Some theorems on the sheaf of higher homotopy groups

Bu çalışmada, irtibatlı lokal eğrisel irtibatlı bir topolojik uzay üzerinde yüksek homotopi gruplarının $H_n$ demeti oluşturularak bazı karakterizasyonları incelenmiştir. $(X_1,H_{n_1})$ ve $(X_2,H_{n_2})$ iki çift olsun. Eğer f*:$H_{n_1} —>H_{n_2}$ bir demet izomorfizmi ise $(X_1,H_{n_1})$ ve $(X_2,H_{n_2})$ çiftleri arasında bir izomorfizim olduğu gösterilmiştir.

Yüksek homotopi gruplarının demetleri üzerine bazı teoremler

In this paper, constructing the sheaf Hn of higher homotopy groups on a connected and locally path connected topological space, its some characterizations are examined. Let the pairs $(X_1,H_{n_1})$ and $(X_2,H_{n_2})$ be given. If the mapping f*:$H_{n_1} —>H_{n_2}$ is a sheaf isomorphism, we show that there exists an isomorphism between the pairs $(X_1,H_{n_1})$ and $(X_2,H_{n_2})$ .

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