ROM

(redirected from Random oracle model)
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AcronymDefinition
ROMRead-Only Memory
ROMRome (Amtrak station code; Rome, NY)
ROMRomania
ROMRomans
ROMRange Of Motion
ROMRomanian (language)
ROMRange of Movement
ROMRight on the Money
ROMRecord of Materials (construction)
ROMRest of Market
ROMRoyal Ontario Museum (Canada)
ROMRunes of Magic (gaming)
ROMRun of Mine
ROMReturn of the Member (credit union evaluation)
ROMRisk of Mortality
ROMRun of the Mill
ROMRough Order of Magnitude (estimate)
ROMRing Opening Metathesis
ROMReturn on Marketing
ROMRivers of Mud
ROMRupture Of Membrane
ROMRookie of the Month (various sports)
ROMRegister of Merit (title in animal shows)
ROMRecycled Organic Material (agriculture)
ROMRandom Oracle Model (cryptography)
ROMRead Only Memory
ROMRisk and Opportunity Management (various locations)
ROMRome, Italy - Leonardo Da Vinci / Fiumicino (Airport Code)
ROMRemote Operations Manager (software)
ROMRestriction of Movement
ROMRadio Organisatioun Medernach (Luxembourg radio station)
ROMReturn On Management
ROMRegister Of Marriage
ROMRegional Oxidant Model
ROMResults-Oriented Monitoring (EU)
ROMRecord of Merit
ROMResult Oriented Management (management system)
ROMRoutine Outcome Measurement (mental health)
ROMRefuel On the Move
ROMRio Algom, Ltd. (Canada)
ROMRead Only Message
ROMRepair Operations Manual (Jaguar)
ROMRegional Office Manager
ROMRaad van Overleg in de Metalektro (Dutch)
ROMRebels of Mankind (BattleField 2 clan)
ROMRight Otitis Media (infection of the eardrum)
ROMReasonable Order of Magnitude
ROMRoll-Over Mortgage (finance)
ROMRetail Operation Management (US Navy)
ROMRetention Office Manager (US DoD)
ROMRequest of Materials
ROMReception and Onward Movement
ROMReceived Output Message
ROMRandom Order of Magnitude (cost estimate)
ROMRifters of Matter (gaming guild)
ROMResource Optimization Management
ROMRate of Maxima
ROMRun-Of-Month
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References in periodicals archive ?
We prove it is existentially unforgeable against strong adversaries in the random oracle model when the small integer solution (SIS) problem on NTRU lattice is hard.
They claimed that their scheme satisfies the chosen-ciphertext security in the random oracle model. Unfortunately, this is not ture.
The security of our VLR group signature scheme can be reduced to the hardness of learning with errors (LWE) and small integer solutions (SIS) problem in the random oracle model, which are as hard as several worst-case lattice problems, such as the shortest independent vector problem ([SIVP.sub.[gamma]]) for a polynomial factor [gamma] = poly(n).
They proposed two broadcast encryption schemes and two identity-based broadcast encryption schemes; each has constant ciphertext size in random oracle model. Phan et al.
provided a formal security model for [C.sub.B]-PRE schemes and proposed the first [C.sub.B]-PRE scheme that is provably secure in the random oracle model [31].
The difference lies in [G.sub.0] is in the real protocol and [G.sub.1] is in the random oracle model. From the definition of the random oracle, we can see that [G.sub.0] and [G.sub.1] are indistinguishable.
Next, we give the formal proof of our scheme in the random oracle model under the BDH assumption.
In this section, we use the random oracle model to analyze the security of our scheme.
A second but more comprehensive independent work has come in the form of [15] but the scheme is only provable secure in the random oracle model.
only partly proved the security of their scheme in the random oracle model [21].