TY - GEN
T1 - Testing vs Estimation for Index-Invariant Properties in the Huge Object Model
AU - Chakraborty, Sourav
AU - Fischer, Eldar
AU - Ghosh, Arijit
AU - Levi, Amit
AU - Mishra, Gopinath
AU - Sen, Sayantan
N1 - Publisher Copyright:
© 2025 Owner/Author.
PY - 2025/6/15
Y1 - 2025/6/15
N2 - The Huge Object model of property testing [Goldreich and Ron, TheoretiCS 23] concerns properties of distributions supported on {0,1}n, where n is so large that even reading a single sampled string is unrealistic. Instead, query access is provided to the samples, and the efficiency of the algorithm is measured by the total number of queries that were made to them. Index-invariant properties under this model were defined in [Chakraborty et al., COLT 23], as a compromise between enduring the full intricacies of string testing when considering unconstrained properties, and giving up completely on the string structure when considering label-invariant properties. Index-invariant properties are those that are invariant through a consistent reordering of the bits of the involved strings. Here we provide an adaptation of Szemerédi's regularity method for this setting, and in particular show that if an index-invariant property admits an ϵ-test with a number of queries depending only on the proximity parameter ϵ, then it also admits a distance estimation algorithm whose number of queries depends only on the approximation parameter.
AB - The Huge Object model of property testing [Goldreich and Ron, TheoretiCS 23] concerns properties of distributions supported on {0,1}n, where n is so large that even reading a single sampled string is unrealistic. Instead, query access is provided to the samples, and the efficiency of the algorithm is measured by the total number of queries that were made to them. Index-invariant properties under this model were defined in [Chakraborty et al., COLT 23], as a compromise between enduring the full intricacies of string testing when considering unconstrained properties, and giving up completely on the string structure when considering label-invariant properties. Index-invariant properties are those that are invariant through a consistent reordering of the bits of the involved strings. Here we provide an adaptation of Szemerédi's regularity method for this setting, and in particular show that if an index-invariant property admits an ϵ-test with a number of queries depending only on the proximity parameter ϵ, then it also admits a distance estimation algorithm whose number of queries depends only on the approximation parameter.
KW - Distribution Testing
KW - Huge Object Model
KW - Index-Invariant properties
KW - Testing & Estimation of Properties
UR - https://www.scopus.com/pages/publications/105009807219
U2 - 10.1145/3717823.3718166
DO - 10.1145/3717823.3718166
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AN - SCOPUS:105009807219
T3 - Proceedings of the Annual ACM Symposium on Theory of Computing
SP - 1007
EP - 1018
BT - STOC 2025 - Proceedings of the 57th Annual ACM Symposium on Theory of Computing
A2 - Koucky, Michal
A2 - Bansal, Nikhil
T2 - 57th Annual ACM Symposium on Theory of Computing, STOC 2025
Y2 - 23 June 2025 through 27 June 2025
ER -