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Spectral Norm, Economical Sieve, and Linear Invariance Testing of Boolean Functions

Authors Swarnalipa Datta , Arijit Ghosh , Chandrima Kayal , Manaswi Paraashar , Manmatha Roy

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LIPIcs.STACS.2026.30.pdf
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Subject Classification

ACM Subject Classification
  • Theory of computation → Boolean function learning
Keywords
  • Boolean Function
  • Isomorphism of Boolean Function
  • Fourier Analysis
  • Sublinear Algorithm
  • Property Testing

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Abstract

Given Boolean functions f, g : 𝔽₂ⁿ → {-1,+1}, we say they are linearly isomorphic if there exists A ∈ GL_n(𝔽₂) such that f(x) = g(Ax) for all x. We study this problem in the tolerant property testing framework under the known-unknown model, where g is given explicitly and f is accessible only via oracle queries, meaning the algorithm may adaptively request the value of f(x) for inputs x ∈ 𝔽₂ⁿ of its choice. Given parameters ε ≥ 0 and ω > 0, the goal is to distinguish whether there exists A ∈ GL_n(𝔽₂) such that the normalized Hamming distance between f and g(Ax) is at most ε, or whether for every A ∈ GL_n(𝔽₂) the distance is at least ε+ω.
Our main result is a tolerant tester making Õ ((m/ω) ⁴) queries to f, where m is an upper bound on the spectral norm of g, improving the previous Õ ((m/ω) ^{24}) bound of Wimmer and Yoshida. We complement this with a nearly matching lower bound of Ω(m²) for constant ω (for example, ω = 1/4), improving the prior Ω(log m) lower bound of Grigorescu, Wimmer and Xie. A key technical ingredient on the algorithmic side is a query-efficient local list corrector. For the lower bound, we give a reduction from communication complexity using a novel subclass of Maiorana-McFarland functions from symmetric-key cryptography.

Cite As Get BibTex

Swarnalipa Datta, Arijit Ghosh, Chandrima Kayal, Manaswi Paraashar, and Manmatha Roy. Spectral Norm, Economical Sieve, and Linear Invariance Testing of Boolean Functions. In 43rd International Symposium on Theoretical Aspects of Computer Science (STACS 2026). Leibniz International Proceedings in Informatics (LIPIcs), Volume 364, pp. 30:1-30:21, Schloss Dagstuhl – Leibniz-Zentrum für Informatik (2026) https://doi.org/10.4230/LIPIcs.STACS.2026.30

Author Details

Swarnalipa Datta
  • Indian Statistical Institute, Kolkata, India
Arijit Ghosh
  • Indian Statistical Institute, Kolkata, India
Chandrima Kayal
  • Université Paris Cité, CNRS, IRIF, France
Manaswi Paraashar
  • University of Copenhagen, Denmark
Manmatha Roy
  • Indian Statistical Institute, Kolkata, India

Funding

  • Ghosh, Arijit: Arijit Ghosh acknowledges partial support from the Science and Engineering Research Board (SERB), Government of India, through the MATRICS grant MTR/2023/001527, and from the Department of Science and Technology (DST), Government of India, through grant TPN-104427.
  • Kayal, Chandrima: Chandrima Kayal is supported by French PEPR integrated project EPiQ (ANR-22-PETQ-0007).
  • Roy, Manmatha: Manmatha Roy acknowledges support from the ISEA Phase-III initiative of the Ministry of Electronics and Information Technology (MeitY), Govt of India, through Grant No L-14017/1/2022-HRD.

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