Strength 2 Covering Array constructions

src/doc/en/reference/references/index.rst

@@ -1812,8 +1812,8 @@ REFERENCES:
              With an appendix by Ernst Kani.
              Canad. Math. Bull. 48 (2005), no. 1, 16--31.
 
-.. [Colb2004] C.J. Colbourn. “Combinatorial aspects of covering arrays”.
-              Matematiche (Catania) 59 (2004), pp. 125–172.
+.. [Colb2004] C.J. Colbourn. *Combinatorial aspects of covering arrays*.
+              Matematiche (Catania) 59 (2004), pp. 125-172.
 
 .. [Col2004] Pierre Colmez, Invariant `\mathcal{L}` et derivees de
              valeurs propres de Frobenius, preprint, 2004.
@@ -3746,6 +3746,10 @@ REFERENCES:
 .. [Kas2018] András Kaszanyitzky. *The GraftalLace Cellular Automata*.
              Preprint, :arxiv:`1805.11532`.
 
+.. [Kat1973] G. Katona. *Two applications (for search theory and truth
+             functions) of Sperner type theorems*. Periodica Math.,
+             3:19-26, 1973.
+
 .. [Kat1991] Nicholas M. Katz, *Exponential sums and differential equations*,
              Princeton University Press, Princeton NJ, 1991.
 
@@ -4050,6 +4054,9 @@ REFERENCES:
 .. [KS] Sheldon Katz and Stein Arild Stromme, "Schubert",
         A Maple package for intersection theory and enumerative geometry.
 
+.. [KS1973] D. Kleitman and J. Spencer. *Families of k-independent sets*.
+            Discrete Math, 6:255-262, 1973.
+
 .. [KS1998] Maximilian Kreuzer and Harald Skarke, *Classification of
             Reflexive Polyhedra in Three Dimensions*,
             :arxiv:`hep-th/9805190`
@@ -5082,6 +5089,9 @@ REFERENCES:
             :doi:`10.1007/s00453-006-1225-y`,
             http://www.cs.uoi.gr/~stavros/C-Papers/C-2004-SODA.pdf
 
+.. [Nur2004] K. Nurmela. *Upper bounds for covering arrays by tabu search*.
+             Discrete Applied Math., 138 (2004), 143-152.
+
 .. [NWS2002] Newman, M.E.J., Watts, D.J. and Strogatz, S.H.  *Random
              graph models of social networks*. Proc. Nat. Acad. Sci. USA
              99:1 (2002), 2566-2572. :doi:`10.1073/pnas.012582999`
@@ -5853,8 +5863,8 @@ REFERENCES:
 
 .. [SloaHada] \N.J.A. Sloane's Library of Hadamard Matrices, at https://neilsloane.com/hadamard/
 
-.. [SMC2006] \G.B. Sherwood, S.S Martirosyan, and C.J. Colbourn, "Covering
-              arrays of higher strength from permutation vectors". J. Combin.
+.. [SMC2006] \G.B. Sherwood, S.S Martirosyan, and C.J. Colbourn, *Covering
+              arrays of higher strength from permutation vectors*. J. Combin.
               Designs, 14 (2006) pp. 202-213.
 
 .. [SMMK2013] \T. Suzaki, K. Minematsu, S. Morioka, and E. Kobayashi,
@@ -6547,8 +6557,8 @@ REFERENCES:
 .. [Wat2010] Watkins, David S. Fundamentals of Matrix Computations,
              Third Edition.  Wiley, Hoboken, New Jersey, 2010.
 
-.. [WC2007] \R.A. Walker II, and C.J. Colbourn, "Perfect Hash Families:
-             Constructions and Existence". J. Math. Crypt. 1 (2007),
+.. [WC2007] \R.A. Walker II, and C.J. Colbourn, *Perfect Hash Families:
+             Constructions and Existence*. J. Math. Crypt. 1 (2007),
              pp.125-150
 
 .. [Web2007] James Webb. *Game theory: decisions, interaction and

src/sage/combinat/designs/covering_array.py

@@ -16,12 +16,17 @@
 
 .. csv-table::
     :class: contentstable
-    :widths: 30, 70
+    :widths: 50, 50
     :delim: |
 
     :meth:`~sage.combinat.designs.designs_pyx.is_covering_array` | Check that an input list of lists is a `CA(N;t,k,v)`.
-    :meth:`~sage.combinat.designs.covering_array.CA_relabel` | Return a relabelled version of the CA.
-    :meth:`~sage.combinat.designs.covering_array.CA_standard_label` | Return a version of the CA relabelled to symbols `(0,\dots,n-1)`.
+    :meth:`~sage.combinat.designs.covering_array.CA_relabel` | Return a relabelled version of the `CA`.
+    :meth:`~sage.combinat.designs.covering_array.CA_standard_label` | Return a version of the `CA` relabelled to symbols `(0,\dots,n-1)`.
+    :meth:`~sage.combinat.designs.covering_array.truncate_columns` | Return an array with `k` columns from a larger one.
+    :meth:`~sage.combinat.designs.covering_array.Kleitman_Spencer_Katona` | Return a `CA(N; 2, k, 2)` using N as input.
+    :meth:`~sage.combinat.designs.covering_array.column_Kleitman_Spencer_Katona` | Return a `CA(N; 2, k, 2)` using k as input.
+    :meth:`~sage.combinat.designs.covering_array.database_check` | Check if CA can be made from the database of combinatorial designs.
+    :meth:`~sage.combinat.designs.covering_array.covering_array` | Return a `CA` with given parameters.
 
 REFERENCES:
 
@@ -49,3 +54,215 @@
 from .orthogonal_arrays import OA_relabel, OA_standard_label
 CA_relabel = OA_relabel
 CA_standard_label = OA_standard_label
+
+
+def truncate_columns(array, k):
+    r"""
+    Return a covering array with `k` columns, obtained by removing excess
+    columns from a larger covering array.
+
+    INPUT:
+
+    - ``array`` -- the array to be truncated.
+
+    - ``k`` -- the number of columns desired. Must be less than the
+      number of columns in ``array``.
+
+    EXAMPLES::
+
+        sage: from sage.combinat.designs.designs_pyx import is_covering_array
+        sage: from sage.combinat.designs.covering_array import truncate_columns
+        sage: from sage.combinat.designs.database import ca_11_2_5_3
+        sage: C = ca_11_2_5_3()
+        sage: D = truncate_columns(C,7)
+        Traceback (most recent call last):
+        ...
+        ValueError: array only has 5 columns
+        sage: E = truncate_columns(C,4)
+        sage: is_covering_array(E,parameters=True)
+        (True, (11, 2, 4, 3))
+
+    """
+    oldk = len(array[0])
+
+    if oldk == k:
+        return array
+
+    if oldk < k:
+        raise ValueError("array only has {} columns".format(oldk))
+
+    return [row[:k] for row in array]
+
+
+def Kleitman_Spencer_Katona(N):
+    r"""
+    Return a `CA(N; 2, k, 2)` where `k = \binom {N-1}{\lceil N/2 \rceil}`.
+
+    INPUT:
+
+    - ``N`` -- the number of rows in the array, must be an integer greater
+      than 3 since any smaller would not produce enough columns for a
+      strength 2 array.
+
+    This construction is referenced in [Colb2004]_ from [KS1973]_ and [Kat1973]_
+
+    **Construction**
+
+    Take all distinct binary `N`-tuples of weight `N/2` that have a 0
+    in the first position and place them as columns in an array.
+
+    EXAMPLES::
+
+        sage: from sage.combinat.designs.covering_array import Kleitman_Spencer_Katona
+        sage: from sage.combinat.designs.designs_pyx import is_covering_array
+        sage: C = Kleitman_Spencer_Katona(2)
+        Traceback (most recent call last):
+        ...
+        ValueError: N must be greater than 3
+        sage: C = Kleitman_Spencer_Katona(5)
+        sage: is_covering_array(C,parameters=True)
+        (True, (5, 2, 4, 2))
+
+    """
+    from itertools import combinations
+    from sage.arith.misc import integer_ceil
+    if N < 4:
+        raise ValueError("N must be greater than 3")
+
+    col_list = []
+    for p in combinations(range(N-1), integer_ceil(N/2)):
+        S = [0]*N
+        for i in p:
+            S[i] = 1
+        col_list.append(S)
+    return [[col_list[j][i] for j in range(len(col_list))] for i in range(N)]
+
+
+def column_Kleitman_Spencer_Katona(k):
+    r"""
+    Return a covering array with `k` columns using the Kleitman-Spencer-Katona
+    method.
+
+    See :func:`~sage.combinat.designs.covering_array.Kleitman_Spencer_Katona`
+
+    INPUT:
+
+    - ``k`` -- the number of columns in the array, must be an integer
+      greater than 3 since any smaller is a trivial array for strength 2.
+
+    EXAMPLES::
+
+        sage: from sage.combinat.designs.designs_pyx import is_covering_array
+        sage: from sage.combinat.designs.covering_array import column_Kleitman_Spencer_Katona
+        sage: C = column_Kleitman_Spencer_Katona(20)
+        sage: is_covering_array(C,parameters=True)
+        (True, (8, 2, 20, 2))
+        sage: column_Kleitman_Spencer_Katona(25000)
+        Traceback (most recent call last):
+        ...
+        NotImplementedError: not implemented for k > 24310
+
+    """
+    kdict = [(3, 4), (4, 5), (10, 6), (15, 7), (35, 8), (56, 9),
+             (126, 10), (210, 11), (462, 12), (792, 13), (1716, 14),
+             (3003, 15), (6435, 16), (11440, 17), (24310, 18)]
+
+    if k > kdict[-1][0]:
+        raise NotImplementedError("not implemented for k > {}".format(kdict[-1][0]))
+
+    for (ki, N) in kdict:
+        if k <= ki:
+            return truncate_columns(Kleitman_Spencer_Katona(N), k)
+
+
+def database_check(number_columns, strength, levels):
+    r"""
+    Check if the database can be used to build a CA with the given parameters.
+    If so return the CA, if not return False.
+
+    INPUT:
+
+    - ``strength`` (integer) -- the parameter `t` of the covering array,
+      such that in any selection of `t` columns of the array, every
+      `t`-tuple appears at least once.
+
+    - ``levels`` (integer) -- the parameter `v` which is the number of
+      unique symbols that appear in the covering array.
+
+    - ``number_columns`` (integer) -- the number of columns desired for
+      the covering array.
+
+    EXAMPLES::
+
+        sage: from sage.combinat.designs.designs_pyx import is_covering_array
+        sage: from sage.combinat.designs.covering_array import database_check
+        sage: C = database_check(6, 2, 3)
+        sage: is_covering_array(C, parameters=True)
+        (True, (12, 2, 6, 3))
+        sage: database_check(6, 3, 3)
+        False
+
+    """
+    import sage.combinat.designs.database as DB
+
+    if (strength, levels) in DB.CA_constructions:
+        for i in DB.CA_constructions[(strength, levels)]:
+            if number_columns <= i[1]:
+                CA = "ca_{}_{}_{}_{}".format(i[0], strength, i[1], levels)
+                f = getattr(DB, CA)
+                return truncate_columns(f(), number_columns)
+        return False
+    else:
+        return False
+
+
+def covering_array(strength, number_columns, levels):
+    r"""
+    Build a `CA(N; t, k, v)` using direct constructions, where `N` is the
+    smallest size known.
+
+    INPUT:
+
+    - ``strength`` (integer) -- the parameter `t` of the covering array,
+      such that in any selection of `t` columns of the array, every
+      `t`-tuple appears at least once.
+
+    - ``levels`` (integer) -- the parameter `v` which is the number of
+      unique symbols that appear in the covering array.
+
+    - ``number_columns`` (integer) -- the number of columns desired for
+      the covering array.
+
+    EXAMPLES::
+
+        sage: from sage.combinat.designs.designs_pyx import is_covering_array
+        sage: from sage.combinat.designs.covering_array import covering_array
+        sage: C1 = covering_array(2, 7, 3)
+        sage: is_covering_array(C1,parameters=True)
+        (True, (12, 2, 7, 3))
+        sage: C2 = covering_array(2, 11, 2)
+        sage: is_covering_array(C2,parameters=True)
+        (True, (7, 2, 11, 2))
+        sage: C3 = covering_array(2, 8, 7)
+        sage: is_covering_array(C3,parameters=True)
+        (True, (49, 2, 8, 7))
+        sage: C4 = covering_array(2, 50, 7)
+        No direct construction known and/or implemented for a CA(N; 2, 50, 7)
+
+    """
+    from sage.combinat.designs.orthogonal_arrays import orthogonal_array
+
+    if levels == 2 and strength == 2:
+        return column_Kleitman_Spencer_Katona(number_columns)
+
+    in_database = database_check(number_columns, strength, levels)
+    if in_database:
+        return in_database
+
+    if orthogonal_array(number_columns, levels, strength, existence=True) is True:
+        return orthogonal_array(number_columns, levels, strength)
+
+    else:
+        print("No direct construction known and/or implemented for a CA(N; {}, {}, {})".format(
+            strength, number_columns, levels))
+        return