Linguistic sequence complexity: Difference between revisions

The meaning of LC may be better understood by regarding the presentation of a sequence as a [[Tree (data structure)|tree]] of all subsequences of the given sequence. The most complex sequences have maximally balanced trees, while the measure of imbalance or tree asymmetry serves as a [[Computer linguistics|complexity measure]]. The number of nodes at the tree level {{math|<var>i</var>}} is equal to the actual vocabulary size of words with the length {{math|<var>i</var>}} in a given sequence; the number of nodes in the most balanced tree, which corresponds to the most complex sequence of length N, at the tree level {{math|<var>i</var>}} is either 4ⁱ or N-ji+1, whichever is smaller. Complexity ({{math|<var>C</var>}}) of a sequence fragment (with a length RW) can be directly calculated as the product of vocabulary-usage measures (U_i):<ref name=Gabrielian1999 />

{{nb5}} <math>C = U_1 U_2...U_i....U_w </math>

Vocabulary usage for [[oligomers]] of a given size {{math|<var>i</var>}} can be defined as the ratio of the actual vocabulary size of a given sequence to the maximal possible vocabulary size for a sequence of that length. For example, U₂ for the sequence ACGGGAAGCTGATTCCA = 14/16, as it contains 14 of 16 possible different dinucleotides; U₃ for the same sequence = 15/15, and U₄=14/14. For the sequence ACACACACACACACACA, U₁=1/2; U₂=2/16=0.125, as it has a simple vocabulary of only two dinucleotides; U₃ for this sequence = 2/15. k-tuples with k from two to W considered, while W depends on RW. For RW values less than 18, W is equal to 3; for RW less than 67, W is equal to 4; for RW<260, W=5; for RW<1029, W=6, and so on.{{Clarify|post-text=W looks like a logarithmic measure, but the numbers don't check out very well on a calculator.|date=March 2012}} The value of {{math|<var>C</var>}} provides a measure of sequence complexity in the range 0<C<1 for various DNA sequence fragments of a given length. <ref name=Gabrielian1999>< /ref>

This novel formula is different from the previousoriginal LC measure<ref name=Trifonov1990 /> in two respects: in the way vocabulary usage U_i is calculated, and because {{math|<var>i</var>}} is not in the range of 2 to N-1 but only up to W. This new limitation on the range of U_i makes the algorithm substantially more effectiveefficient without loss of power.<ref name=Gabrielian1999>< /ref>

This sequence analysis complexity calculation can be used to search for conserved regions between compared sequences for the detection of low-complexity regions including simple sequence repeats, imperfect [[Direct_repeatDirect repeat|direct]] or [[Inverted_repeat|inverted repeatsrepeat]]s, polypurine and polypyrimidine [[Triple-stranded_DNAstranded DNA|triple-stranded DNA structures]], and four-stranded structures (such as [[G-quadruplex|G-quadruplexes]]es).<ref name=Kalendar2011>{{citeCite journal doi| last1 = Kalendar | first1 = R. | last2 = Lee | first2 = D. | last3 = Schulman | first3 = A. H. | doi = 10.1016/j.ygeno.2011.04.009 |noedit} title = Java web tools for PCR, in silico PCR, and oligonucleotide assembly and analysis | journal = Genomics | volume = 98 | issue = 2 | pages = 137–144 | year = 2011 | pmid = 21569836 | doi-access = }}</ref>

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