Loop Homology of Bi-secondary Structures II
Abstract
In this paper we further describe the features of the topological space K(R) obtained from the loop nerve of R, for R=(S,T) a bi-secondary structure. We will first identify certain distinct combinatorial structures in the arc diagram of R which we will call crossing components. The main theorem of this paper shows that the total number of these crossing components equals the rank of H2(R), the second homology group of the loop nerve.
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