Circuits with arbitrary gates for random operators
Abstract
We consider boolean circuits computing n-operators f:0,1n --> 0,1n. As gates we allow arbitrary boolean functions; neither fanin nor fanout of gates is restricted. An operator is linear if it computes n linear forms, that is, computes a matrix-vector product y=Ax over GF(2). We prove the existence of n-operators requiring about n2 wires in any circuit, and linear n-operators requiring about n2/ n wires in depth-2 circuits, if either all output gates or all gates on the middle layer are linear.
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