TY - GEN
T1 - Parameterized Convexity Testing
AU - Lahiri, Abhiruk
AU - Newman, Ilan
AU - Varma, Nithin
N1 - Publisher Copyright: Copyright © 2022 by SIAM.
PY - 2022
Y1 - 2022
N2 - In this work, we develop new insights into the fundamental problem of convexity testing of real-valued functions over the domain [n]. Specifically, we present a nonadaptive algorithm that, given inputs ε ∈ (0, 1), s ∈ N, and oracle access to a function, ε-tests convexity in O(log(s)/ε), where s is an upper bound on the number of distinct discrete derivatives of the function. We also show that this bound is tight. Since s ≤ n, our query complexity bound is at least as good as that of the optimal convexity tester (Ben Eliezer; ITCS 2019) with complexity O(logεεn ); our bound is strictly better when s = o(n). The main contribution of our work is to appropriately parameterize the complexity of convexity testing to circumvent the worst-case lower bound (Belovs et al.; SODA 2020) of Ω(log(εεn) ) expressed in terms of the input size and obtain a more efficient algorithm.
AB - In this work, we develop new insights into the fundamental problem of convexity testing of real-valued functions over the domain [n]. Specifically, we present a nonadaptive algorithm that, given inputs ε ∈ (0, 1), s ∈ N, and oracle access to a function, ε-tests convexity in O(log(s)/ε), where s is an upper bound on the number of distinct discrete derivatives of the function. We also show that this bound is tight. Since s ≤ n, our query complexity bound is at least as good as that of the optimal convexity tester (Ben Eliezer; ITCS 2019) with complexity O(logεεn ); our bound is strictly better when s = o(n). The main contribution of our work is to appropriately parameterize the complexity of convexity testing to circumvent the worst-case lower bound (Belovs et al.; SODA 2020) of Ω(log(εεn) ) expressed in terms of the input size and obtain a more efficient algorithm.
UR - http://www.scopus.com/inward/record.url?scp=85192786224&partnerID=8YFLogxK
M3 - Conference contribution
T3 - SIAM Symposium on Simplicity in Algorithms, SOSA 2022
SP - 174
EP - 181
BT - SIAM Symposium on Simplicity in Algorithms, SOSA 2022
PB - Society for Industrial and Applied Mathematics Publications
T2 - 5th SIAM Symposium on Simplicity in Algorithms, SOSA 2022, co-located with SODA 2022
Y2 - 10 January 2022 through 11 January 2022
ER -