We are interested in proving exponential lower bounds on the size of nondeterministic D-way branching programs computing functions f:Dn→{0,1} in linear time, that is, in time at most kn for a constant k. Ajtai has proved such lower bounds for explicit functions over domains D of size about n, and Beame, Saks and Thathachar for functions over domains of size about 22k. We prove an exponential lower bound 2Ω(n/ck) for an explicit function over substantially smaller domain D of size about 2k. Our function is a universal function of linear codes.