. It gets interesting when n>2:
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n-1 PostScript-style cubic segments will be drawn as if it were
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one curve. See decomposeSuperBezierSegment().
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The conversion algorithm used for n>2 is inspired by NURB
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splines, and is conceptually equivalent to the TrueType "implied
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points" principle. See also decomposeQuadraticSegment().
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"""
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raise NotImplementedError
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def qCurveTo(self, *points: Tuple[float, float]) -> None:
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"""Draw a whole string of quadratic curve segments.
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The last point specified is on-curve, all others are off-curve
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points.
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This method implements TrueType-style curves, breaking up curves
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using 'implied points': between each two consequtive off-curve points,
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there is one implied point exactly in the middle between them. See
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also decomposeQuadraticSegment().
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The last argument (normally the on-curve point) may be None.
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This is to support contours that have NO on-curve points (a rarely
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seen feature of TrueType outlines).
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"""
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raise NotImplementedError
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def closePath(self) -> None:
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"""Close the current sub path. You must call either pen.closePath()
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or pen.endPath() after each sub path.
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"""
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pass
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def endPath(self) -> None:
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"""End the current sub path, but don't close it. You must call
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either pen.closePath() or pen.endPath() after each sub path.
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"""
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pass
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def addComponent(
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self,
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glyphName: str,
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transformation: Tuple[float, float, float, float, float, float]
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) -> None:
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"""Add a sub glyph. The 'transformation' argument must be a 6-tuple
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containing an affine transformation, or a Transform object from the
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fontTools.misc.transform module. More precisely: it should be a
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sequence containing 6 numbers.
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"""
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raise NotImplementedError
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class NullPen(AbstractPen):
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"""A pen that does nothing.
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"""
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def moveTo(self, pt):
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pass
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def lineTo(self, pt):
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pass
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def curveTo(self, *points):
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pass
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def qCurveTo(self, *points):
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pass
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def closePath(self):
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pass
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def endPath(self):
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pass
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def addComponent(self, glyphName, transformation):
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pass
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class LoggingPen(LogMixin, AbstractPen):
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"""A pen with a `log` property (see fontTools.misc.loggingTools.LogMixin)
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"""
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pass
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class MissingComponentError(KeyError):
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"""Indicates a component pointing to a non-existent glyph in the glyphset."""
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class DecomposingPen(LoggingPen):
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""" Implements a 'addComponent' method that decomposes components
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(i.e. draws them onto self as simple contours).
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It can also be used as a mixin class (e.g. see ContourRecordingPen).
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You must override moveTo, lineTo, curveTo and qCurveTo. You may
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additionally override closePath, endPath and addComponent.
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By default a warning message is logged when a base glyph is missing;
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set the class variable ``skipMissingComponents`` to False if you want
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to raise a :class:`MissingComponentError` exception.
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"""
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skipMissingComponents = True
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def __init__(self, glyphSet):
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""" Takes a single 'glyphSet' argument (dict), in which the glyphs
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that are referenced as components are looked up by their name.
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"""
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super(DecomposingPen, self).__init__()
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self.glyphSet = glyphSet
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def addComponent(self, glyphName, transformation):
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""" Transform the points of the base glyph and draw it onto self.
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"""
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from fontTools.pens.transformPen import TransformPen
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try:
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glyph = self.glyphSet[glyphName]
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except KeyError:
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if not self.skipMissingComponents:
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raise MissingComponentError(glyphName)
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self.log.warning(
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"glyph '%s' is missing from glyphSet; skipped" % glyphName)
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else:
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tPen = TransformPen(self, transformation)
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glyph.draw(tPen)
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class BasePen(DecomposingPen):
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"""Base class for drawing pens. You must override _moveTo, _lineTo and
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_curveToOne. You may additionally override _closePath, _endPath,
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addComponent and/or _qCurveToOne. You should not override any other
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methods.
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"""
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def __init__(self, glyphSet=None):
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super(BasePen, self).__init__(glyphSet)
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self.__currentPoint = None
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# must override
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def _moveTo(self, pt):
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raise NotImplementedError
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def _lineTo(self, pt):
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raise NotImplementedError
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def _curveToOne(self, pt1, pt2, pt3):
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raise NotImplementedError
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# may override
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def _closePath(self):
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pass
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def _endPath(self):
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pass
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def _qCurveToOne(self, pt1, pt2):
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"""This method implements the basic quadratic curve type. The
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default implementation delegates the work to the cubic curve
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function. Optionally override with a native implementation.
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"""
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pt0x, pt0y = self.__currentPoint
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pt1x, pt1y = pt1
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pt2x, pt2y = pt2
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mid1x = pt0x + 0.66666666666666667 * (pt1x - pt0x)
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mid1y = pt0y + 0.66666666666666667 * (pt1y - pt0y)
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mid2x = pt2x + 0.66666666666666667 * (pt1x - pt2x)
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mid2y = pt2y + 0.66666666666666667 * (pt1y - pt2y)
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self._curveToOne((mid1x, mid1y), (mid2x, mid2y), pt2)
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# don't override
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def _getCurrentPoint(self):
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"""Return the current point. This is not part of the public
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interface, yet is useful for subclasses.
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"""
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return self.__currentPoint
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def closePath(self):
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self._closePath()
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self.__currentPoint = None
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def endPath(self):
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self._endPath()
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self.__currentPoint = None
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def moveTo(self, pt):
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self._moveTo(pt)
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self.__currentPoint = pt
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def lineTo(self, pt):
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self._lineTo(pt)
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self.__currentPoint = pt
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def curveTo(self, *points):
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n = len(points) - 1 # 'n' is the number of control points
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assert n >= 0
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if n == 2:
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# The common case, we have exactly two BCP's, so this is a standard
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# cubic bezier. Even though decomposeSuperBezierSegment() handles
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# this case just fine, we special-case it anyway since it's so
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# common.
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self._curveToOne(*points)
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self.__currentPoint = points[-1]
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elif n > 2:
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# n is the number of control points; split curve into n-1 cubic
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# bezier segments. The algorithm used here is inspired by NURB
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# splines and the TrueType "implied point" principle, and ensures
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# the smoothest possible connection between two curve segments,
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# with no disruption in the curvature. It is practical since it
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# allows one to construct multiple bezier segments with a much
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# smaller amount of points.
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_curveToOne = self._curveToOne
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for pt1, pt2, pt3 in decomposeSuperBezierSegment(points):
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_curveToOne(pt1, pt2, pt3)
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self.__currentPoint = pt3
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elif n == 1:
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self.qCurveTo(*points)
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elif n == 0:
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self.lineTo(points[0])
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else:
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raise AssertionError("can't get there from here")
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def qCurveTo(self, *points):
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n = len(points) - 1 # 'n' is the number of control points
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assert n >= 0
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if points[-1] is None:
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# Special case for TrueType quadratics: it is possible to
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# define a contour with NO on-curve points. BasePen supports
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# this by allowing the final argument (the expected on-curve
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# point) to be None. We simulate the feature by making the implied
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# on-curve point between the last and the first off-curve points
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# explicit.
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x, y = points[-2] # last off-curve point
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nx, ny = points[0] # first off-curve point
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impliedStartPoint = (0.5 * (x + nx), 0.5 * (y + ny))
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self.__currentPoint = impliedStartPoint
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self._moveTo(impliedStartPoint)
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points = points[:-1] + (impliedStartPoint,)
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if n > 0:
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# Split the string of points into discrete quadratic curve
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# segments. Between any two consecutive off-curve points
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# there's an implied on-curve point exactly in the middle.
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# This is where the segment splits.
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_qCurveToOne = self._qCurveToOne
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for pt1, pt2 in decomposeQuadraticSegment(points):
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_qCurveToOne(pt1, pt2)
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self.__currentPoint = pt2
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else:
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self.lineTo(points[0])
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def decomposeSuperBezierSegment(points):
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"""Split the SuperBezier described by 'points' into a list of regular
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bezier segments. The 'points' argument must be a sequence with length
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3 or greater, containing (x, y) coordinates. The last point is the
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destination on-curve point, the rest of the points are off-curve points.
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The start point should not be supplied.
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This function returns a list of (pt1, pt2, pt3) tuples, which each
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specify a regular curveto-style bezier segment.
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"""
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n = len(points) - 1
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assert n > 1
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bezierSegments = []
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pt1, pt2, pt3 = points[0], None, None
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for i in range(2, n+1):
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# calculate points in between control points.
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nDivisions = min(i, 3, n-i+2)
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for j in range(1, nDivisions):
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factor = j / nDivisions
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temp1 = points[i-1]
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temp2 = points[i-2]
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temp = (temp2[0] + factor * (temp1[0] - temp2[0]),
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temp2[1] + factor * (temp1[1] - temp2[1]))
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if pt2 is None:
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pt2 = temp
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else:
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pt3 = (0.5 * (pt2[0] + temp[0]),
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0.5 * (pt2[1] + temp[1]))
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bezierSegments.append((pt1, pt2, pt3))
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pt1, pt2, pt3 = temp, None, None
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bezierSegments.append((pt1, points[-2], points[-1]))
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return bezierSegments
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def decomposeQuadraticSegment(points):
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"""Split the quadratic curve segment described by 'points' into a list
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of "atomic" quadratic segments. The 'points' argument must be a sequence
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with length 2 or greater, containing (x, y) coordinates. The last point
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is the destination on-curve point, the rest of the points are off-curve
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points. The start point should not be supplied.
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This function returns a list of (pt1, pt2) tuples, which each specify a
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plain quadratic bezier segment.
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"""
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n = len(points) - 1
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assert n > 0
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quadSegments = []
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for i in range(n - 1):
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x, y = points[i]
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nx, ny = points[i+1]
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impliedPt = (0.5 * (x + nx), 0.5 * (y + ny))
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quadSegments.append((points[i], impliedPt))
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quadSegments.append((points[-2], points[-1]))
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return quadSegments
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class _TestPen(BasePen):
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"""Test class that prints PostScript to stdout."""
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def _moveTo(self, pt):
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print("%s %s moveto" % (pt[0], pt[1]))
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def _lineTo(self, pt):
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print("%s %s lineto" % (pt[0], pt[1]))
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def _curveToOne(self, bcp1, bcp2, pt):
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print("%s %s %s %s %s %s curveto" % (bcp1[0], bcp1[1],
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bcp2[0], bcp2[1], pt[0], pt[1]))
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def _closePath(self):
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print("closepath")
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if __name__ == "__main__":
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pen = _TestPen(None)
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pen.moveTo((0, 0))
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pen.lineTo((0, 100))
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pen.curveTo((50, 75), (60, 50), (50, 25), (0, 0))
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pen.closePath()
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pen = _TestPen(None)
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# testing the "no on-curve point" scenario
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pen.qCurveTo((0, 0), (0, 100), (100, 100), (100, 0), None)
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pen.closePath()
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