[56, 28, 10] singly-even binary self-dual

?28 56 2 $ C_{56,1}; W_{56,1}; alpha=-55; |Aut|=1; (Theorem 3.2) R='F2'; a=[0100111100101]; b=[1111101111010]; c=[1011001111110]; xi=[1010]; (Theorem 4.1) R='F2'; delta=[000000000000000000000000000000101100101100011111000101]; $
10000000000000000000000000000000101100101100011111000101
01000000000000000000000000001001011010111001010000001101
00100000000000000000000000000100011101001111110111101010
00010000000000000000000000000101110001011011111011110111
00001000000000000000000000000101000111010101111101111010
00000100000000000000000000000010100011101010111110111110
00000010000000000000000000000110101110001101011111011111
00000001000000000000000000000100101000111110101111101110
00000000100000000000000000000101101011100111010111110111
00000000010000000000000000000010110101110111101011111011
00000000001000000000000000000001011010111011110101111111
00000000000100000000000000000111010010100101111010111110
00000000000010000000000000000011101001010110111101011110
00000000000001000000000000000001110100101111011110101110
00000000000000100000000000000111000101101111101111010111
00000000000000010000000000001001001101011111101000101100
00000000000000001000000000001110010100001000011100111001
00000000000000000100000000001101111000100111100110110000
00000000000000000010000000001011110001001100011011110100
00000000000000000001000000000110111100010100101010011101
00000000000000000000100000001010101000011011011010000101
00000000000000000000010000000110010000111111001010100100
00000000000000000000001000001101000001110010101010011001
00000000000000000000000100001011101101100110111101100001
00000000000000000000000010001000111011101100110110011101
00000000000000000000000001001110101111010001110011100000
00000000000000000000000000101010011010110111010001011100
00000000000000000000000000010111111111111000000000000001
$+88z^{10}+4686z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,2}; W_{56,1}; alpha=-47; |Aut|=1; (Theorem 3.2) R='F2'; a=[0100111100101]; b=[1111101111010]; c=[1011001111110]; xi=[1010]; (Theorem 4.1) R='F2'; delta=[000000000000000000000000000001000100111010111011101110]; $
10000000000000000000000000000001000100111010111011101110
01000000000000000000000000001110111011000010111011101111
00100000000000000000000000000100011101001111110111101010
00010000000000000000000000000101110001011011111011110111
00001000000000000000000000000101000111010101111101111010
00000100000000000000000000001101011100010010111110111111
00000010000000000000000000001001010001110101011111011110
00000001000000000000000000000100101000111110101111101110
00000000100000000000000000001010010100011111010111110110
00000000010000000000000000001101001010001111101011111010
00000000001000000000000000000001011010111011110101111111
00000000000100000000000000000111010010100101111010111110
00000000000010000000000000000011101001010110111101011110
00000000000001000000000000000001110100101111011110101110
00000000000000100000000000001000111010010111101111010110
00000000000000010000000000001111000100110010100111100101
00000000000000001000000000001000011101100101010011110000
00000000000000000100000000001011110001001010101001111001
00000000000000000010000000001101111000100001010100111101
00000000000000000001000000001001000011101100101010011100
00000000000000000000100000000011011110001110010101001101
00000000000000000000010000000110010000111111001010100100
00000000000000000000001000001011001000011111100101010000
00000000000000000000000100000010011011110011110010101001
00000000000000000000000010000001001101111001111001010101
00000000000000000000000001000111011001000100111100101000
00000000000000000000000000100011101100100010011110010100
00000000000000000000000000011110001001101101001111001001
$+120z^{10}+4622z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,3}; W_{56,2}; alpha=-50; |Aut|=1; (Theorem 3.2) R='F2'; a=[0100111100101]; b=[1111101111010]; c=[1011001111110]; xi=[1010]; (Theorem 4.1) R='F2'; delta=[000000000000000000000000000110101100010101111001101100]; $
10000000000000000000000000000110101100010101111001101100
01000000000000000000000000001101000000110111100111111000
00100000000000000000000000000100011101001111110111101010
00010000000000000000000000000101110001011011111011110111
00001000000000000000000000001110101011110111100011101110
00000100000000000000000000000010100011101010111110111110
00000010000000000000000000000110101110001101011111011111
00000001000000000000000000001111000100011100110001111010
00000000100000000000000000001110000111000101001001100011
00000000010000000000000000001001011001010101110101101111
00000000001000000000000000001010110110011001101011101011
00000000000100000000000000000111010010100101111010111110
00000000000010000000000000001000000101110100100011001010
00000000000001000000000000001010011000001101000000111010
00000000000000100000000000001100101001001101110001000011
00000000000000010000000000000000111011001010100111100100
00000000000000001000000000001100001110111111001101100101
00000000000000000100000000001111100010010000110111101100
00000000000000000010000000000010000111011001010100111100
00000000000000000001000000001101010000110110110100001001
00000000000000000000100000000011011110001110010101001101
00000000000000000000010000000110010000111111001010100100
00000000000000000000001000001111011011000101111011000101
00000000000000000000000100000010011011110011110010101001
00000000000000000000000010001010100001011011100111000001
00000000000000000000000001001100110101100110100010111100
00000000000000000000000000100001110110010101001111001000
00000000000000000000000000010111111111111000000000000001
$+108z^{10}+4390z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,4}; W_{56,1}; alpha=-54; |Aut|=12; (Theorem 3.2) R='F2+uF2+vF2+uvF2'; lambda=1; mu=9; a=[B03]; b=[39D]; c=[344]; xi=[7EBA]; $
10000000000000000000000000001001111001101010001000101001
01000000000000000000000000000101110100111001000110000101
00100000000000000000000000000011110011011000110001010001
00010000000000000000000000001111000110100000111111110101
00001000000000000000000000001110101010010010011111111001
00000100000000000000000000001110011101000001011111101101
00000010000000000000000000001000111110110101011111101000
00000001000000000000000000000101011111010100111111100100
00000000100000000000000000000011101111100110011111110000
00000000010000000000000000001010010110000000111000101111
00000000001000000000000000001101001010000010001110010111
00000000000100000000000000000110101100000001010101011011
00000000000010000000000000001110000000001000000000011111
00000000000001000000000000000000001110000011111100011110
00000000000000100000000000001000100010100110011110011010
00000000000000010000000000000100011000010101011101001110
00000000000000001000000000000011000101000100111100110110
00000000000000000100000000000011111111010111110001101000
00000000000000000010000000001001111111100111101010100100
00000000000000000001000000000101111110110111100111010000
00000000000000000000100000000101111110100010001111101101
00000000000000000000010000000011111110010001010111110101
00000000000000000000001000001001111111000000111011111001
00000000000000000000000100000011100010111110100101100000
00000000000000000000000010001000111001011111010010100000
00000000000000000000000001000101010101101101101011000000
00000000000000000000000000100000000001111111100000000010
00000000000000000000000000011111110001111000000011100000
$+92z^{10}+4678z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,5}; W_{56,1}; alpha=-50; |Aut|=4; (Theorem 3.2) R='F2+uF2+vF2+uvF2'; lambda=F; mu=1; a=[331]; b=[8F9]; c=[EE3]; xi=[DEBA]; $
10000000000000000000000000000000111111011101111111001000
01000000000000000000000000000100100000011001011101100100
00100000000000000000000000000010100010101011110010001000
00010000000000000000000000000001011010011100100000111101
00001000000000000000000000001111101010101011100010111111
00000100000000000000000000001001111010110001010101001000
00000010000000000000000000001001010010101101101111010100
00000001000000000000000000001101111010110010101111110101
00000000100000000000000000001111111001010000110001000100
00000000010000000000000000001001011000010110010110101001
00000000001000000000000000000111000110000011010100001001
00000000000100000000000000001001010100010011001001110110
00000000000010000000000000001110010001000011110010000111
00000000000001000000000000001001101100101011000010100000
00000000000000100000000000000010100101111101011001100000
00000000000000010000000000001110111110001110101100010110
00000000000000001000000000001010010001111101111110111101
00000000000000000100000000001011101111011111000100000111
00000000000000000010000000001101010000111111010011100111
00000000000000000001000000001001100001010100011010011011
00000000000000000000100000001011110111010000001111100001
00000000000000000000010000001101000010111110111110001011
00000000000000000000001000000101000110001110000001001110
00000000000000000000000100000001001001111001011011011000
00000000000000000000000010001111110100010001000111010000
00000000000000000000000001000001101101011000001110001110
00000000000000000000000000100000100110101001001001101010
00000000000000000000000000010000111111110100011111111101
$+108z^{10}+4646z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,6}; W_{56,2}; alpha=-55; |Aut|=12; (Theorem 3.2) R='F2+uF2+vF2+uvF2'; lambda=1; mu=3; a=[D52]; b=[F95]; c=[700]; xi=[9EAB]; $
10000000000000000000000000001011110010001100001010101001
01000000000000000000000000001011001110001100010011010001
00100000000000000000000000001011100111110100000010000011
00010000000000000000000000000001010000110010010111010111
00001000000000000000000000000101010110100010110010001101
00000100000000000000000000000111011101100000100010100011
00000010000000000000000000000101000010000111001101101110
00000001000000000000000000000111100000001110000010111110
00000000100000000000000000000001111001110101001000110100
00000000010000000000000000001000110001001101110000111111
00000000001000000000000000001000101111010110110101100001
00000000000100000000000000001000011111100111011010100001
00000000000010000000000000000011010100001111100111100101
00000000000001000000000000000000001110001000011100000011
00000000000000100000000000001011100001001100010001100111
00000000000000010000000000001011111001010100000001011001
00000000000000001000000000001011000011100100010100111001
00000000000000000100000000001110111100110000111110110001
00000000000000000010000000001100101001011001111111010101
00000000000000000001000000001010010101101010111101111001
00000000000000000000100000001010101000101101100101100010
00000000000000000000010000001110010101101101001101000000
00000000000000000000001000001100111100110111010100111100
00000000000000000000000100000101101000001011110100001000
00000000000000000000000010000111111100000000001100001100
00000000000000000000000001000000001111110100011100011100
00000000000000000000000000100110000001110011111111100010
00000000000000000000000000010000111111111000011111111110
$+88z^{10}+4430z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,7}; W_{56,2}; alpha=-53; |Aut|=24; (Theorem 3.2) R='F2+uF2+vF2+uvF2'; lambda=1; mu=5; a=[DB9]; b=[D45]; c=[88D]; xi=[D654]; $
10000000000000000000000000000001101001001010011100001111
01000000000000000000000000000000110100101001011100010111
00100000000000000000000000000001010000011000111100111011
00010000000000000000000000001011110010010011101100111110
00001000000000000000000000001101111001000011110110011110
00000100000000000000000000000111110100100011111001011110
00000010000000000000000000001000101011010000001011000011
00000001000000000000000000000100010111100000000111000011
00000000100000000000000000000001001110001100110000101100
00000000010000000000000000001000101101001101111100000001
00000000001000000000000000000100010100101110111100100001
00000000000100000000000000000011001000011111011100100001
00000000000010000000000000001110000011110111111111000010
00000000000001000000000000000000000011111111100011011101
00000000000000100000000000001001110000111100011010010010
00000000000000010000000000000101110001011100001101001010
00000000000000001000000000000011110011101100010100000110
00000000000000000100000000001110110011111010111100100100
00000000000000000010000000001111011001111011011110010000
00000000000000000001000000001111100101111001111101001000
00000000000000000000100000000000101100001110001010110100
00000000000000000000010000000000011100001101000101111000
00000000000000000000001000000011000010110000010011100011
00000000000000000000000100000111110000000110001011010011
00000000000000000000000010001011110010000101000101001011
00000000000000000000000001001101110010000100110010000111
00000000000000000000000000101111111100001011100000111101
00000000000000000000000000011110001101110100000000111111
$+96z^{10}+4414z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,8}; W_{56,2}; alpha=-52; |Aut|=24; (Theorem 3.2) R='F2+uF2+vF2+uvF2'; lambda=1; mu=1; a=[31F]; b=[54D]; c=[00F]; xi=[D6DC]; $
10000000000000000000000000000001110010011000011010101101
01000000000000000000000000000001111001001000001111010101
00100000000000000000000000000001110100101000010101111001
00010000000000000000000000001110001000001010110010011000
00001000000000000000000000001110000100001011001001001100
00000100000000000000000000001110000010001001100100110100
00000010000000000000000000000101001001100111010011101110
00000001000000000000000000000010100100110101101011110110
00000000100000000000000000001000010011010110100111111010
00000000010000000000000000000100001010111101110101110001
00000000001000000000000000000010001101011110111010101001
00000000000100000000000000001000000111101111001111000101
00000000000010000000000000001111110001110100000011100000
00000000000001000000000000000000001111111111100000011101
00000000000000100000000000000001101010110100011100100110
00000000000000010000000000000000111101010100011110010010
00000000000000001000000000000001010111100100011101001010
00000000000000000100000000001011001001100011100010000010
00000000000000000010000000001100100100110011100001000010
00000000000000000001000000000110010011010011100000100010
00000000000000000000100000001101001110111001010010011001
00000000000000000000010000000110101111011000101001001101
00000000000000000000001000001010011111101010000100110101
00000000000000000000000100000111010111000101000010101111
00000000000000000000000010001011101010100100100011010111
00000000000000000000000001001100111100010110000001111011
00000000000000000000000000100000001110000011111100011101
00000000000000000000000000011110000001110100000011111111
$+100z^{10}+4406z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,9}; W_{56,2}; alpha=-51; |Aut|=4; (Theorem 3.2) R='F2+uF2+vF2+uvF2'; lambda=1; mu=F; a=[FA7]; b=[FB5]; c=[C47]; xi=[76AB]; $
10000000000000000000000000000110110100001111100001000101
01000000000000000000000000001010101101110111111111001111
00100000000000000000000000001101101000001111100010001001
00010000000000000000000000000010000111100101001000001101
00001000000000000000000000001110010100101101010111111111
00000100000000000000000000001000101101111001001011110100
00000010000000000000000000000110010000011101101101110101
00000001000000000000000000001101110000011111001110100001
00000000100000000000000000000001000000011100001111011001
00000000010000000000000000000101010001000000001110110101
00000000001000000000000000000101110000111101111000101100
00000000000100000000000000000100011110111011011110011111
00000000000010000000000000001010111110111001001000000111
00000000000001000000000000001111101110100011111011110111
00000000000000100000000000001110000100010101101101000011
00000000000000010000000000001111111100111110101011011101
00000000000000001000000000001110001000100111011010000011
00000000000000000100000000000100100000110100100001111001
00000000000000000010000000000101011111111111100101001011
00000000000000000001000000000100101111010010001011011110
00000000000000000000100000000110110111010101100100000111
00000000000000000000010000001100111010000111011100000111
00000000000000000000001000000000111101100100010000000111
00000000000000000000000100000000111011010101010100010000
00000000000000000000000010000111100010110001011100001111
00000000000000000000000001001101111001111101000111101110
00000000000000000000000000100100100000011110101111101110
00000000000000000000000000011111101111011111111011101000
$+104z^{10}+4398z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,10}; W_{56,1}; alpha=-49; |Aut|=6; (Theorem 3.2) R='F4+uF4'; lambda=1; mu=1; a=[48D]; b=[5F2]; c=[CC9]; xi=[6F67]; $
10000000000000000000000000001000000110001100001010100111
01000000000000000000000000000100001010001100000111010011
00100000000000000000000000000010001100001100010001101011
00010000000000000000000000001110001001110100110011011111
00001000000000000000000000001110000101100010010110000001
00000100000000000000000000001110000011010001011001000001
00000010000000000000000000001000111111010011010100011100
00000001000000000000000000000100100001111001100111111111
00000000100000000000000000000010010001101110101100000001
00000000010000000000000000001111111010111101000011110011
00000000001000000000000000001111100010100100111100001000
00000000000100000000000000001111011000010110011100000100
00000000000010000000000000000000001111001111111100000001
00000000000001000000000000001111001111001011111111111111
00000000000000100000000000000000101010011110001011000100
00000000000000010000000000000000011100111001011010001110
00000000000000001000000000000000111000100000110010110101
00000000000000000100000000001101111100001100110001001110
00000000000000000010000000000111101000000010001000101011
00000000000000000001000000001011010100000001000110000111
00000000000000000000100000000011100000000010111011100100
00000000000000000000010000001001010000000011001111110000
00000000000000000000001000000101111110001101110111110101
00000000000000000000000100000101000001110101001110100011
00000000000000000000000010000011000001100000101000111101
00000000000000000000000001001001000001010010000110011101
00000000000000000000000000100000111110001100000000011101
00000000000000000000000000010000000000110100011111111110
$+112z^{10}+4638z^{12} GL-K:0 GL-LK:0$

?28 56 2 $ C_{56,11}; W_{56,1}; alpha=-45; |Aut|=2; (Theorem 3.2) R='F4+uF4'; lambda=D; mu=9; a=[B5D]; b=[D61]; c=[900]; xi=[6F67]; $
10000000000000000000000000001100000100101100111010000010
01000000000000000000000000000001001011001000011101110110
00100000000000000000000000001110011010011010010110001011
00010000000000000000000000001000011101101111110001010111
00001000000000000000000000000011100010011011010001000100
00000100000000000000000000001111010010100111010100101010
00000010000000000000000000001011001001110100010011011110
00000001000000000000000000001110011010111111101010110000
00000000100000000000000000001001110000011111101101010111
00000000010000000000000000000110101011111101001011101100
00000000001000000000000000001101100101101100110001000100
00000000000100000000000000001110001000010111100010001011
00000000000010000000000000000111111000101001011001000111
00000000000001000000000000001101100111110010011000100000
00000000000000100000000000001100110011001110010101100011
00000000000000010000000000000001010100110110111000101001
00000000000000001000000000001101111110110000010110111100
00000000000000000100000000001011100011000000010000011101
00000000000000000010000000001011011101010111000110010100
00000000000000000001000000001001110100110101000110010010
00000000000000000000100000001110110101010001111000000100
00000000000000000000010000001010101110110011011101100011
00000000000000000000001000000111110111011100110000001100
00000000000000000000000100001001001010101100000110011110
00000000000000000000000010000001111011001010100001111000
00000000000000000000000001001010101110110001100110011111
00000000000000000000000000100011011110110110111111010110
00000000000000000000000000010000000011101110110111101101
$+128z^{10}+4606z^{12} GL-K:0 GL-LK:0$