TIME TOPOLOGY(my new time topology)

is time t is manifolded then in presnet past and future there will be subset of it in time space of any if there si time surface then on taht time suarfce past subset and presnet subset and future subset carrying in symetric forms for exmaple we care tht suarfce then part of this surafce where past lying it called the past subset of surafce then elemnts same for presnet and future in toplogical space a topology on a set of past time(x) set of presnet tiem(y) and set of future time(z) is collection of T of of subsets of x having following properties fie and X,Y,Z are in Tx,Ty,Tz union of elements of any sub collection of Tx,Ty,Tz is in Tx,Ty,Tz intersection of the element of any finfite subcollection of Tx,Ty,Tz is in Tx,Ty,Tz then onw three for time if time is having symetric state reahc symmmteirc state means if it reach on symmetrc means time get hole and deep hole then where presnt and futrue and past is consatant pace and in taht equaibirum they seems same a state of hamrony will say to this time lemna let x be a collection of time presnet past anf future let b is the basis for a topoloy on x then T is the colleciton for preset will intersent basis from past and future and then for past will intersect basis from presnet and past then for future will intersect basis from presne tnad future time for next prsent and past anf future.thah could collection of B if we fold the time in anhy surface craft then its with any surface that fold it wiht it both reach to the symmetric answer not if the surfce that ahve time surface thne this surafce will ahve time inequality whne we unfold the surface of time then it could be delay in the working fo suarface or not fast from the time so if we take coordiante of gemeorty and t then by time current time coordiante will be restrict and not become folded prodcut of time presnet past and future we cnat take prduct to make the time that is folded but we could cretae them in matices of 3 presnet past and future when presnet stretche back to then past is crate then future strecth then presnet si cretaes then future is rmeians so we conclaude it velocity fo presnet and past and fucture and tuple them in time topology then static force driven by to make force of strecth that define by f1 f2 f3 f4 ... so f1 pace of present f2 pace of past f3 pace of future so if time fold then its stretch between present past future some time past spended time will be greater then present and some times not then same way for future or past some time spending over past is greater then presennt anf future some time product of prent time with past time is non determinant same for future and past is only product when time surface fold in constant origin ONE THEOREM
supoose that topology on eahc space Xalpha is given by basis of folded time(presnet past futrue) collection of all set of forms pie balpha for presnet then for futrue then for past second theorem: let aalphs be a subaspace of time of Xalphs for each tuple then Piealphs(presnet) piealpha past piealpha future in three subset if surafce is not fold and interseciton over time is not happens subspace of piexalpha and their product because time is not linears its folded and deolded surface then product present will be with present and past with past and future where Aalpha is a subspace of desimilar time non symmetricc time means two dimensional space where time is altitude and amplitude differs in different then Aalpha is a subspace of multi non folded time so in that product of piexalpha pieaalpha product gives the symmeirtic time and dysmmtric time relation means symmetric relation and dysymmertic relation comes by prductof time