ThepaperdealswiththecomputationandbifurcationanalysisofdoubleTakens-Bogdanovpoint(u0,∧0)(inshort,DTBpoint)intheZ2-equivariablenonlinearequationf(u,∧)=0,f:U×R4→V,whereUandVareBanachspaces,parameters∧∈R4.At(u0,∧0),thenullspaceoffu0hasgeometricmultiplicity2andalgebraicmultiplicity4.FirstlyaregularextendedsystemforcomputingDTBpointisproposed.Secondly,itisprovedthattherearefourbranchesofsingularpointsbifurcatedfromDTBpoint:twopathsofSTBpoints,twopathsofTB-Hopfpoints.Finally,thenumericalresultsofonedimensionalBrusselatorequationsaregiventoshowtheeffectivenessofourtheoryandmethod.