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C-symplectic poset structure on a simply connected space

For a field $\K$ of characteristic zero, we introduce a cohomologically symplectic poset structure ${\mathcal P}_{\K}(X)$ on a simply connected space $X$ from the viewpoint of $\K$-homotopy theory. It is given by the poset of inclusions of subgroups preserving c-symplectic structures in the group ${\mathcal E}(X_{\K})$ of $\K$-homotopy classes of $\K$-homotopy self-equivalences of $X$, which is defined by the $\K$-Sullivan model of $X$. We observe that the height of the Hasse diagram of ${\mathcal P}_{\K}(X)$ added by 1, denoted by c-s-${\rm depth}_{\K}(X)$, is finite and often depends on the field $\K$. In this paper, we will give some examples of ${\mathcal P}_{\K}(X)$.