{"id":215204,"date":"2016-03-06T00:00:00","date_gmt":"2016-03-06T00:00:00","guid":{"rendered":"https:\/\/www.microsoft.com\/en-us\/research\/msr-research-item\/reducing-depth-in-constrained-prfs-from-bit-fixing-to-nc\/"},"modified":"2018-10-16T21:40:39","modified_gmt":"2018-10-17T04:40:39","slug":"reducing-depth-in-constrained-prfs-from-bit-fixing-to-nc","status":"publish","type":"msr-research-item","link":"https:\/\/www.microsoft.com\/en-us\/research\/publication\/reducing-depth-in-constrained-prfs-from-bit-fixing-to-nc\/","title":{"rendered":"Reducing Depth in Constrained PRFs: From Bit-Fixing to NC"},"content":{"rendered":"<p>The candidate construction of multilinear maps by Garg, Gentry, and Halevi (Eurocrypt 2013) has lead to an explosion of new cryptographic constructions ranging from attribute-based encryption (ABE) for arbitrary polynomial size circuits, to program obfuscation, and to constrained pseudorandom functions (PRFs). Many of these constructions require k-linear maps for large k. In this work, we focus on the reduction of k in certain constructions of access control primitives that are based on k-linear maps; in particular, we consider the case of constrained PRFs and ABE. We construct the following objects:<\/p>\n<p>&#8211; A constrained PRF for arbitrary circuit predicates based on (n+l_{OR}-1)-linear maps (where n is the input length and l_{OR} denotes the OR-depth of the circuit).<\/p>\n<p>&#8211; For circuits with a specific structure, we also show how to construct such PRFs based on (n+l_{AND}-1)-linear maps (where l_{AND} denotes the AND-depth of the circuit).<\/p>\n<p>We then give a black-box construction of a constrained PRF for NC1 predicates, from any bit-fixing constrained PRF that fixes only one of the input bits to 1; we only require that the bit-fixing PRF have certain key homomorphic properties. This construction is of independent interest as it sheds light on the hardness of constructing constrained PRFs even for &#8220;simple&#8221; predicates such as bit-fixing predicates.<\/p>\n<p>Instantiating this construction with the bit-fixing constrained PRF from Boneh and Waters (Asiacrypt 2013) gives us a constrained PRF for NC1 predicates that is based only on n-linear maps, with no dependence on the predicate. In contrast, the previous constructions of constrained PRFs (Boneh and Waters, Asiacrypt 2013) required (n+l+1)-linear maps for circuit predicates (where l is the total depth of the circuit) and n-linear maps even for bit-fixing predicates.<\/p>\n<p>We also show how to extend our techniques to obtain a similar improvement in the case of ABE and construct ABE for arbitrary circuits based on (l_{OR}+1)-linear (respectively (l_{AND}+1)-linear) maps.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>The candidate construction of multilinear maps by Garg, Gentry, and Halevi (Eurocrypt 2013) has lead to an explosion of new cryptographic constructions ranging from attribute-based encryption (ABE) for arbitrary polynomial size circuits, to program obfuscation, and to constrained pseudorandom functions (PRFs). Many of these constructions require k-linear maps for large k. In this work, we [&hellip;]<\/p>\n","protected":false},"featured_media":0,"template":"","meta":{"msr-url-field":"","msr-podcast-episode":"","msrModifiedDate":"","msrModifiedDateEnabled":false,"ep_exclude_from_search":false,"_classifai_error":"","msr-author-ordering":null,"msr_publishername":"Springer","msr_publisher_other":"","msr_booktitle":"","msr_chapter":"","msr_edition":"Public Key Cryptography (PKC) 2016","msr_editors":"","msr_how_published":"","msr_isbn":"","msr_issue":"","msr_journal":"","msr_number":"","msr_organization":"","msr_pages_string":"359-385","msr_page_range_start":"359","msr_page_range_end":"385","msr_series":"","msr_volume":"","msr_copyright":"","msr_conference_name":"Public Key Cryptography (PKC) 2016","msr_doi":"","msr_arxiv_id":"","msr_s2_paper_id":"","msr_mag_id":"","msr_pubmed_id":"","msr_other_authors":"Srinivasan Raghuraman, Dhinakaran 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