This　paper　proposes　and　analyzes　a　type　of　efficient　multigrid　method,　which　is　called　multilevel　correction　method,　for　solving　semilinear　parabolic　interface　problems.　The　core　idea　of　this　method　is　that,　at　each　time　step,　the　semilinear　elliptic　interface　problem＇s　solution　is　transformed　into　the　same-scale　linear　elliptic　interface　problem＇s　solution　in　each　level　of　multilevel　space　sequence　and　the　semilinear　elliptic　interface　problem＇s　solution　on　a　newly　defined　low　dimensional　augmented　subspace.　Through　analyzing　the　algebraic　error　estimate　of　the　method,　we　design　the　method　to　iterate　only　one　step　in　the　intermediate　grid　layer,　which　makes　our　method　more　efficient　than　the　work　of　Xu　et　al.　(2022a)　without　losing　accuracy.　In　addition,　in　the　aspect　of　theoretical　analysis,　we　present　a　new　technique　of　analysis　to　derive　the　convergence　order　estimates.　Numerical　experiments　are　conducted　to　validate　the　precision　and　effectiveness　of　our　proposed　method.