Some Considerations of Exror Bounds in Digital Systems hy VK, PRADIN Simple upper ond fer tani on the dstation function of the un of ao random aos pent frm of hr xargenal ee ion functions a he sashes. Those bounds ae enw ain upper tend Env Boul to the evn pba of bout ital sytem ha presence oj inertial icerfocense ane bie yonsian noite. The Fe ere expressed in tems ofthe evar probaly aban ith a ‘Bie yu lean, an the bounds te the marginal dsrbutien action of the resi te tai, Since br dfn Between tke wppe and ioe Droouda ran be an to ben manntantaly dameceng junction oj tie ‘mente f ude inthe le ue rah Gl Oh wo egal Teen pba oj th ear oth orlavoly ama evo Alea hen the samen pevformane owe ey wind tends, te mets proved now pape a Be word atte ie rar aaa Uy wing Ife uae tain appearnet In digital transmission systmna the theslor ehamnetevstos of the twansmitting ant rociving Eters a fax from ea, andthe eal trans Inision chanel vsullyexbiite som forza of time dgpesion."* When fn ideal dal sal fe passe. hgh sue tere o i transmitted through soca ehanne, the aveeervn ule ovesap; this form of tistortion ix ually lows indereVebol itererenes. Tutersymbol Inesferce may also roan nin Ue eve of ronoptinnsm skenping imlants imperieet demadulairganier phase, improper pulse design, fhe. Tw ation the sie may be commupted by tema! mise, co Channel and adjacent chron! iuleforenee, and other forms of noise that nay be precnt ete elise we i tho syst wel to Eanamit tiv information In digital transmis systens 0 cof che min performance ehes- 198 wey ovetnAr Teomeeat FEMAR, ARERR en Lis sete enor aan oon seven nce cbt ef ore; Te expend at rue seni se of ore uP more debtion Faw ‘Vt antcas hag tse le uve is prubabilily of ere by 2 kale of thes" bat thi igaly mpl probit diab ton cent seh fe ox4ets enmptd Sivas eights es sale tsa others problems are never cet since ono i ears to a only a nite Ihumber of poles wid mo bounds to the traneaton error have been feria ‘Another method ian analysis by sean af a weeseeae oF eye potter’ analysis. Sines the protabilivy ef eecurenee ofa worst sequence ny Bevery smal this orale usu leads on very peernistio remlta and suboptimum Systm dosisn "Recsntly, rome antnors hove derived’ several difleent upper boule on the probabilty of error wien the avetem ie ubjest ta both Incerymbel intesforenoe and deter gnssvian noise. Same of these bonds make wee of the Chemo ineqtinity i tei derivation, aud hence ne oem rans wetul than the Woretonse bound.” Lioweven, singe these bond, in eeriin eases, en be shown 4o be leo," ata ite asf ler al have ben derved, they are not as use in ayaer design she wvalton af Ue oenet err me ofthe sytem, ‘The thi! reba ovine 'n ing Ue Grits pee tre sepia tion au enealting the save pb ther hy the direct emer: io all pile sequen” hy the sores expansion mtd, "The serene tral, ehh ivolees the eompitation of he ronients of the intersymbol interferon, in goonies method bt Ss al inexact ae no traning crane tile die athe res ie fain have Been derived. Note that fn his etiam af errs in the nite pale tin de gradually inereneed until the change in obebility of error is ess than given mame Tn tis paper Ret presat srl er aa awe Dude the distribution funetion af the eum of exp eandom variable #y and 25 fn term of their marginal distiburion fnetinss, Tr the spread disc petson”” of the randoms variable ey is ssaller an tw aro of the =e Tine ce dhs osha eho ie Be math mon none pica Hosea sy random yarshle 2, ne e8 store hae hoe two boc ace Bale flow to ouch other and tha on ea velo dhe Mishhation fxgtion sv sua the wanes sv terme a he ian Tasetion af 2 funy boss the asebution Fanesios vy ‘We then ts these bones brain act and leer boxnds on the cere piobabiiey of binury exleront oigtal ater fs the presense of interaymin Sferferenee cad alive ysureaa noise. Sines the ference between the upper aoe ner sae oan Br how to be a fnovolene cvenaing fmageion of the nursber Na yale the fnte uly tiny Me home eam be ute ty worspnie le mor probability tthe svatem with arbiters sa ere Aly slow Use sytem perfomance is eluate by svcletionteoh- sigues, fhe vel eset ia our pager es be ui wo estimate fhe eer cutee by Heng anes pause Goa apypximation. TH tie symbole sy gy ele, wy a sane Kink anther srt of ‘upper ard lower bowls wat be dosved forthe probably of er ofa fata rahjoee to interesmbol itetereacs and eas gveinn none "Dhe asalress of the bounds ia Lustreed by tou ovale ev ue gerurs thas w tlons sate ¢ tbe mom oF on et voriables3y te 25 fe o fn that re are indorsed in the sistem fame of & Faigt = Wale Sel — Prise be Sal & In thie seetion > hal alo stair that ey aad re rately rncependent ach vara is prnbublity nf sace of ange nurstor of yal seats sjene fo varia ine Woe ean often ke sepreceal a arighted Sum: af Biot Ts fe the sam ol an fete marebor of tndon Watbles, aee Se apmesh s pte amo the lira Note we some aes eam, fvelte fo, ln et ean seers be eraputed vxney. Iv sich a feet i Gite eae ohtein Z3per and lows? hou to Fito) tore ni Fla) ad some iu guramsine eaoraced wih (ovahom eatisbleq the sum of tae reneiniog tema tmz TE Hho iors nbworn the ure bowtie ie seedy morutanedoere'ng neti of A oe ean Ure lew Fon wit apberaly small #18 “Wichous lows of gonora"ts we sia sostce thet tee meat of 2 Ie SISO cae i ersten muustead Youu, er 18r) zero, From (2) we can write ee Big. Beh — Wale naan ‘i Tet uso sles a interes veatable gg Pron (4 shore et a ase mo 8 a1 nec ste 2) hat oe hs [arty =F a0, 9 Ost 5 Pale an) [aPaG) = Pale ~ anit — Batt va (1 = Feyfand}, a) fez Pate a faa) ~ Pla ~ A01F las = Fa snd Beg Fast ab | dali) ~ Peso + abi ean ~ Flat as, Coming (6 it. (10)-(1, 90 ee Baio Ao fP, a) — F(A) 5 Fo) SFA an 2 Fal-ad | Polat aby ag fo ant — F(ab) In gonone ite now ony ts eompate Ff, Howevae we may be eble te burl Ff) 90 thas 02 FOAN = Mele ear ST, set 45) NS P= Phe a ets 1 a0) ond 12 Pasta) — Fila) = Prat < 24 Sau) Ap Clad eo an) AE these bonds ea be fl, (04) -(17) ee (oy) Ped SF@t ads Bal ad. 8) te to yield Fifa — aut Lala ~ “These are the Base bounds tht we hall ae i the sof ti pape 1 th ru of the distribution of ry is very roeh eooeen trated around y 0, one feshnique of computing bf) from (18) elie o the assomprion thet we eam rel too mumhors aw ned sue that 312 mus ott evirem cenaTeaL. soma, wxCRMES SL ail fg Sept tin ), Ti, spins inten Hn! ea | a ug tin pit? cenit me oy stn Ea av lel, ats << Poste au Fuge aa) = “The diterenes Dian, af between se ype ad Tower ourds ea Dea, 2) SAW. Cah -Prle aw ery get al File suilLag(—al + clam) + taal ad. 0) 1 anand A ea bow ean ch hey nee y monotoneederrasing finetions of Ny Su-—0, af», an 4 — =, and ifthe bounde on the Aislin sy ane sue dha, for eaedonty lange 3, L(A) and U,q(4) sa be made smualer than any ga number We et fstinnds Fo) from (U8) with arbitrary small ero” ‘Porany given A’ Hen thexgh i ad al ean be chosen by optimising {he bound in (18), his optiantion lala to very oorapen equations rence we think that un algoivin should be developed to ehaose ‘and! for say giv zy nnd ap. The develnpoens af this algorithm tv. be ilestratelhy mena in Beton TV VWetsumettat Brie ~@ cay S20 =O enon pote os SHerEA, neSnEa ssa 2 Tae Bont Fesaaton sith Canes Fata) We shall uow drive simpler lower {nee} baud to Pile) i la} fs a conver (eonoure} funtion and zy ie an even random vatlable, 1 eo From cen 7 he meat of i 2686, om et ite ‘Wit, sation the ection £00. en oldies ery is wx eve radon variable, we shall vet ay = aP ie (8) Tenor wenn test evr esos vas atl hat Be come uve the rare — An, eu) where fan, Sul i Te rook of Binge sy soma tesa rainy vale 0) — APasla ~ Yuadoe = Foal + aes ey Bla) = (UR ga wad 1 Fila wally cay = Pao ey ince Fa) x ware aver the mange (2 — ME se ~ 6.0) + B+ el From (23) wd 1) se Jae Pala) © Foe) en Since this bot des det eontain av and af it simpler to eels ‘an ut glen in (18s lb tighter thou the lower Bou 1S} Ie Us care oe le Lave Fula) © Bile} © P fo) a 4 begat, on 1f Fa) is concave over the domain (@ — i, + av) nd if ae ‘a ou even random vasable, we enn sie show tha Fi anil 5, Pele 3 Pad 2.2 Konto af Anctes (per Bown te Fla) (en we Hn thas ¢enetainss ganssian random variable and ean be writen ae seb beget fered, 08) voy ean ae sto stately dependent cardonn varies SIA mie ae avec TEURIICA SOUREAG, BEER wt We have alteedy aamumod thet tae mean of ry ie zero, Without lost of generality ee shall now masse thatthe mess of ie to, and ite ‘Fom (3) ore eum show thw Fate) = co soba ete) = oy Hoses have’ Peas — bee (=8) + Secwmscevniovaat, 60 ‘whens fte} # Ube Ath onder Hstaive polynomial sad gy ie the Beh memento ey Tt nay (Re 4) of ge ite and 2 Hoots he avin bolts vg that eat be abt by ayy we wa show tha 2z0, 9 eae Sm = fear 6 ‘is alle hth absolut enemant of wy "E the frst moments are word in estimating ssuncation errr Tis given by (a) from (31, he Teo te emtcetiads Bm winless 69) Since it em be ahows” th | TEA) | < bo /a) exp (6/2), b a 1.0985, dat oH, cons can ho fom (B5)-(96) ‘nn HENGE OaGAA, ATH as 8 a ‘ ee ee Devil ves © i 1) al) on may bee is 7 nay eit situ an easy sn dnte th gee es Teun es ever ance, warn ow th" py KEL 5) Focal — rele oav®, | Teapot ( afovBihfovyMnaiO! 20 A sagt ‘ore tae |< te exe tt — ' oe VER Wy ML (afer VERT BOK By (aie em | yet | a 1. Ly using the inary [Mo |S Le eeaiek + 96 — 1h ay se oo se th 1s Sh exw (ahs BE 3 ae {80 - coeliac +2". iatnk eben oe, Bale = Here (et te + nde econ FP Merie nt rec teh Denee AN Since one ean show free Agpenis A} ut Eee on ever redo vaciable, 2 awe Borel tN bere is A) Berle), 220, a Fla) & Hort B, a er) er n S108 rap ema grees risusiewr ran, renee en Nove fro (28) oe oe wa os . = erie inh. abe, tse, = Before trains Goat agit o cop-out [oot we nie a.) (few -wtiesale) em (fene 8as ae) on ~ Cee ar athe monet gesting Fsaaion of the random varie Tye un Cnt raebeae ny sad eg oH hab 8) S exp ene HORAN WS 1 amano: oor Sh that U1 eset any (nM ob Do. aren oo ‘he derivation the unsehousl ‘a {BH i Raed rane gow Ref 3. Wis new Ue if S Pile) & Riley me wd man BG ekorn,. @