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Let V be a linear space over a field F with finite dimension, L(V) the semigroup, under composition, of all linear transformations from V into itself. Suppose that V = V1 V2 ... Vm is a direct sum decomposition of V, where V1,V2,..., Vm are subspaces of V with the same dimension. A linear transformation f ∈ L(V) is said to be sum-preserving, if for each i (1 ≤ i ≤ m), there exists some j (1 ≤ j ≤ m) such that f(Vi) Vj. It is easy to verify that all sum-preserving linear transformations form a subsemigroup of L(V) which is denoted by L (V). In this paper, we first describe Green's relations on the semigroup L (V). Then we consider the regularity of elements and give a condition for an element in L (V) to be regular. Finally, Green's equivalences for regular elements are also characterized. 相似文献
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