TY - JOUR AU - Deo Trinh PY - 2019/08/13 Y2 - 2024/03/28 TI - A class of corners of a Leavitt path algebra JF - Science & Technology Development Journal: Natural Sciences JA - STDJNS VL - 2 IS - 4 SE - Original Research DO - https://doi.org/10.32508/stdjns.v2i4.813 UR - http://stdjns.scienceandtechnology.com.vn/index.php/stdjns/article/view/813 AB - Let E be a directed graph, K a field and LK(E) the Leavitt path algebra of E over K. The goal of this paper is to describe the structure of a class of corners of Leavitt path algebras LK(E). The motivation of this work comes from the paper “Corners of Graph Algebras” of Tyrone Crisp in which such corners of graph C*-algebras were investigated completely. Using the same ideas of Tyrone Crisp, we will show that for any finite subset X of vertices in a directed graph E such that the hereditary subset HE(X) generated by X is finite, the corner ( ) ( )( )     K v X v X v L E v is isomorphic to the Leavitt path algebra LK(EX) of some graph EX. We also provide a way how to construct this graph EX. ER -