Ubalo lwesalathisi sokubonakala kwe-SISTRIX

Kunye noXovi, isixhobo seSISTRIX yeyona nkqubo isetyenziswa kakhulu eJamani kwindawo ye-SEO. Isalathiso sokubonakala sizinzile njengomgangatho olinganayo wokubonakala kwephepha kukhangelo lukaGoogle. Iiparamitha ezibandakanyiweyo ekubaleni kwayo, umzekelo , zichazwe apha kwaye apha kwaye apha kwaye apha kwaye apha , kodwa i-formula echanekileyo yokubala ayipapashwa ngokusemthethweni. Oku kulandelayo ziziphumo zophando lwam lobuqu lweenyanga ezintandathu, ezingathi ziphelele okanye zichanekile.


Nge

  • \(A_l\): I-SISTRIX isethi yegama elingundoqo (imali ehleliweyo yamagama angundoqo achazwe ngokuqinileyo kwilizwe elithile, isethi ibandakanya rhoqo - esekelwe kwi-traffic esekelwe kwi-avareji yeenyanga ze-12 - kunye nencinci, imilinganiselo eyahlukayo)
  • \(\vert A_l \vert\) : Ukutyeba kwe \(A_l\) \(\vert A_{DE} \vert = 1.000.000\) (isimo: 01.10.2021)
  • \(k \in A_l\): Igama elingundoqo licimile \(A_l\)
  • \(u\): URL (iza kutolikwa njengethambeka, isizinda esisezantsi, ulawulo, i-URL yomntu, ngokuxhomekeke kwifomathi)
  • \(r_{uklgt}\) : Uluhlu lwe-URL \(u\) kwiziphumo zophendlo eziphilayo zenjini yokukhangela kaGoogle yegama elingundoqo \(k\) kwilizwe \(l\) kudidi lwesixhobo \(g\) ngelo xesha \(t\)
  • \(s_{klgt}\) : Ukukhangela umthamo (i-avareji yemibuzo yokukhangela ngenyanga kunye nedatha evela kwi-SISTRIX, kungekhona kwi- Google Keyword Planner , kodwa, ngokwengxelo yethu, eqokelelwe ngaphezu kweshumi elinesibini labathengisi bedatha yangaphandle) kwigama elingundoqo \(k\) im Ilizwe \(l\) kudidi lwesixhobo \(g\) ngexesha \(t\)
  • \(c_{uklgt}\) : Ucofa oluqikelelweyo kwi URL \(u\) yegama elingundoqo \(k\) kwilizwe \(l\) kudidi lwesixhobo \(g\) ngexesha \(t\)
  • \(l \in L=\{DE;...;JP\}\) : Ilizwe eline \(\vert L \vert=30\) (ukusukela: 01.06.2021)
  • \(g\in\{D;M\}\): Uhlobo lwesixhobo (idesktop / iselfowuni)
  • \(t\): Ixesha (umhla ngo 00:00:00 a.m.)
  • \(S_{ulgt}\) : SISTRIX ukubonakala kwesalathisi se URL \(u\) yelizwe \(l\) kudidi lwesixhobo \(g\) ngexesha \(t\)
  • \(W_S = \, \mathbb{Q}^{+}_{0}\) yamaxabiso \(W_S = \, \mathbb{Q}^{+}_{0}\)

iyasebenza

$$S_{ulgt} = \sum_{k=1}^{\vert A_l \vert} f(r_{uklgt}, c_{uklgt})$$

kunye

$$\begin{multline} \mathbb{N_0} \times \mathbb{Q}^{+}_{0} \to \, \mathbb{Q}^{+}_{0}, f(r, c) = ((1-\text{sgn}(r - 1)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-34{,}4796))) \cdot 0{,}0194 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-34{,}4796))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-378{,}325))) \cdot 0{,}125 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-378{,}325))) \cdot (0{,}0004 \cdot c + 0{,}0119)))) + (\text{sgn}(r-1)^2 \cdot \\ ((1-\text{sgn}(r - 2)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-17{,}418))) \cdot 0{,}0136 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-17{,}418))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-230{,}6839))) \cdot 0{,}125 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-230{,}6839))) \cdot (0{,}0006 \cdot c + 0{,}0035)))) + (\text{sgn}(r-2)^2 \cdot \\ ((1-\text{sgn}(r - 3)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-11{,}0236))) \cdot 0{,}0098 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-11{,}0236))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-231{,}3121))) \cdot 0{,}125 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-231{,}3121))) \cdot (0{,}0006 \cdot c + 0{,}0025)))) + (\text{sgn}(r-3)^2 \cdot \\ ((1-\text{sgn}(r - 4)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-8{,}8619))) \cdot 0{,}0077 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-8{,}8619))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-219{,}6195))) \cdot 0{,}125 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-219{,}6195))) \cdot (0{,}0006 \cdot c + 0{,}002)))) + (\text{sgn}(r-4)^2 \cdot \\ ((1-\text{sgn}(r - 5)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-8{,}0684))) \cdot 0{,}0068 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-8{,}0684))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-249{,}3706))) \cdot 0{,}125 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-249{,}3706))) \cdot (0{,}0006 \cdot c + 0{,}0017)))) + (\text{sgn}(r-5)^2 \cdot \\ ((1-\text{sgn}(r - 6)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-5{,}357))) \cdot 0{,}0058 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-5{,}357))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-133{,}2103))) \cdot 0{,}1011 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-133{,}2103))) \cdot (0{,}0007 \cdot c + 0{,}0015)))) + (\text{sgn}(r-6)^2 \cdot \\ ((1-\text{sgn}(r - 7)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-4{,}3643))) \cdot 0{,}0049 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-4{,}3643))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-90{,}3704))) \cdot 0{,}0727 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-90{,}3704))) \cdot (0{,}0008 \cdot c + 0{,}0013)))) + (\text{sgn}(r-7)^2 \cdot \\ ((1-\text{sgn}(r - 8)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-3{,}3292))) \cdot 0{,}0039 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-3{,}3292))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-87{,}6123))) \cdot 0{,}0706 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-87{,}6123))) \cdot (0{,}0008 \cdot c + 0{,}0011)))) + (\text{sgn}(r-8)^2 \cdot \\ ((1-\text{sgn}(r - 9)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-2{,}944))) \cdot 0{,}0029 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-2{,}944))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-75{,}6014))) \cdot 0{,}0515 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-75{,}6014))) \cdot (0{,}0007 \cdot c + 0{,}0012)))) + (\text{sgn}(r-9)^2 \cdot \\ ((1-\text{sgn}(r - 10)^2) \cdot ((1-\text{ceil}(0.5 \cdot \text{sgn}(c-2{,}4797))) \cdot 0{,}0019 + \\ (\text{ceil}(0.5 \cdot \text{sgn}(c-2{,}4797))) \cdot ((1+\text{floor}(0.5 \cdot \text{sgn}(c-36{,}7911))) \cdot 0{,}0199 - \\ (\text{floor}(0.5 \cdot \text{sgn}(c-36{,}7911))) \cdot (0{,}0005 \cdot c + 0{,}0005)))) + (\text{sgn}(r-10)^2 \cdot 0)))))))))) \end{multline}$$

Le fomyula ikhutshwe ubukhulu becala bubunjineli obubuyela umva ngokuyintloko ngoncedo lwe- SISTRIX A PI esemthethweni. Ingcamango esisiseko yaba: Nciphisa ingxaki kwimizekelo elula (fumana ii-URL ezinesalathiso sokubonakala esilungileyo ngenye kuphela / ezimbini / ezintathu / ... amagama angundoqo) kwaye uzame ukuphinda uvelise iimeko ezinzima ngakumbi.

Iipropati zesalathisi sokubonakala:

  • Amagama angundoqo kuphela "isethi yegama elisisigxina" le-1,000,000 lamagama angundoqo afakwe kwisalathisi sokubonakala, kungekhona amagama angundoqo okwandisa rhoqo "idatha epheleleyo" (ehambelana neziganeko zangoku kunye neemeko), okwangoku iquka amagama angundoqo e-100,000,000 (Ukusukela ngo-Oktobha. 1st, 2021). Amaqela egama elingundoqo afanelekileyo anokucocwa ngokulula ngokukhetha ixabiso phantsi kwe "Umhla" okanye ngokuseta ixabiso elongezelelweyo ukuya kwi- 0 kwi-API. Idatha eqhelekileyo okanye idatha yembali ihlala ihleli kwaye iqokelelwe ngeveki ukususela ngo-2008, ngoku yonke imihla.
  • I-AMP hits ayiqukwanga kwisalathiso sokubonakala.
  • Kuyacetyiswa ukuba uqale ngohlalutyo kumazwe asandula ukudalwa anje ngeRomania, iCroatia, iSlovenia kunye neBulgaria okanye ngokwenza esakho isalathiso sokubonakala. Isizathu salokhu kukuba i-SISTRIX iphethe "i-ballast yembali" kumazwe afana neJamani, oku kuthetha ukuba amagama angundoqo awayesetyenziselwa ukunikwa umlinganiselo ophezulu ngoku asetyenziswa nangaphezulu kunokuba umntu unokulindela, nangona (kwakhona ixesha elide. ) umthamo wokukhangela ophantsi. Ngokutsho kwenkxaso, yonke into kufuneka ilungiswe ngokuthe ngcembe kwaye ingabonakali kwixesha elide.
  • Ngokuchasene nokucinga kwam kwasekuqaleni, umthamo wokukhangela udlala kuphela indima engathanga ngqo kwisalathisi sokubonakala. Endaweni yoko, unqakrazo olulindelekileyo lubalulekile. Ubudlelwane phakathi komthamo wokukhangela kunye nonqakrazo oluqikelelweyo lusekwe ikakhulu kwinjongo yokukhangela eqikelelweyo, ekwabonisiwe. I-SISTRIX ngokwayo ichaza oku ngokucacileyo .
  • Ukucofa okulindelekileyo kukuqhuba emva kwe-Visibility Index. Impembelelo yabo ifakwe phezulu nangaphantsi, ukwenzela ukuba isalathisi sokubonakala sihlala sihamba phakathi komda ophezulu nangaphantsi kunye nomgca phakathi kwabo.
  • Unqakrazo alunakufikelelwa nge-API esemthethweni, kodwa kuphela ngojongano lwewebhu okanye ngokuthunyelwa ngaphandle kwe-CSV. Kuzo zombini ezi meko, amaxabiso arhangqwe, kodwa iDOM ye "Amagama angundoqo" imboniselo ikwaqulathe amaxabiso oqobo.:
Ukongeza kumaxabiso angqukuva, ungafumana amaxabiso akrwada.

Le fomyula ilandelayo ingasetyenziswa kwi-Excel okanye kwi-Google Sheets; Ibala isalathiso sokubonakala sephepha lomsebenzi apho umqolo ngamnye uqulethe igama elingundoqo elinendawo yalo kwikholamu A kunye nonqakrazo olulindelekileyo kwikholamu B.:

=SUMME(WENN(A1:A999999=1;WENN(B1:B999999=378,32500379436;0,125;(0,00037306471297181*B1:B999999+0,011944496557952))); WENN(A1:A999999=2;WENN(B1:B999999=230,68394113271;0,125;(0,00055449577110866*B1:B999999+0,0035350976909409))); WENN(A1:A999999=3;WENN(B1:B999999=231,31214231278;0,125;(0,00059715499256153*B1:B999999+0,0025455442270028))); WENN(A1:A999999=4;WENN(B1:B999999=219,61948739302;0,125;(0,00063710437878404*B1:B999999+0,0020405503130787))); WENN(A1:A999999=5;WENN(B1:B999999=249,37064996217;0,125;(0,00058906284391034*B1:B999999+0,0017391721053351))); WENN(A1:A999999=6;WENN(B1:B999999=133,21031841331;0,1011;(0,00074744619531311*B1:B999999+0,0015021940435474))); WENN(A1:A999999=7;WENN(B1:B999999=90,370431493381;0,0727;(0,00078977592541601*B1:B999999+0,0012962057526498))); WENN(A1:A999999=8;WENN(B1:B999999=87,612293584114;0,0706;(0,00079399080394233*B1:B999999+0,0010648385910406))); WENN(A1:A999999=9;WENN(B1:B999999=75,601377547472;0,0515;(0,00066458507066795*B1:B999999+0,0011972721128791))); WENN(A1:A999999=10;WENN(B1:B999999=36,79114711734;0,0199;(0,00052397754322654*B1:B999999+0,00053850952142599))); 0)))))))))))

Oku kuvumela ukuba kuveliswe ezi ziphumo zilandelayo:

IlizweIsixhoboUmhla\(S_{echt}\)\(S_{berechnet}\)\(\Delta\)\(\Delta_{\%}\)Url / ulawulo
SIM.29.10.21\( 0{,}1348 \)\( 0{,}1348 \)\( 0{,}0000 \)\( 0{,}00% \)https://support.google.com/youtube/?hl=sl
SIM.29.10.21\( 0{,}2156 \)\( 0{,}2155 \)\( 0{,}0001 \)\( 0{,}05% \)https://Me.twitter.com/youtube
SIM.29.10.21\( 0{,}3746 \)\( 0{,}3740 \)\( 0{,}0006 \)\( 0{,}16% \)https://sl.m.wikipedia.org/wiki/YouTube
SIM.29.10.21\( 0{,}6771 \)\( 0{,}6760 \)\( 0{,}0011 \)\( 0{,}16% \)https://m.facebook.com/youtube/
SIM.29.10.21\( 0{,}6836 \)\( 0{,}6830 \)\( 0{,}0006 \)\( 0{,}09% \)https://x2convert.com/en117/download-youtube-to-mp3-music
SIM.29.10.21\( 0{,}7636 \)\( 0{,}7555 \)\( 0{,}0081 \)\( 1{,}06% \)https://www.youtubekids.com/
SIM.29.10.21\( 0{,}8749 \)\( 0{,}8730 \)\( 0{,}0019 \)\( 0{,}22% \)https://www.4kdownload.com/products/youtubetomp3/6
SIM.29.10.21\( 4{,}0020 \)\( 3{,}9980 \)\( 0{,}0040 \)\( 0{,}10% \)https://ytmp3.cc/en23/
SIM.29.10.21\( 8{,}0520 \)\( 8{,}0520 \)\( 0{,}0000 \)\( 0{,}00% \)https://support.google.com/youtube/
SIM.29.10.21\( 11{,}6600 \)\( 11{,}6100 \)\( 0{,}0500 \)\( 0{,}43% \)https://m.facebook.com/events/
SIM.29.10.21\( 19{,}7000 \)\( 19{,}6890 \)\( 0{,}0110 \)\( 0{,}06% \)https://minecraft.fandom.com/wiki/
SIM.29.10.21\( 32{,}5900 \)\( 32{,}5890 \)\( 0{,}0010 \)\( 0{,}00% \)https://hr.m.wikipedia.org/wiki/
ROM.29.10.21\( 0{,}1516 \)\( 0{,}1516 \)\( 0{,}0000 \)\( 0{,}00% \)https://lol.fandom.com/wiki/LCK/2021_Season/Summer_Season
MRM.29.10.21\( 0{,}2191 \)\( 0{,}2190 \)\( 0{,}0000 \)\( 0{,}00% \)https://starwars.fandom.com/wiki/Mandalorian
BGM.03.11.21\( 0{,}3703 \)\( 0{,}3702 \)\( 0{,}0001 \)\( 0{,}03% \)https://leagueoflegends.fandom.com/wiki/List_of_champions

Umahluko phakathi kokwenyani kunye nexabiso elibaliweyo libangelwa ziimpazamo zokujikeleza kunye neseti yedatha encinci apho uqeqesho lomzekelo lusekwe. Ezi nkcazo zingentla zingasebenza njengesiseko sokuphucula ngakumbi ifomula kwaye, umzekelo, ukubala ubudlelwane phakathi komthamo wokukhangela kunye nokuchofoza okulindelekileyo. Ukuba unomdla kwimibhalo eye yavela ngexesha lophando lwam, nceda uzive ukhululekile ukuqhagamshelana nam .

Emva