Abstract
AbstractModels of sequence evolution typically assume that all sequences are possible. However, restriction enzymes that cut DNA at specific recognition sites provide an example where carrying a recognition site can be lethal. Motivated by this observation, we studied the set of strings over a finite alphabet with taboos, that is, with prohibited substrings. The taboo-set is referred to as $$\mathbb {T}$$
T
and any allowed string as a taboo-free string. We consider the so-called Hamming graph $$\varGamma _n(\mathbb {T})$$
Γ
n
(
T
)
, whose vertices are taboo-free strings of length n and whose edges connect two taboo-free strings if their Hamming distance equals one. Any (random) walk on this graph describes the evolution of a DNA sequence that avoids taboos. We describe the construction of the vertex set of $$\varGamma _n(\mathbb {T})$$
Γ
n
(
T
)
. Then we state conditions under which $$\varGamma _n(\mathbb {T})$$
Γ
n
(
T
)
and its suffix subgraphs are connected. Moreover, we provide an algorithm that determines if all these graphs are connected for an arbitrary $$\mathbb {T}$$
T
. As an application of the algorithm, we show that about $$87\%$$
87
%
of bacteria listed in REBASE have a taboo-set that induces connected taboo-free Hamming graphs, because they have less than four type II restriction enzymes. On the other hand, four properly chosen taboos are enough to disconnect one suffix subgraph, and consequently connectivity of taboo-free Hamming graphs could change depending on the composition of restriction sites.
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Agricultural and Biological Sciences (miscellaneous),Modelling and Simulation