Quantum secure non-malleable-extractors

Abstract

We construct several explicit quantum secure non-malleable-extractors. All the quantum secure non-malleable-extractors we construct are based on the constructions by Chattopadhyay, Goyal and Li [2015] and Cohen [2015]. 1) We construct the first explicit quantum secure non-malleable-extractor for (source) min-entropy k ≥ poly( ( nε )) (n is the length of the source and ε is the error parameter). Previously Aggarwal, Chung, Lin, and Vidick [2019] have shown that the inner-product based non-malleable-extractor proposed by Li [2012] is quantum secure, however it required linear (in n) min-entropy and seed length. Using the connection between non-malleable-extractors and privacy amplification (established first in the quantum setting by Cohen and Vidick [2017]), we get a 2-round privacy amplification protocol that is secure against active quantum adversaries with communication poly( ( nε )), exponentially improving upon the linear communication required by the protocol due to [2019]. 2) We construct an explicit quantum secure 2-source non-malleable-extractor for min-entropy k ≥ n- n(1), with an output of size n(1) and error 2- n(1). 3) We also study their natural extensions when the tampering of the inputs is performed t-times. We construct explicit quantum secure t-non-malleable-extractors for both seeded (t=d(1)) as well as 2-source case (t=n(1)).