On the capacity and depth of compact surfaces

Abstract: K. Borsuk in 1979, in the Topological Conference in Moscow, introduced the concept of capacity and depth of a compactum. In this paper, we compute the capacity and depth of compact surfaces. We show that the capacity and depth of every compact orientable surface of genus g ≥ 0 is equal to g + 2. Also, we prove that the capacity and depth of a compact non-orientable surface of genus g > 0 is [ g 2 ] + 2.

“…, where ∨ in S n denotes the wedge of i n copies of S n , I is a finite subset of N and i n ∈ N. In fact, we proved that every space homotopy dominated by [1] computed the capacity of 2-dimensional manifolds. They showed that the capacities of a compact orientable surface of genus g ≥ 0 and a compact nonorientable surface of genus g > 0 are equal to g + 2 and [ g 2 ] + 2, respectively.…”

“…For instance, one can consider P 1 = T#T and P 2 = S 1 × S 2 , where # denotes the connected sum operation. One can observe that C(P 1 ) = C(P 2 ) = 4 but 4 = D(P 1 ) = D(P 2 ) = 3 (see [1]).…”

“…M. Abbasi and B. Mashayekhy in [1] computed the capacities of compact 2dimensional manifolds. They showed that the capacities (and also the depths) of a compact orientable surface of genus g 0 and a compact non-orientable surface of genus g > 0 are equal to g + 2 and [ g 2 ] + 2, respectively.…”

The capacity of some classes of polyhedra

“…, where ∨ in S n denotes the wedge of i n copies of S n , I is a finite subset of N and i n ∈ N. In fact, we proved that every space homotopy dominated by [1] computed the capacity of 2-dimensional manifolds. They showed that the capacities of a compact orientable surface of genus g ≥ 0 and a compact nonorientable surface of genus g > 0 are equal to g + 2 and [ g 2 ] + 2, respectively.…”

“…For instance, one can consider P 1 = T#T and P 2 = S 1 × S 2 , where # denotes the connected sum operation. One can observe that C(P 1 ) = C(P 2 ) = 4 but 4 = D(P 1 ) = D(P 2 ) = 3 (see [1]).…”

“…M. Abbasi and B. Mashayekhy in [1] computed the capacities of compact 2dimensional manifolds. They showed that the capacities (and also the depths) of a compact orientable surface of genus g 0 and a compact non-orientable surface of genus g > 0 are equal to g + 2 and [ g 2 ] + 2, respectively.…”

The capacity of some classes of polyhedra