Source code for adjacency

#
##
##  This file is part of pyFormex 2.0  (Mon Sep 14 12:29:05 CEST 2020)
##  pyFormex is a tool for generating, manipulating and transforming 3D
##  geometrical models by sequences of mathematical operations.
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##  Copyright 2004-2020 (C) Benedict Verhegghe (benedict.verhegghe@ugent.be)
##  Distributed under the GNU General Public License version 3 or later.
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##  it under the terms of the GNU General Public License as published by
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##  MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
##  GNU General Public License for more details.
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##

"""A class for storing and handling adjacency tables.

This module defines a specialized array class for representing adjacency
of items of a single type. This is e.g. used in mesh models, to store
the adjacent elements.
"""

import numpy as np

from pyformex import arraytools as at

############### Private functions ##############


# Not to be used outside this module
def _reduce_adjacency(adj, remove_self=True, remove_dup=True):
    """Reduce an adjacency table.

    An adjacency table is an integer array where each row lists the numbers
    of the items that are connected to the item with number equal to the row
    index. Rows are padded with -1 values to create rows of equal length.

    A reduced adjacency table is one where each row:

    - does not contain the row index itself,
    - does not contain duplicate entries (other than -1),
    - is sorted in ascending order,

    and that has at least one row without -1 value.

    Paramaters
    ----------
    adj: int :term:`array_like`
        A 2-dim integer array with values >=0 or -1
    remove_self: bool
        If True (default), row entries equal to the row index are removed
        (i.e. elements are not considered to be adjacent to themselves).
    remove_dup: bool
        If True (default), duplicate (non-negative) entries on a row are
        removed (i.e. adjacency does not count the number of connections).

    Returns
    -------
    int array
        An integer array with shape (adj.shape[0],maxc) with
        maxc <= adj.shape[1], where row `i` retains the unique non-negative
        numbers of the original array except the value `i`, and is possibly
        padded with -1 values.

    Examples
    --------
    >>> a = np.array([[ 0,  0,  0,  1,  2,  5],
    ...               [-1,  0,  1, -1,  1,  3],
    ...               [-1, -1,  0, -1, -1,  2],
    ...               [-1, -1,  1, -1, -1,  3],
    ...               [-1, -1, -1, -1, -1, -1],
    ...               [-1, -1,  0, -1, -1,  5]])
    >>> _reduce_adjacency(a)
    array([[ 1,  2,  5],
           [-1,  0,  3],
           [-1, -1,  0],
           [-1, -1,  1],
           [-1, -1, -1],
           [-1, -1,  0]])
    >>> _reduce_adjacency(Adjacency(a))
    Adjacency([[ 1,  2,  5],
               [-1,  0,  3],
               [-1, -1,  0],
               [-1, -1,  1],
               [-1, -1, -1],
               [-1, -1,  0]])
    """
    adj = at.checkArray(adj, ndim=2, subok=True)
    n = adj.shape[0]
    if n > 0:
        if remove_self:
            # remove the item i from row i
            adj[adj == np.arange(n).reshape(n, -1)] = -1
        adj.sort(axis=1)        # sort the rows
        if remove_dup:
            # remove duplicate items
            adj[np.where(adj[:, :-1] == adj[:, 1:])] = -1
            adj.sort(axis=1)
        maxc = adj.max(axis=0)  # find maximum per column
        adj = adj[:, maxc>=0]   # remove columns with only negative values
    return adj


############################################################################
##
##   class Adjacency
##
####################
#

# TODO : This could be subclassed from Varray. But our preliminary
#        test show that it is slower and uses more memory. Perhaps
#        because in practical meshes the number of adjacent elements
#        is fairly constant, so using a full array is not much of a loss.
#        Might be different in beam type structures?
#

# TODO: WE SHOULD ADD A CONSISTENCY CHECK THAT WE HAVE BIDIRECTIONAL
#       CONNECTIONS: if row a has a value b, row b should have a value a
#

[docs]class Adjacency(np.ndarray): # # :DEV # Because we have a __new__ constructor and no __init__, # we have to put the signature of the object creation explicitely # in the first line of the docstring. # """ Adjacency(data=[],dtyp=None,copy=False,normalize=True) A class for storing and handling adjacency tables. An adjacency table defines a neighbouring relation between elements of a single collection. The nature of the relation is not important, but should be a binary relation: two elements are either related or they are not. Typical applications in pyFormex are the adjacency tables for storing elements connected by a node, or by an edge, or by a node but not by an edge, etcetera. Conceptually the adjacency table corresponds with a graph. In graph theory however the data are usually stored as a set of tuples `(a,b)` indicating a connection between the elements `a` and `b`. In pyFormex elements are numbered consecutively from 0 to nelems-1, where nelems is the number of elements. If the user wants another numbering, he can always keep an array with the actual numbers himself. Connections between elements are stored in an efficient two-dimensional array, holding a row for each element. This row contains the numbers of the connected elements. Because the number of connections can be different for each element, the rows are padded with an invalid elements number (-1). A normalized Adjacency is one where all rows do not contain duplicate nonnegative entries and are sorted in ascending order and where no column contains only -1 values. Also, since the adjacency is defined within a single collection, no row should contain a value higher than the maximum row index. Parameters ---------- data: int :term:`array_like` Data to initialize the Connectivity. The data should be 2-dim with shape ``(nelems,ncon)``, where ``nelems`` is the number of elements and ``ncon`` is the maximum number of connections per element. dtyp: float datatype, optional Can be provided to force a specific int data type. If not, the datatype of ``data`` is used. copy: bool, optional If True, the data are copied. The default setting will try to use the original data if possible, e.g. if ``data`` is a correctly shaped and typed :class:`numpy.ndarray`. normalize: bool, optional If True (default) the Adjacency will be normalized at creation time. allow_self: bool, optional If True, connections of elements with itself are allowed. The default (False) will remove self-connections when the table is normalized. Warning ------- The ``allow_self`` parameter is currently inactive. Examples -------- >>> A = Adjacency([[1,2,-1], ... [3,2,0], ... [1,-1,3], ... [1,2,-1], ... [-1,-1,-1]]) >>> print(A) [[-1 1 2] [ 0 2 3] [-1 1 3] [-1 1 2] [-1 -1 -1]] >>> A.nelems() 5 >>> A.maxcon() 3 >>> Adjacency([[]]) Adjacency([], shape=(1, 0)) """ def __new__(clas, data=[], dtyp=None, copy=False, normalize=True, allow_self=False, bidirectional=False, check_max=True): """Create a new Adjacency table.""" # Turn the data into an array, and copy if requested ar = np.array(data, dtype=dtyp, copy=copy) if ar.ndim != 2: raise ValueError("Expected 2-dim data") # Make sure dtype is an int type if ar.dtype.kind != 'i': ar = ar.astype(at.Int) # Check values if ar.size > 0: maxval = ar.max() if check_max and maxval > ar.shape[0]-1: raise ValueError(f"Too large element number ({maxval})" f" for number of rows({ar.shape[0]})") else: maxval = -1 if normalize: ar = _reduce_adjacency(ar) # Transform 'subarr' from an ndarray to our new subclass. ar = ar.view(clas) return ar
[docs] def nelems(self): """Return the number of elements in the Adjacency table. """ return self.shape[0]
[docs] def maxcon(self): """Return the maximum number of connections for any element. This returns the row width of the Adjacency. """ return self.shape[1]
### normalization ###
[docs] def sortRows(self): """Sort an adjacency table. This sorts the entries in each row of the adjacency table in ascending order and removes all columns containing only -1 values. Returns ------- Adjacency An Adjacency with the same non-negative data but each row sorted in ascending order, and no column with only negative values. The number of rows is the same as the input, the number of columns may be lower. See Also -------- normalize: also removes self and duplicate entries Examples -------- >>> a = Adjacency([[ 0, 2, 1, -1], ... [-1, 3, 1, -1], ... [ 3, -1, 0, 1], ... [-1, -1, -1, -1]]) >>> a.sortRows() Adjacency([[-1, 1, 2], [-1, -1, 3], [ 0, 1, 3], [-1, -1, -1]]) >>> a = Adjacency([[ 0, 2, 1, -1], ... [-1, 3, 1, -1], ... [ 3, -1, 0, 1], ... [-1, -1, -1, -1]],normalize=False) >>> a.sortRows() Adjacency([[ 0, 1, 2], [-1, 1, 3], [ 0, 1, 3], [-1, -1, -1]]) """ return _reduce_adjacency(self, remove_self=False, remove_dup=False)
[docs] def normalize(self): """Normalize an adjacency table. A normalized adjacency table is one where each row: - does not contain the row index itself, - does not contain duplicates, - is sorted in ascending order, and that has no columns with all -1 values. By default, an Adjacency gets normalized when it is constructed. Performing operations on an Adjacency may however leave it in a non-normalized state. Calling this method will normalize it again. Obviously this can also be obtained by creating a new Adjacency with self as data. Returns ------- Adjacency An Adjacency object with shape (self.shape[0],maxc), with ``maxc <= adj.shape[1]``. A row ``i`` of the Adjacency contains the unique non-negative numbers except the value ``i`` of the same row ``i`` in the original, and is possibly padded with -1 values. Examples -------- >>> a = Adjacency([[ 0, 0, 0, 1, 2, 5], ... [-1, 0, 1, -1, 1, 3], ... [-1, -1, 0, -1, -1, 2], ... [-1, -1, 1, -1, -1, 3], ... [-1, -1, -1, -1, -1, -1], ... [-1, -1, 0, -1, -1, 5]],normalize=False) >>> a.normalize() Adjacency([[ 1, 2, 5], [-1, 0, 3], [-1, -1, 0], [-1, -1, 1], [-1, -1, -1], [-1, -1, 0]]) >>> Adjacency(a) Adjacency([[ 1, 2, 5], [-1, 0, 3], [-1, -1, 0], [-1, -1, 1], [-1, -1, -1], [-1, -1, 0]]) """ return _reduce_adjacency(self)
### operations ###
[docs] def pairs(self): """Return all pairs of adjacent element. Returns ------- int array An int array with two columns, where each row contains a pair of adjacent elements. The element number in the first column is always the smaller of the two element numbers. Examples -------- >>> Adjacency([[-1,1],[0,2],[-1,0]]).pairs() array([[0, 1], [1, 2]]) """ p = [[[i, j] for j in k if j >= 0] for i, k in enumerate(self[:-1]) if max(k) >= 0] p = np.row_stack(p) return p[p[:, 1] > p[:, 0]]
[docs] def symdiff(self, adj): """Return the symmetric difference of two adjacency tables. Parameters ---------- adj: Adjacency An Adjacency with the same number of rows as ``self``. Returns ------- Adjacency An adjacency table of the same length, where each row contains all the (nonnegative) numbers of the corresponding rows of ``self`` and ``adj``, except those that occur in both. Examples -------- >>> A = Adjacency([[ 1, 2,-1], ... [ 3, 2, 0], ... [ 1,-1, 3], ... [ 1, 2,-1], ... [-1,-1,-1]]) >>> B = Adjacency([[ 1, 2, 3], ... [ 3, 4, 1], ... [ 0,-1, 2], ... [ 0, 3, 4], ... [-1, 0,-1]]) >>> A.symdiff(B) Adjacency([[-1, -1, -1, 3], [-1, 0, 2, 4], [-1, 0, 1, 3], [ 0, 1, 2, 4], [-1, -1, -1, 0]]) """ if adj.nelems() != self.nelems(): raise ValueError("`adj` should have same number of rows as `self`") adj = np.concatenate([self, adj], axis=-1) for i in range(len(adj)): row = adj[i] mult, uniq = at.multiplicity(row[row>=0]) r = uniq[mult==1] nr = len(r) adj[i] = -1 if nr > 0: adj[i, -nr:] = r return Adjacency(adj)
### frontal methods ###
[docs] def frontGenerator(self, startat=0, frontinc=1, partinc=1): """Generator function returning the frontal elements. This is a generator function and is normally not used directly, but via the :meth:`frontWalk` method. Parameters: see :meth:`frontWalk`. Returns ------- int array Int array with a value for each element. On the initial call, all values are -1, except for the elements in the initial front, which get a value 0. At each call a new front is created with all the elements that are connected to any of the current front and which have not yet been visited. The new front elements get a value equal to the last front's value plus the ``frontinc``. If the front becomes empty and a new starting front is created, the front value is extra incremented with ``partinc``. Examples -------- >>> A = Adjacency([[ 1, 2,-1], ... [ 3, 2, 0], ... [ 1,-1, 3], ... [ 1, 2,-1], ... [-1,-1,-1]]) >>> for p in A.frontGenerator(): print(p) [ 0 -1 -1 -1 -1] [ 0 1 1 -1 -1] [ 0 1 1 2 -1] [0 1 1 2 4] """ p = -np.ones((self.nelems()), dtype=at.Int) if self.nelems() <= 0: return # Remember current elements front elems = np.clip(np.asarray(startat), 0, self.nelems()) prop = 0 while elems.size > 0: # Store prop value for current elems p[elems] = prop yield p prop += frontinc # Determine adjacent elements elems = np.unique(np.asarray(self[elems])) elems = elems[elems >= 0] elems = elems[p[elems] < 0] if elems.size > 0: continue # No more elements in this part: start a new one elems = np.where(p<0)[0] if elems.size > 0: # Start a new part elems = elems[[0]] prop += partinc
[docs] def frontWalk(self, startat=0, frontinc=1, partinc=1, maxval=-1): """Walks through the elements by their node front. A frontal walk is executed starting from the given element(s). A number of steps is executed, each step advancing the front over a given number of single pass increments. The step number at which an element is reached is recorded and returned. Parameters ---------- startat: int or list of ints Initial element number(s) in the front. frontinc: int Increment for the front number on each frontal step. partinc: int Increment for the front number when the front gets empty and a new part is started. maxval: int Maximum frontal value. If negative (default) the walk will continue until all elements have been reached. If non-negative, walking will stop as soon as the frontal value reaches this maximum. Returns ------- int array An array of ints specifying for each element in which step the element was reached by the walker. Examples -------- >>> A = Adjacency([ ... [-1, 1, 2, 3], ... [-1, 0, 2, 3], ... [ 0, 1, 4, 5], ... [-1, -1, 0, 1], ... [-1, -1, 2, 5], ... [-1, -1, 2, 4]]) >>> print(A.frontWalk()) [0 1 1 1 2 2] """ for p in self.frontGenerator(startat=startat, frontinc=frontinc, partinc=partinc): if maxval >= 0: if p.max() >= maxval: break return p
[docs] def front(self, startat=0, add=False): """Returns the elements of the first node front. Parameters ---------- startat: int or list od ints Element number(s) or a list of element numbers. The list of elements to find the next front for. add: bool, optional If True, the `startat` elements wil be included in the return value. The default (False) will only return the elements in the next front line. Returns ------- int array A list of the elements that are connected to any of the nodes that are part of the startat elements. Notes ----- This is equivalent to the first step of a :func:`frontWalk` with the same startat elements, and could thus also be obtained from ``where(self.frontWalk(startat,maxval=1) == 1)[0]``. Here however another implementation is used, which is more efficient for very large models: it avoids the creation of the large array as returned by frontWalk. Examples -------- >>> a = Adjacency([[ 0, 0, 0, 1, 2, 5], ... [-1, 0, 1, -1, 1, 3], ... [-1, -1, 0, -1, -1, 2], ... [-1, -1, 1, -1, -1, 3], ... [-1, -1, -1, -1, -1, -1], ... [-1, -1, 0, -1, -1, 5]]) >>> print(a.front()) [1 2 5] >>> print(a.front([0,1])) [2 3 5] >>> print(a.front([0,1],add=True)) [0 1 2 3 5] """ elems = np.unique(np.asarray(self[startat])) if not add: elems = np.setdiff1d(elems, np.asarray(startat)) elems = elems[elems >= 0] return elems
# End