The morphology of MSS-sequences in a wide class of unimodal maps, its structure and decomposition
Abstract: The MSS-sequences (U-sequences) in a wide class of unimodal maps have the look $\mathrm{P}=(\mathrm{R} \mathrm{L}{q}){n_1} \mathrm{S}_1(m_1,q-1) (\mathrm{R} \mathrm{L}{q}){n_2}\mathrm{S}_2(m_2,q-1) $ $\ldots$ $ (\mathrm{R} \mathrm{L}{q}){n_r}$ $ \mathrm{S}_r(m_r,q-1)\mathrm{C},$ where $\mathrm{S}_i(m_i, q-1)$ are sequences of $\mathrm{R}$s and $\mathrm{L}$s that contain at most $q-1$ consecutive $\mathrm{L}$s. The first block $\mathrm{RL}q$ and the sequence $\mathrm{S}_1$ following it are essential for an admissible sequence to be a MSS-sequence. Moreover $\mathrm{S}_i(m_i,q-1), \ i=2, \ldots, r$ are determined by $\mathrm{S}_1(m_1,q-1)$. Explicit structure of MSS-sequences will be given as well as the theorems that decompose the non-primary MSS-sequences. The cardinality will be calculated for some important sets of non-primary MSS-sequences and an algorithm to generate the blocks $\mathrm{S}_i(m_i,q-1), \ i=1, \ldots, r$ will be provided, as the construction of the blocks $\mathrm{S}_i(m_i,q-1)$ allows the construction of the MSS-sequences.
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