74,117 research outputs found
Towards a General Direct Product Testing Theorem
The Direct Product encoding of a string a in {0,1}^n on an underlying domain V subseteq ([n] choose k), is a function DP_V(a) which gets as input a set S in V and outputs a restricted to S. In the Direct Product Testing Problem, we are given a function F:V -> {0,1}^k, and our goal is to test whether F is close to a direct product encoding, i.e., whether there exists some a in {0,1}^n such that on most sets S, we have F(S)=DP_V(a)(S). A natural test is as follows: select a pair (S,S\u27)in V according to some underlying distribution over V x V, query F on this pair, and check for consistency on their intersection. Note that the above distribution may be viewed as a weighted graph over the vertex set V and is referred to as a test graph.
The testability of direct products was studied over various domains and test graphs: Dinur and Steurer (CCC \u2714) analyzed it when V equals the k-th slice of the Boolean hypercube and the test graph is a member of the Johnson graph family. Dinur and Kaufman (FOCS \u2717) analyzed it for the case where V is the set of faces of a Ramanujan complex, where in this case V=O_k(n). In this paper, we study the testability of direct products in a general setting, addressing the question: what properties of the domain and the test graph allow one to prove a direct product testing theorem?
Towards this goal we introduce the notion of coordinate expansion of a test graph. Roughly speaking a test graph is a coordinate expander if it has global and local expansion, and has certain nice intersection properties on sampling. We show that whenever the test graph has coordinate expansion then it admits a direct product testing theorem. Additionally, for every k and n we provide a direct product domain V subseteq (n choose k) of size n, called the Sliding Window domain for which we prove direct product testability
On arithmetic intersection numbers on self-products of curves
We give a close formula for the N\'eron-Tate height of tautological integral
cycles on Jacobians of curves over number fields as well as a new lower bound
for the arithmetic self-intersection number of the dualizing
sheaf of a curve in terms of Zhang's invariant . As an application, we
obtain an effective Bogomolov-type result for the tautological cycles. We
deduce these results from a more general combinatorial computation of
arithmetic intersection numbers of adelic line bundles on higher self-products
of curves, which are linear combinations of pullbacks of line bundles on the
curve and the diagonal bundle.Comment: 21 pages. Comments are welcome
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