Let M be a module over a commutative ring R. The annihilating-submodule graph of M, denoted by AG(M), is a simple graph in which a non-zero submodule N of M is a vertex if and only if there exists a non-zero proper submodule K of M such that N K?=?(0), where N K, the product of N and K, is denoted by (N : M)(K : M)M and two distinct vertices N and K are adjacent if and only if N K?=?(0). This graph is a submodule version of the annihilating-ideal graph. We prove that if AG(M) is a tree, then either AG(M) is a star graph or a path of order 4 and in the latter case ({Mcong F imes S}), where F is a simple module and S is a module with a unique non-trivial submodule. Moreover, we prove that if M is a cyclic module with at least three minimal prime submodules, then gr(AG(M))?=?3 and for every cyclic module M, ({cl({m AG}(M)) geq |{m Min}(M)|}).
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机译:令M为交换环R上的模块。M的an灭子模块图由AG(M)表示,是一个简单的图,其中当且仅当存在a时,M的非零子模块N是一个顶点。 M的非零固有子模K,使得NK?=?(0),其中NK是N和K的乘积,用(N:M)(K:M)M表示,两个不同的顶点N和K是仅当NK?=?(0)时才相邻。此图是the灭理想图的子模块版本。我们证明如果AG(M)是一棵树,则AG(M)是星形图或4阶路径,在后一种情况下是({M cong F times S} ),其中F是一个简单的模块,S是具有唯一的非平凡子模块的模块。此外,我们证明如果M是具有至少三个最小素数子模块的循环模块,则gr(AG(M))?=?3,对于每个循环模块M,({cl({ rm AG}(M )) geq | { rm Min}(M)|} )。
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