810 research outputs found
Tensor Spectra Templates for Axion-Gauge Fields Dynamics during Inflation
gauge fields can generate large gravitational waves during inflation,
if they are coupled to an axion which can be either the inflaton or a spectator
field. The shape of the produced tensor power spectrum depends
on the form of the axion potential. We derive analytic expressions and provide
general templates for for various types of the spectator axion
potential. Furthermore, we explore the detectability of the oscillatory
feature, which is present in in the case of an axion monodromy
model, by possible future CMB B-mode polarization observations.Comment: 31 pages, 11 figure
Longest Common Extensions with Recompression
Given two positions i and j in a string T of length N, a longest common extension (LCE) query asks for the length of the longest common prefix between suffixes beginning at i and j. A compressed LCE data structure stores T in a compressed form while supporting fast LCE queries. In this article we show that the recompression technique is a powerful tool for compressed LCE data structures. We present a new compressed LCE data structure of size O(z lg (N/z)) that supports LCE queries in O(lg N) time, where z is the size of Lempel-Ziv 77 factorization without self-reference of T. Given T as an uncompressed form, we show how to build our data structure in O(N) time and space. Given T as a grammar compressed form, i.e., a straight-line program of size n generating T, we show how to build our data structure in O(n lg (N/n)) time and O(n + z lg (N/z)) space. Our algorithms are deterministic and always return correct answers
Faster Compact On-Line Lempel-Ziv Factorization
We present a new on-line algorithm for computing the Lempel-Ziv factorization
of a string that runs in time and uses only bits
of working space, where is the length of the string and is the
size of the alphabet. This is a notable improvement compared to the performance
of previous on-line algorithms using the same order of working space but
running in either time (Okanohara & Sadakane 2009) or
time (Starikovskaya 2012). The key to our new algorithm is in the
utilization of an elegant but less popular index structure called Directed
Acyclic Word Graphs, or DAWGs (Blumer et al. 1985). We also present an
opportunistic variant of our algorithm, which, given the run length encoding of
size of a string of length , computes the Lempel-Ziv factorization
on-line, in time
and bits of space, which is faster and more space efficient when
the string is run-length compressible
Fully dynamic data structure for LCE queries in compressed space
A Longest Common Extension (LCE) query on a text of length asks for
the length of the longest common prefix of suffixes starting at given two
positions. We show that the signature encoding of size [Mehlhorn et al., Algorithmica 17(2):183-198,
1997] of , which can be seen as a compressed representation of , has a
capability to support LCE queries in time,
where is the answer to the query, is the size of the Lempel-Ziv77
(LZ77) factorization of , and is an integer that can be handled
in constant time under word RAM model. In compressed space, this is the fastest
deterministic LCE data structure in many cases. Moreover, can be
enhanced to support efficient update operations: After processing
in time, we can insert/delete any (sub)string of length
into/from an arbitrary position of in time, where . This yields
the first fully dynamic LCE data structure. We also present efficient
construction algorithms from various types of inputs: We can construct
in time from uncompressed string ; in
time from grammar-compressed string
represented by a straight-line program of size ; and in time from LZ77-compressed string with factors. On top
of the above contributions, we show several applications of our data structures
which improve previous best known results on grammar-compressed string
processing.Comment: arXiv admin note: text overlap with arXiv:1504.0695
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