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596 lines
19 KiB
596 lines
19 KiB
\* Any Wolfram elementary CA in 6D eucl. Neumann CA grid emulator generator *\
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\* Written and converted to *LP format by NASZVADI, Peter, 2016,2017 *\
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\* <vuk@cs.elte.hu> *\
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\* Standalone version; GMPL version is in wolfra6d.mod *\
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\* This model looks up for a subset of vertices in 6D euclyd. grid, *\
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\* which has the following properties: *\
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\* 1. each vertex' coordinate pairs' difference is at most 1 *\
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\* 2. contains the vertices in the main diagonal of the 6d space *\
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\* 3. connecting with directed graph edges from all selected vertices *\
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\* to all selected ones with greater coordinate sums with *\
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\* Hamming-distance 1, the following in-out edge numbers are *\
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\* allowed: (3,6), (1,2), (2,3), (1,2), (4,1), (3,1); according to *\
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\* the mod 6 sum of the coordinate values *\
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\* 4. Only vertices of the unit cube's with {0,1} coordinates are *\
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\* calculated, but the other cells could be obtained via shifting. *\
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\* Assume that the grid is a 6dim. cellular automaton grid with Neumann- *\
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\* -neighbourhood, now construct an outer-totalistic rule that emulates *\
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\* W110 cellular automaton on the selected vertices: *\
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\* Suppose that the 1D W110 cellspace cells are denoted with signed *\
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\* integers. Every 1D cell is assigned to (at most "6 over 2") selected *\
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\* vertices where each coordinate sums are the same with the integer *\
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\* assigned to the origin cell in the domain, they must have the same *\
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\* value. Rule-110 means that cell's value is being changed only when its *\
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\* neighbours are: (1,1,1), (1,0,1), (0,0,1), other cells remain unchanged. *\
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\* Let's denote the default cellstate with "2" in the 6D automaton, and *\
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\* the remaining 2 states with "0" and "1" respectively, which correspond *\
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\* with the states in W110. The selected vertices must be 0 or 1 of course, *\
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\* and the others are "2". *\
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\* Now, the transition rule for emulating W110 is the following: *\
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\* (x),{1,1,1,1,1,1,1,1,1,2,2,2}->(1-x), x!=2, *\
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\* (x),{1,1,1,2,2,2,2,2,2,2,2,2}->(1-x), x!=2, *\
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\* (x),{1,1,1,1,2,2,2,2,2,2,2,2}->(1-x), x!=2, *\
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\* (x),{1,1,1,1,1,2,2,2,2,2,2,2}->(1-x), x!=2, *\
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\* (1),{0,0,0,1,1,1,1,1,1,2,2,2}->(0), *\
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\* (1),{0,1,1,2,2,2,2,2,2,2,2,2}->(0), *\
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\* (1),{0,0,1,1,1,2,2,2,2,2,2,2}->(0), *\
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\* (1),{0,0,0,0,1,2,2,2,2,2,2,2}->(0), *\
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\* (1),{0,0,0,1,2,2,2,2,2,2,2,2}->(0); *\
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\* notation: (old state),{old neighbours - all permutations}->(new state) *\
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\* Other states won't change between two generations. And is known that W110 *\
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\* is Turing-complete. So there is a universal CA rule in 6+D eucl. gridS *\
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\* Result is in x****** binary variables (total 44 among the 64) *\
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Minimize
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obj: x000000 +x000001 +x000010 +x000011 +x000100 +x000101 +x000110 +x000111
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+x001000 +x001001 +x001010 +x001011 +x001100 +x001101 +x001110 +x001111
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+x010000 +x010001 +x010010 +x010011 +x010100 +x010101 +x010110 +x010111
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+x011000 +x011001 +x011010 +x011011 +x011100 +x011101 +x011110 +x011111
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+x100000 +x100001 +x100010 +x100011 +x100100 +x100101 +x100110 +x100111
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+x101000 +x101001 +x101010 +x101011 +x101100 +x101101 +x101110 +x101111
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+x110000 +x110001 +x110010 +x110011 +x110100 +x110101 +x110110 +x110111
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+x111000 +x111001 +x111010 +x111011 +x111100 +x111101 +x111110 +x111111
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Subject To
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x000000 = 1
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x111111 = 1
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x111110 -x111101 >= 0
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x111101 -x111011 >= 0
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x111011 -x110111 >= 0
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x110111 -x101111 >= 0
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x101111 -x011111 >= 0
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dn000000 -dn111111 = 0
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up000000 -up111111 = 0
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cup000000:
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x000001 +x000010 +x000100 +x001000 +x010000 +x100000 -up000000 = 0
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cup000001:
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x000011 +x000101 +x001001 +x010001 +x100001 -up000001 = 0
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cup000010:
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x000011 +x000110 +x001010 +x010010 +x100010 -up000010 = 0
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cup000011:
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x000111 +x001011 +x010011 +x100011 -up000011 = 0
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cup000100:
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x000101 +x000110 +x001100 +x010100 +x100100 -up000100 = 0
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cup000101:
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x000111 +x001101 +x010101 +x100101 -up000101 = 0
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cup000110:
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x000111 +x001110 +x010110 +x100110 -up000110 = 0
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cup000111:
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x001111 +x010111 +x100111 -up000111 = 0
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cup001000:
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x001001 +x001010 +x001100 +x011000 +x101000 -up001000 = 0
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cup001001:
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x001011 +x001101 +x011001 +x101001 -up001001 = 0
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cup001010:
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x001011 +x001110 +x011010 +x101010 -up001010 = 0
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cup001011:
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x001111 +x011011 +x101011 -up001011 = 0
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cup001100:
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x001101 +x001110 +x011100 +x101100 -up001100 = 0
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cup001101:
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x001111 +x011101 +x101101 -up001101 = 0
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cup001110:
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x001111 +x011110 +x101110 -up001110 = 0
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cup001111:
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x011111 +x101111 -up001111 = 0
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cup010000:
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x010001 +x010010 +x010100 +x011000 +x110000 -up010000 = 0
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cup010001:
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x010011 +x010101 +x011001 +x110001 -up010001 = 0
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cup010010:
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x010011 +x010110 +x011010 +x110010 -up010010 = 0
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cup010011:
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x010111 +x011011 +x110011 -up010011 = 0
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cup010100:
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x010101 +x010110 +x011100 +x110100 -up010100 = 0
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cup010101:
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x010111 +x011101 +x110101 -up010101 = 0
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cup010110:
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x010111 +x011110 +x110110 -up010110 = 0
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cup010111:
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x011111 +x110111 -up010111 = 0
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cup011000:
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x011001 +x011010 +x011100 +x111000 -up011000 = 0
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cup011001:
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x011011 +x011101 +x111001 -up011001 = 0
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cup011010:
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x011011 +x011110 +x111010 -up011010 = 0
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cup011011:
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x011111 +x111011 -up011011 = 0
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cup011100:
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x011101 +x011110 +x111100 -up011100 = 0
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cup011101:
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x011111 +x111101 -up011101 = 0
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cup011110:
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x011111 +x111110 -up011110 = 0
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cup011111:
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x111111 -up011111 = 0
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cup100000:
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x100001 +x100010 +x100100 +x101000 +x110000 -up100000 = 0
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cup100001:
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x100011 +x100101 +x101001 +x110001 -up100001 = 0
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cup100010:
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x100011 +x100110 +x101010 +x110010 -up100010 = 0
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cup100011:
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x100111 +x101011 +x110011 -up100011 = 0
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cup100100:
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x100101 +x100110 +x101100 +x110100 -up100100 = 0
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cup100101:
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x100111 +x101101 +x110101 -up100101 = 0
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cup100110:
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x100111 +x101110 +x110110 -up100110 = 0
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cup100111:
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x101111 +x110111 -up100111 = 0
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cup101000:
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x101001 +x101010 +x101100 +x111000 -up101000 = 0
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cup101001:
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x101011 +x101101 +x111001 -up101001 = 0
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cup101010:
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x101011 +x101110 +x111010 -up101010 = 0
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cup101011:
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x101111 +x111011 -up101011 = 0
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cup101100:
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x101101 +x101110 +x111100 -up101100 = 0
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cup101101:
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x101111 +x111101 -up101101 = 0
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cup101110:
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x101111 +x111110 -up101110 = 0
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cup101111:
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x111111 -up101111 = 0
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cup110000:
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x110001 +x110010 +x110100 +x111000 -up110000 = 0
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cup110001:
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x110011 +x110101 +x111001 -up110001 = 0
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cup110010:
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x110011 +x110110 +x111010 -up110010 = 0
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cup110011:
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x110111 +x111011 -up110011 = 0
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cup110100:
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x110101 +x110110 +x111100 -up110100 = 0
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cup110101:
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x110111 +x111101 -up110101 = 0
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cup110110:
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x110111 +x111110 -up110110 = 0
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cup110111:
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x111111 -up110111 = 0
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cup111000:
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x111001 +x111010 +x111100 -up111000 = 0
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cup111001:
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x111011 +x111101 -up111001 = 0
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cup111010:
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x111011 +x111110 -up111010 = 0
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cup111011:
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x111111 -up111011 = 0
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cup111100:
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x111101 +x111110 -up111100 = 0
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cup111101:
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x111111 -up111101 = 0
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cup111110:
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x111111 -up111110 = 0
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cdn000001:
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x000000 -dn000001 = 0
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cdn000010:
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x000000 -dn000010 = 0
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cdn000011:
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x000001 +x000010 -dn000011 = 0
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cdn000100:
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x000000 -dn000100 = 0
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cdn000101:
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x000001 +x000100 -dn000101 = 0
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cdn000110:
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x000010 +x000100 -dn000110 = 0
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cdn000111:
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x000011 +x000101 +x000110 -dn000111 = 0
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cdn001000:
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x000000 -dn001000 = 0
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cdn001001:
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x000001 +x001000 -dn001001 = 0
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cdn001010:
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x000010 +x001000 -dn001010 = 0
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cdn001011:
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x000011 +x001001 +x001010 -dn001011 = 0
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cdn001100:
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x000100 +x001000 -dn001100 = 0
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cdn001101:
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x000101 +x001001 +x001100 -dn001101 = 0
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cdn001110:
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x000110 +x001010 +x001100 -dn001110 = 0
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cdn001111:
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x000111 +x001011 +x001101 +x001110 -dn001111 = 0
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cdn010000:
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x000000 -dn010000 = 0
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cdn010001:
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x000001 +x010000 -dn010001 = 0
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cdn010010:
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x000010 +x010000 -dn010010 = 0
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cdn010011:
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x000011 +x010001 +x010010 -dn010011 = 0
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cdn010100:
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x000100 +x010000 -dn010100 = 0
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cdn010101:
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x000101 +x010001 +x010100 -dn010101 = 0
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cdn010110:
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x000110 +x010010 +x010100 -dn010110 = 0
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cdn010111:
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x000111 +x010011 +x010101 +x010110 -dn010111 = 0
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cdn011000:
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x001000 +x010000 -dn011000 = 0
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cdn011001:
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x001001 +x010001 +x011000 -dn011001 = 0
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cdn011010:
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x001010 +x010010 +x011000 -dn011010 = 0
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cdn011011:
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x001011 +x010011 +x011001 +x011010 -dn011011 = 0
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cdn011100:
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x001100 +x010100 +x011000 -dn011100 = 0
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cdn011101:
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x001101 +x010101 +x011001 +x011100 -dn011101 = 0
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cdn011110:
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x001110 +x010110 +x011010 +x011100 -dn011110 = 0
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cdn011111:
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x001111 +x010111 +x011011 +x011101 +x011110 -dn011111 = 0
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cdn100000:
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x000000 -dn100000 = 0
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cdn100001:
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x000001 +x100000 -dn100001 = 0
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cdn100010:
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x000010 +x100000 -dn100010 = 0
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cdn100011:
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x000011 +x100001 +x100010 -dn100011 = 0
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cdn100100:
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x000100 +x100000 -dn100100 = 0
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cdn100101:
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x000101 +x100001 +x100100 -dn100101 = 0
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cdn100110:
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x000110 +x100010 +x100100 -dn100110 = 0
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cdn100111:
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x000111 +x100011 +x100101 +x100110 -dn100111 = 0
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cdn101000:
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x001000 +x100000 -dn101000 = 0
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cdn101001:
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x001001 +x100001 +x101000 -dn101001 = 0
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cdn101010:
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x001010 +x100010 +x101000 -dn101010 = 0
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cdn101011:
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x001011 +x100011 +x101001 +x101010 -dn101011 = 0
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cdn101100:
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x001100 +x100100 +x101000 -dn101100 = 0
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cdn101101:
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x001101 +x100101 +x101001 +x101100 -dn101101 = 0
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cdn101110:
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x001110 +x100110 +x101010 +x101100 -dn101110 = 0
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cdn101111:
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x001111 +x100111 +x101011 +x101101 +x101110 -dn101111 = 0
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cdn110000:
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x010000 +x100000 -dn110000 = 0
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cdn110001:
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x010001 +x100001 +x110000 -dn110001 = 0
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cdn110010:
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x010010 +x100010 +x110000 -dn110010 = 0
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cdn110011:
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x010011 +x100011 +x110001 +x110010 -dn110011 = 0
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cdn110100:
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x010100 +x100100 +x110000 -dn110100 = 0
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cdn110101:
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x010101 +x100101 +x110001 +x110100 -dn110101 = 0
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cdn110110:
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x010110 +x100110 +x110010 +x110100 -dn110110 = 0
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cdn110111:
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x010111 +x100111 +x110011 +x110101 +x110110 -dn110111 = 0
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cdn111000:
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x011000 +x101000 +x110000 -dn111000 = 0
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cdn111001:
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x011001 +x101001 +x110001 +x111000 -dn111001 = 0
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cdn111010:
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x011010 +x101010 +x110010 +x111000 -dn111010 = 0
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cdn111011:
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x011011 +x101011 +x110011 +x111001 +x111010 -dn111011 = 0
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cdn111100:
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x011100 +x101100 +x110100 +x111000 -dn111100 = 0
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cdn111101:
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x011101 +x101101 +x110101 +x111001 +x111100 -dn111101 = 0
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cdn111110:
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x011110 +x101110 +x110110 +x111010 +x111100 -dn111110 = 0
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cdn111111:
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x011111 +x101111 +x110111 +x111011 +x111101 +x111110 -dn111111 = 0
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up000000 -6 x000000 >= 0
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up000000 +64 x000000 <= 70
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up000001 -2 x000001 >= 0
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up000001 +64 x000001 <= 66
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up000010 -2 x000010 >= 0
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up000010 +64 x000010 <= 66
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up000011 -3 x000011 >= 0
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up000011 +64 x000011 <= 67
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up000100 -2 x000100 >= 0
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up000100 +64 x000100 <= 66
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up000101 -3 x000101 >= 0
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up000101 +64 x000101 <= 67
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up000110 -3 x000110 >= 0
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up000110 +64 x000110 <= 67
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up000111 -2 x000111 >= 0
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up000111 +64 x000111 <= 66
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up001000 -2 x001000 >= 0
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up001000 +64 x001000 <= 66
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up001001 -3 x001001 >= 0
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up001001 +64 x001001 <= 67
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up001010 -3 x001010 >= 0
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up001010 +64 x001010 <= 67
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up001011 -2 x001011 >= 0
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up001011 +64 x001011 <= 66
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up001100 -3 x001100 >= 0
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up001100 +64 x001100 <= 67
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up001101 -2 x001101 >= 0
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up001101 +64 x001101 <= 66
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up001110 -2 x001110 >= 0
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up001110 +64 x001110 <= 66
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up001111 -1 x001111 >= 0
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up001111 +64 x001111 <= 65
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up010000 -2 x010000 >= 0
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up010000 +64 x010000 <= 66
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up010001 -3 x010001 >= 0
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up010001 +64 x010001 <= 67
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up010010 -3 x010010 >= 0
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up010010 +64 x010010 <= 67
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up010011 -2 x010011 >= 0
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up010011 +64 x010011 <= 66
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up010100 -3 x010100 >= 0
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up010100 +64 x010100 <= 67
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up010101 -2 x010101 >= 0
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up010101 +64 x010101 <= 66
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up010110 -2 x010110 >= 0
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up010110 +64 x010110 <= 66
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up010111 -1 x010111 >= 0
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up010111 +64 x010111 <= 65
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up011000 -3 x011000 >= 0
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up011000 +64 x011000 <= 67
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up011001 -2 x011001 >= 0
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up011001 +64 x011001 <= 66
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up011010 -2 x011010 >= 0
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up011010 +64 x011010 <= 66
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up011011 -1 x011011 >= 0
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up011011 +64 x011011 <= 65
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up011100 -2 x011100 >= 0
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up011100 +64 x011100 <= 66
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up011101 -1 x011101 >= 0
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up011101 +64 x011101 <= 65
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up011110 -1 x011110 >= 0
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up011110 +64 x011110 <= 65
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up011111 -1 x011111 >= 0
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up011111 +64 x011111 <= 65
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up100000 -2 x100000 >= 0
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up100000 +64 x100000 <= 66
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up100001 -3 x100001 >= 0
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up100001 +64 x100001 <= 67
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up100010 -3 x100010 >= 0
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up100010 +64 x100010 <= 67
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up100011 -2 x100011 >= 0
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up100011 +64 x100011 <= 66
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up100100 -3 x100100 >= 0
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up100100 +64 x100100 <= 67
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up100101 -2 x100101 >= 0
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up100101 +64 x100101 <= 66
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up100110 -2 x100110 >= 0
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up100110 +64 x100110 <= 66
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up100111 -1 x100111 >= 0
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up100111 +64 x100111 <= 65
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up101000 -3 x101000 >= 0
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up101000 +64 x101000 <= 67
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up101001 -2 x101001 >= 0
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up101001 +64 x101001 <= 66
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up101010 -2 x101010 >= 0
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up101010 +64 x101010 <= 66
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up101011 -1 x101011 >= 0
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up101011 +64 x101011 <= 65
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up101100 -2 x101100 >= 0
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up101100 +64 x101100 <= 66
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up101101 -1 x101101 >= 0
|
|
up101101 +64 x101101 <= 65
|
|
up101110 -1 x101110 >= 0
|
|
up101110 +64 x101110 <= 65
|
|
up101111 -1 x101111 >= 0
|
|
up101111 +64 x101111 <= 65
|
|
up110000 -3 x110000 >= 0
|
|
up110000 +64 x110000 <= 67
|
|
up110001 -2 x110001 >= 0
|
|
up110001 +64 x110001 <= 66
|
|
up110010 -2 x110010 >= 0
|
|
up110010 +64 x110010 <= 66
|
|
up110011 -1 x110011 >= 0
|
|
up110011 +64 x110011 <= 65
|
|
up110100 -2 x110100 >= 0
|
|
up110100 +64 x110100 <= 66
|
|
up110101 -1 x110101 >= 0
|
|
up110101 +64 x110101 <= 65
|
|
up110110 -1 x110110 >= 0
|
|
up110110 +64 x110110 <= 65
|
|
up110111 -1 x110111 >= 0
|
|
up110111 +64 x110111 <= 65
|
|
up111000 -2 x111000 >= 0
|
|
up111000 +64 x111000 <= 66
|
|
up111001 -1 x111001 >= 0
|
|
up111001 +64 x111001 <= 65
|
|
up111010 -1 x111010 >= 0
|
|
up111010 +64 x111010 <= 65
|
|
up111011 -1 x111011 >= 0
|
|
up111011 +64 x111011 <= 65
|
|
up111100 -1 x111100 >= 0
|
|
up111100 +64 x111100 <= 65
|
|
up111101 -1 x111101 >= 0
|
|
up111101 +64 x111101 <= 65
|
|
up111110 -1 x111110 >= 0
|
|
up111110 +64 x111110 <= 65
|
|
dn000001 -1 x000001 >= 0
|
|
dn000001 +64 x000001 <= 65
|
|
dn000010 -1 x000010 >= 0
|
|
dn000010 +64 x000010 <= 65
|
|
dn000011 -2 x000011 >= 0
|
|
dn000011 +64 x000011 <= 66
|
|
dn000100 -1 x000100 >= 0
|
|
dn000100 +64 x000100 <= 65
|
|
dn000101 -2 x000101 >= 0
|
|
dn000101 +64 x000101 <= 66
|
|
dn000110 -2 x000110 >= 0
|
|
dn000110 +64 x000110 <= 66
|
|
dn000111 -1 x000111 >= 0
|
|
dn000111 +64 x000111 <= 65
|
|
dn001000 -1 x001000 >= 0
|
|
dn001000 +64 x001000 <= 65
|
|
dn001001 -2 x001001 >= 0
|
|
dn001001 +64 x001001 <= 66
|
|
dn001010 -2 x001010 >= 0
|
|
dn001010 +64 x001010 <= 66
|
|
dn001011 -1 x001011 >= 0
|
|
dn001011 +64 x001011 <= 65
|
|
dn001100 -2 x001100 >= 0
|
|
dn001100 +64 x001100 <= 66
|
|
dn001101 -1 x001101 >= 0
|
|
dn001101 +64 x001101 <= 65
|
|
dn001110 -1 x001110 >= 0
|
|
dn001110 +64 x001110 <= 65
|
|
dn001111 -4 x001111 >= 0
|
|
dn001111 +64 x001111 <= 68
|
|
dn010000 -1 x010000 >= 0
|
|
dn010000 +64 x010000 <= 65
|
|
dn010001 -2 x010001 >= 0
|
|
dn010001 +64 x010001 <= 66
|
|
dn010010 -2 x010010 >= 0
|
|
dn010010 +64 x010010 <= 66
|
|
dn010011 -1 x010011 >= 0
|
|
dn010011 +64 x010011 <= 65
|
|
dn010100 -2 x010100 >= 0
|
|
dn010100 +64 x010100 <= 66
|
|
dn010101 -1 x010101 >= 0
|
|
dn010101 +64 x010101 <= 65
|
|
dn010110 -1 x010110 >= 0
|
|
dn010110 +64 x010110 <= 65
|
|
dn010111 -4 x010111 >= 0
|
|
dn010111 +64 x010111 <= 68
|
|
dn011000 -2 x011000 >= 0
|
|
dn011000 +64 x011000 <= 66
|
|
dn011001 -1 x011001 >= 0
|
|
dn011001 +64 x011001 <= 65
|
|
dn011010 -1 x011010 >= 0
|
|
dn011010 +64 x011010 <= 65
|
|
dn011011 -4 x011011 >= 0
|
|
dn011011 +64 x011011 <= 68
|
|
dn011100 -1 x011100 >= 0
|
|
dn011100 +64 x011100 <= 65
|
|
dn011101 -4 x011101 >= 0
|
|
dn011101 +64 x011101 <= 68
|
|
dn011110 -4 x011110 >= 0
|
|
dn011110 +64 x011110 <= 68
|
|
dn011111 -3 x011111 >= 0
|
|
dn011111 +64 x011111 <= 67
|
|
dn100000 -1 x100000 >= 0
|
|
dn100000 +64 x100000 <= 65
|
|
dn100001 -2 x100001 >= 0
|
|
dn100001 +64 x100001 <= 66
|
|
dn100010 -2 x100010 >= 0
|
|
dn100010 +64 x100010 <= 66
|
|
dn100011 -1 x100011 >= 0
|
|
dn100011 +64 x100011 <= 65
|
|
dn100100 -2 x100100 >= 0
|
|
dn100100 +64 x100100 <= 66
|
|
dn100101 -1 x100101 >= 0
|
|
dn100101 +64 x100101 <= 65
|
|
dn100110 -1 x100110 >= 0
|
|
dn100110 +64 x100110 <= 65
|
|
dn100111 -4 x100111 >= 0
|
|
dn100111 +64 x100111 <= 68
|
|
dn101000 -2 x101000 >= 0
|
|
dn101000 +64 x101000 <= 66
|
|
dn101001 -1 x101001 >= 0
|
|
dn101001 +64 x101001 <= 65
|
|
dn101010 -1 x101010 >= 0
|
|
dn101010 +64 x101010 <= 65
|
|
dn101011 -4 x101011 >= 0
|
|
dn101011 +64 x101011 <= 68
|
|
dn101100 -1 x101100 >= 0
|
|
dn101100 +64 x101100 <= 65
|
|
dn101101 -4 x101101 >= 0
|
|
dn101101 +64 x101101 <= 68
|
|
dn101110 -4 x101110 >= 0
|
|
dn101110 +64 x101110 <= 68
|
|
dn101111 -3 x101111 >= 0
|
|
dn101111 +64 x101111 <= 67
|
|
dn110000 -2 x110000 >= 0
|
|
dn110000 +64 x110000 <= 66
|
|
dn110001 -1 x110001 >= 0
|
|
dn110001 +64 x110001 <= 65
|
|
dn110010 -1 x110010 >= 0
|
|
dn110010 +64 x110010 <= 65
|
|
dn110011 -4 x110011 >= 0
|
|
dn110011 +64 x110011 <= 68
|
|
dn110100 -1 x110100 >= 0
|
|
dn110100 +64 x110100 <= 65
|
|
dn110101 -4 x110101 >= 0
|
|
dn110101 +64 x110101 <= 68
|
|
dn110110 -4 x110110 >= 0
|
|
dn110110 +64 x110110 <= 68
|
|
dn110111 -3 x110111 >= 0
|
|
dn110111 +64 x110111 <= 67
|
|
dn111000 -1 x111000 >= 0
|
|
dn111000 +64 x111000 <= 65
|
|
dn111001 -4 x111001 >= 0
|
|
dn111001 +64 x111001 <= 68
|
|
dn111010 -4 x111010 >= 0
|
|
dn111010 +64 x111010 <= 68
|
|
dn111011 -3 x111011 >= 0
|
|
dn111011 +64 x111011 <= 67
|
|
dn111100 -4 x111100 >= 0
|
|
dn111100 +64 x111100 <= 68
|
|
dn111101 -3 x111101 >= 0
|
|
dn111101 +64 x111101 <= 67
|
|
dn111110 -3 x111110 >= 0
|
|
dn111110 +64 x111110 <= 67
|
|
dn111111 -3 x111111 >= 0
|
|
dn111111 +64 x111111 <= 67
|
|
binary
|
|
x000000 x000001 x000010 x000011 x000100 x000101 x000110 x000111
|
|
x001000 x001001 x001010 x001011 x001100 x001101 x001110 x001111
|
|
x010000 x010001 x010010 x010011 x010100 x010101 x010110 x010111
|
|
x011000 x011001 x011010 x011011 x011100 x011101 x011110 x011111
|
|
x100000 x100001 x100010 x100011 x100100 x100101 x100110 x100111
|
|
x101000 x101001 x101010 x101011 x101100 x101101 x101110 x101111
|
|
x110000 x110001 x110010 x110011 x110100 x110101 x110110 x110111
|
|
x111000 x111001 x111010 x111011 x111100 x111101 x111110 x111111
|
|
integer
|
|
dn000000 up000000 dn000001 up000001 dn000010 up000010 dn000011 up000011
|
|
dn000100 up000100 dn000101 up000101 dn000110 up000110 dn000111 up000111
|
|
dn001000 up001000 dn001001 up001001 dn001010 up001010 dn001011 up001011
|
|
dn001100 up001100 dn001101 up001101 dn001110 up001110 dn001111 up001111
|
|
dn010000 up010000 dn010001 up010001 dn010010 up010010 dn010011 up010011
|
|
dn010100 up010100 dn010101 up010101 dn010110 up010110 dn010111 up010111
|
|
dn011000 up011000 dn011001 up011001 dn011010 up011010 dn011011 up011011
|
|
dn011100 up011100 dn011101 up011101 dn011110 up011110 dn011111 up011111
|
|
dn100000 up100000 dn100001 up100001 dn100010 up100010 dn100011 up100011
|
|
dn100100 up100100 dn100101 up100101 dn100110 up100110 dn100111 up100111
|
|
dn101000 up101000 dn101001 up101001 dn101010 up101010 dn101011 up101011
|
|
dn101100 up101100 dn101101 up101101 dn101110 up101110 dn101111 up101111
|
|
dn110000 up110000 dn110001 up110001 dn110010 up110010 dn110011 up110011
|
|
dn110100 up110100 dn110101 up110101 dn110110 up110110 dn110111 up110111
|
|
dn111000 up111000 dn111001 up111001 dn111010 up111010 dn111011 up111011
|
|
dn111100 up111100 dn111101 up111101 dn111110 up111110 dn111111 up111111
|
|
End
|