Our main result is an efficient construction of a hitting set generator against the class of polynomials of degree d{sub}i in the i-th variable. The seed length of this generator is log D+O{top}~(log^(1/2)D). Here, log D=∑log(d{sub}i+1) is a lower bound on the seed length of any hitting set generator against this class. Our construction is the first to achieve asymptotically optimal seed length for every choice of the parameters d{sub}i. In fact, we present a nearly linear time construction with this asymptotic guarantee. Furthermore, our results extend to classes of polynomials parameterized by upper bounds on the number of nonzero terms in each variable. Underlying our constructions is a general and novel framework that exploits the product structure common to the classes of polynomials we consider. This framework allows us to obtain efficient and asymptotically optimal hitting set generators from primitives that need not be optimal or efficient by themselves. As our main corollary, we obtain the first blackbox polynomial identity tests with an asymptotically optimal randomness consumption.
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机译:我们的主要结果是对I-TH变量中的D度D {} I的多项式的多项式的击中集发电机的有效施工。此发生器的种子长度为log d + o {top}〜(log ^(1/2)d)。这里,log d =Σlog(d {sub} i + 1)是对该类的任何击中设置发生器的种子长度的下限。我们的建筑是第一个实现参数D {Sub} I的各种选择的渐近最佳种子长度。事实上,我们展示了具有这种渐近保证的几乎线性的时间施工。此外,我们的结果扩展到每个变量中的非零项数量的上限参数化的多项式类别。我们的建筑基础是一般和新颖的框架,利用我们考虑的多项式类别的产品结构。该框架允许我们从自己不需要最佳或有效的原语获得高效且渐近最佳的击中集发电机。作为我们的主要推论,我们获得了具有渐近最佳随机性消耗的第一个Blackbox多项式标识测试。
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