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Proximity Oblivious Testing

Proximity Oblivious Testing. Oded Goldreich Weizmann Institute of Science. Joint work with Dana Ron. ?. ?. ?. ?. ?. Focus: sub-linear time algorithms – performing the task by inspecting the object at few locations. Property Testing: informal definition.

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Proximity Oblivious Testing

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  1. Proximity Oblivious Testing Oded Goldreich Weizmann Institute of Science Joint work withDana Ron

  2. ? ? ? ? ? Focus: sub-linear time algorithms – performing the task by inspecting the object at few locations. Property Testing: informal definition A relaxation of a decision problem: For a fixed property Pand any object O, determine whether O has property P, or whether O is far from having property P(i.e., far from any other object having P).

  3. Property Testing: the standard definition • A property P = nPn , where Pn is a set of functions with domain Dn. • The tester gets explicit input n and , • and oracle access to a function with domain Dn. • If f Pn then Prob[Tf(n,) = 1] = 1. • If f is -far from Pn then Prob[Tf(n,)  1] > 2/3. Focus: query complexity q(n,)=q() ( « | Dn |) Terminology:is called the proximity parameter.

  4. How does a tester use the proximity parameter Some testers use the proximity parameter merely in order to determine the number of times that a basic test is performed, where the basic test is oblivious of the proximity parameter. We call such basic tests proximity oblivious testers. • Example:the BLR (linearity) tester. • On input (prox.par.) and oracle f, • repeat the following test O(1/ ) times: • Select uniformly x,y in Dn • Accept iff f(x)+f(y)=f(x+y).

  5. Proximity Oblivious Testing: the basic definition • A property P = nPn ’where Pn is a set of functions with domain Dn. • A P.O. Tester (POT) gets explicit input n (but not), • and oracle access to a function with domain Dn. • If fPn then Prob[Tf(n) = 1] = 1. • If fPn then Prob[Tf(n)  1] > (P(f)), • where :(0,1] (0,1] • andP(f) denotes the distance of f fromP. N.B.: A standard tester is obtained by repeating the POT (i.e., on prox. par. , repeat O(1/()) times). Focus: constant query complexity q(n)=q ( « | Dn |)

  6. Questions addressed in this work • Which “testable” properties have POTs? • How does the complexity of the standard tester obtained by repeating the POT compare to the complexity of the best possible standard tester . • These questions are studied mainly in two standard models • of testing graph properties: • the adjacency matrix model and the bounded-degree model. Example:the BLR (linearity) tester. The complexity of the (std.)tester obtained by repeating the POT equals (up to a constant) the complexity of the best possible standard tester.

  7. The adjacency matrix model: preliminaries and two simple examples A graph G=(V,E) is represented by a function g:[N][N]{0,1}. Example 1: Clique.The property of being a clique has a “trivial” two-query POT with ()=. Example 2: BiClique. The property of being a biclique has a three-query POT with ()=. Select s[N] arbitrarily, and random u,v[N], and accept iff the induced subgraph is a biclique (i.e., has an even number of edges).

  8. Example 2: analysis of the 3-query POT Select s[N] arbitrarily, and random u,v[N], and accept iff the induced subgraph is a biclique (i.e., has an even number of edges). Analysis technique: consider an induced partition. s (s) [N] \ (s) Suppose that the graph is -far from Biclique. Then #edges in same side + #non-edges between sides > N2 induced subgraph induced subgraph has 1 or 3 edges has a single edge

  9. Example 3: triangle-freeness [AFKS, Alon] THM:-freenesshas a 3-query POT with ()=1/Tower(1/), but no O(1)-query POT with ()=poly(). The point is that being-far from-freenessmeans thatN2edges must be omitted to obtain a-free graph,but this does not mean that the graph hasN3 (norpoly()N3 ) triangles. Conclusion: easy testability and POT-ness are “far from straightforward”.

  10. Example 4: testing bipartiteness Recall that Bipartitness is efficiently testable with poly(1/) queries. THM:Bipartitnesshas no O(1)-query POT. PF:A graph can be-far fromBipartitenessstill all its O(1)-vertex induced subgraphs may be bipartite. E.g., a super-cycle of (1/)(equal-sized) independent sets such that each adjacent pairs of sets is connected by a complete bipartite graph. Conclusion: easily testable properties may not have POTs.

  11. Characterization of graph properties having a POT THM (oversimplified):PropertyPhas an O(1)-query POT iff P equals the set of F-free graphs, where F is a fixed set of O(1)-size graphs. PF idea:Given a POT , we derive a canonical POT (a la [GT]), which yields a characterization of P in terms of forbidden subgraphs (equiv., allowed induced subgraphs). In the other direction, use [AFKS]. Clarification:For a set of graphsFand a graphG, we say thatGisF-free if no induced subgraph of G belongs to F. THM (actual):PropertyP = NPNhas a O(1)-query POT iff for some constant c and every N, it holds that PN equals the set of FN-free graphs, where FN is a set of c-size graphs.

  12. Example 5: testing Clique Collection (CC) Recall that CC is efficiently testable with Õ(1/) queries [GR], and even Õ(-4/3) non-adaptive queries suffice. THM:CChas a 3-query POT with ()=O(2), and no O(1)-query POT can do better. PF (of the lower bound): Consider a collection of 1/4 balanced bicliques, each of size 4N. This graph is -far fromCCwhile rejecting it requires hitting some biclique at least three times. Conclusion:The (std.) tester obtained by repeating the best POT may have significantly higher complexity than the standard tester.

  13. Example 6: testing c-Clique Collection (c-CC) Recall that c-CC is testable with Õ(1/) queries [GR], even non-adaptively! THM:For every c2, the property c-CChas a (c+1)-query POT with ()=O(c/2), and no O(1)-query POT can do better. PF (of the lower bound): Consider a graph consisting of c small cliques, each of size sqrt()N and a large clique of size (1-sqrt())N. This graph is -far fromc-CCwhile rejecting it requires hitting each of the c small cliques. Conclusion:The (std.) tester obtained by repeating the best POT may have tremendously higher complexity than the standard tester.

  14. The bounded-degree model: preliminaries A graph G=(V,E) of degree bound d, is represented by a function g:[N][d][N]{0}. • DEF (generalized subgraph freeness):graphs with vertices marked full, semi-full, and partial such that a disallowed mapping of F=([n],EF) to G=([N],E) satisfies • for full vertex v, map(neigh(v)) = neigh(map(v)) • for semi-full vertex v, map(neigh(v)) = neigh(map(v))  map([n]) • for partial vertex v, map(neigh(v))  neigh(map(v)) • E.g., induced (resp., non-induced) graph-freeness corresponds to the special case of using only semi-full (resp., partial) markings.

  15. Generalized subgraph freeness: non-propagation • DEF (abbrev.):a disallowed mapping of F=([n], EF) to G=([N],E) satisfies • for full vertex v, map(neigh(v)) = neigh(map(v)) • for semi-full vertex v, map(neigh(v)) = neigh(map(v))  map([n]) • for partial vertex v, map(neigh(v))  neigh(map(v)). Def:Fisnon-propagating if there exists :(0,1](0,1] such that if every mapping of every marked graph in Fto the graph G uses a vertex in B, then G is (|B|/N)-close to being F-free. • Not all setsFare non-propagating. • For any Fwith no full vertices, F is non-propagating. • Degree-regularity is captured by a non-propagating F.Note that this is a non-hereditary property.

  16. The bounded-degree model: characterization Def:Fisnon-propagatingif there exists :(0,1](0,1] such that if every mapping of every marked graph in Fto the graph G uses a vertex in B, then G is (|B|/N)-close to being F-free. • Not all setsFarenon-propagating. • For any F with no full vertices, F is non-propagating. • Degree-regularity is captured by a non-propagating F. THM (ov. sim.):A property P has an O(1)-query POT iff for some non-propagating F it holds that P equals F-freeness. OPEN:Can every generalized subgraph freeness property be captured by F-freeness for some non-propagating F?

  17. Other Models (of property testing) THM: If property P is testable by a non-adaptive tester that (i) makes a number of queries that only depends on the proximity parameter and (ii) rejects based on a constant-sized “witness”, then P has a POT. Note: strong codeword tests (cf. [GS]) correspond to POT. OPEN: Do codes of 1/polylog rate have O(1)-query codeword POT?

  18. The End The slides of this talk are available at http://www.wisdom.weizmann.ac.il/~oded/T/pot.ppt The paper itself is available at http://www.wisdom.weizmann.ac.il/~oded/p_testPOT.html

  19. On the companion paper “Algorithmic Aspects of Property Testing in the Dense Graphs Model” THM [GT]: If a graph property is testable by q(N,) queries then it is testable by a canonical tester of query complexity O(q(N,)2). A canonical tester inspects a random induced subgraph and accepted iff the inspected graph has a predetermined property. Me (since 2001): “In this model, there is no room for algorithms -- property testing reduces to sheer combinatorics.” Me (now): A finer examination (which cares for the quadratic blow-up) reveals the role of algorithms; as shown in the paper, adaptive algorithms outperform non-adaptive ones, which in turn outperform canonical testers.

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