A　non-selective　harvesting　Lotka-Volterra　amensalism　model　incorporating　partial　closure　for　the　populations　is　proposed　and　studied　in　this　paper.　Local　and　global　stability　of　the　boundary　and　interior　equilibria　are　investigated.　By　introducing　the　harvesting,　the　dynamic　behaviors　of　the　system　become　complicated.　Depending　on　the　fraction　of　the　stock　available　for　harvesting,　the　system　maybe　extinction,　partial　survival　or　two　species　may　coexist　in　a　stable　state.　Our　results　supplement　and　complement　the　main　results　of　Xiong,　Wang,　and　Zhang