Lower Bounds for Linear Decision Lists
Abstract
We demonstrate a lower bound technique for linear decision lists, which are decision lists where the queries are arbitrary linear threshold functions. We use this technique to prove an explicit lower bound by showing that any linear decision list computing the function MAJ XOR requires size 20.18 n. This completely answers an open question of Tur\'an and Vatan [FoCM'97]. We also show that the spectral classes PL1, PL∞, and the polynomial threshold function classes PT1, PT1, are incomparable to linear decision lists.
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