. . "In mathematics, a local system (or a system of local coefficients) on a topological space X is a tool from algebraic topology which interpolates between cohomology with coefficients in a fixed abelian group A, and general sheaf cohomology in which coefficients vary from point to point. Local coefficient systems were introduced by Norman Steenrod in 1943. The category of perverse sheaves on a manifold is equivalent to the category of local systems on the manifold."@en . "11736"^^ . . . . . . . . . . . . . . . . . . . . . . "Proof of equivalence"@en . . . . "\u5C40\u90E8\u7CFB\u7D71"@zh . . "1112260682"^^ . . "Local system"@en . . . . . . . . . . . . "3461103"^^ . . "Take local system and a loop at x. It's easy to show that any local system on is constant. For instance, is constant. This gives an isomorphism , i.e. between L and itself. \nConversely, given a homomorphism , consider the constant sheaf on the universal cover of X. The deck-transform-invariant sections of gives a local system on X. Similarly, the deck-transform-\u03C1-equivariant sections give another local system on X: for a small enough open set U, it is defined as\n: \nwhere is the universal covering."@en . . . . . . . . . "In mathematics, a local system (or a system of local coefficients) on a topological space X is a tool from algebraic topology which interpolates between cohomology with coefficients in a fixed abelian group A, and general sheaf cohomology in which coefficients vary from point to point. Local coefficient systems were introduced by Norman Steenrod in 1943. The category of perverse sheaves on a manifold is equivalent to the category of local systems on the manifold."@en . . "\u5728\u6578\u5B78\u4E2D\uFF0C\u5C40\u90E8\u7CFB\u7D71\u6216\u7A31\u5C40\u90E8\u4FC2\u6578\u662F\u6E90\u65BC\u4EE3\u6578\u62D3\u64B2\u7684\u4E00\u7A2E\u89C0\u5FF5\uFF0C\u5B83\u662F\u5E38\u4FC2\u6578\u7684\u540C\u8ABF\u6216\u4E0A\u540C\u8ABF\u7406\u8AD6\u7684\u63A8\u5EE3\u3002\u9019\u500B\u89C0\u5FF5\u4E5F\u80FD\u61C9\u7528\u65BC\u4EE3\u6578\u5E7E\u4F55 \u3002 \u7528\u5C64\u8AD6\u7684\u8A9E\u8A00\u4F86\u8B1B\uFF0C\u5C40\u90E8\u7CFB\u7D71\u662F\u5C40\u90E8\u4E0A\u540C\u69CB\u65BC\u7684\u963F\u8C9D\u723E\u7FA4\u5C64\u3002\u82E5\u6B64\u5C64\u6574\u9AD4\u4F86\u770B\u4E5F\u540C\u69CB\u65BC\u5E38\u6578\u5C64\uFF0C\u5247\u5C31\u56DE\u5230\u4E86\u50B3\u7D71\u7684\u5E38\u4FC2\u6578\u7406\u8AD6\u3002\u4F8B\u5B50\u5305\u62EC\u4E86\u5E36\u6709\u7684\u5411\u91CF\u53E2\uFF0C\u57FA\u672C\u7FA4\u7684\u7DDA\u6027\u8868\u793A\u5247\u7D66\u51FA\u4E86\u5C40\u90E8\u540C\u69CB\u65BC\u5411\u91CF\u7A7A\u9593\u5E38\u6578\u5C64\u7684\u5C40\u90E8\u7CFB\u7D71\u3002"@zh . . "\u5728\u6578\u5B78\u4E2D\uFF0C\u5C40\u90E8\u7CFB\u7D71\u6216\u7A31\u5C40\u90E8\u4FC2\u6578\u662F\u6E90\u65BC\u4EE3\u6578\u62D3\u64B2\u7684\u4E00\u7A2E\u89C0\u5FF5\uFF0C\u5B83\u662F\u5E38\u4FC2\u6578\u7684\u540C\u8ABF\u6216\u4E0A\u540C\u8ABF\u7406\u8AD6\u7684\u63A8\u5EE3\u3002\u9019\u500B\u89C0\u5FF5\u4E5F\u80FD\u61C9\u7528\u65BC\u4EE3\u6578\u5E7E\u4F55 \u3002 \u7528\u5C64\u8AD6\u7684\u8A9E\u8A00\u4F86\u8B1B\uFF0C\u5C40\u90E8\u7CFB\u7D71\u662F\u5C40\u90E8\u4E0A\u540C\u69CB\u65BC\u7684\u963F\u8C9D\u723E\u7FA4\u5C64\u3002\u82E5\u6B64\u5C64\u6574\u9AD4\u4F86\u770B\u4E5F\u540C\u69CB\u65BC\u5E38\u6578\u5C64\uFF0C\u5247\u5C31\u56DE\u5230\u4E86\u50B3\u7D71\u7684\u5E38\u4FC2\u6578\u7406\u8AD6\u3002\u4F8B\u5B50\u5305\u62EC\u4E86\u5E36\u6709\u7684\u5411\u91CF\u53E2\uFF0C\u57FA\u672C\u7FA4\u7684\u7DDA\u6027\u8868\u793A\u5247\u7D66\u51FA\u4E86\u5C40\u90E8\u540C\u69CB\u65BC\u5411\u91CF\u7A7A\u9593\u5E38\u6578\u5C64\u7684\u5C40\u90E8\u7CFB\u7D71\u3002"@zh . . . . .