# Wire high if exactly one high in Verilog

If I've got an array of 9 wires, is there an easy way to make a new wire that is high if exactly one of the 9 is high? I know I could do

``````wire[8:0] data;
wire exactlyOneActive;
assign exactlyOneActive = (data[0] & !data[1] & !data[2] ...) |
(!data[0] & data[1] & !data[2] ...) |
(!data[0] & !data[1] & data[2] ...) |
...etc
``````

but, yuck, right? Especially since the nine wires will probably be 25 at some point. Any better way to do this, maybe using `generate`? It has to be synthesizable too.

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``````assign zeroOrOnehot     = ~|(data & (data-1));
assign atLeastOneBitSet = |data;
assign exactlyOneActive = zeroOrOnehot & atLeastOneBitSet;
``````

Regards - Cliff Cummings - Verilog & SystemVerilog Guru

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I think something like this should work. For loop will be synthesizable as long as it has a constant loop counter, as this does:

``````#define N 8

wire [N:0] data;

reg [N:0] uniqueActive;

always @(data) begin
for (i=0 ; i < N; i = i+1 ) begin
uniqueActive[i] = (data == 1<<i);
end
end

assign exactlyOneActive = (uniqueActive != 0);
``````
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is the variable i an integer or a register? –  e19293001 Jun 22 '12 at 11:09
`i` would be an integer, in this example. This is still synthesizable as the loop would be unrolled at compile time. –  Morgan Nov 5 '12 at 11:36

This should be a pretty efficient design.

``````wire[8:0] data;
wire exactly_one_active;

//Total is log2_ceiling of data bits wide
// Remove binary weighting
wire  [3:0] total = data[8] + data[7] ... + data[0];

assign exactly_one_active = (total == 4'b1);
``````
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All the other solutions require O(N^2) gates. Note the following pattern

``````(a#b#c#d#e#f#g#h) & (a&b # c&d # e&f # g&h) & (a&b&c&d # e&f&g&h)
``````

where you test the aggregate xor, the xor of each pair, the xor of each group of 4, the xor of each group of 8 (not shown), etc, gives you a correct answer in O(N log(N)) gates. (You can verify logic on truth table generator). Not sure how to write this in a concise way in Verilog though.

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Here's an O(N) gate solution

``````wire[8:0] wires;
wire isOneHot;
wire[8:-1] moreThanOne;
wire[8:-1] atLeastOne;

genvar i;
generate
for (i=0; i<9; i=i+1) begin :b1
assign atLeastOne[i] = atLeastOne[i-1] | wires[i];
assign moreThanOne[i] = moreThanOne[i-1] | atLeastOne[i-1] & wires[i];
end
assign isOneHot = atLeastOne[8] & !moreThanOne[8];
endgenerate
``````
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