###################################################################### ##InvMaj: Save this file as InvMaj # ## To use it, stay in the # ##same directory, get into Maple (by typing: maple ) # ##and then type: read InvMaj # ##Then follow the instructions given there # ## # ##Written by Andrew Baxter and Doron Zeilberger, Rutgers University # #[baxter,zeilberg] at math dot rutgers dot edu # ###################################################################### #Created: March 30, 2010 print(`Created: March 30, 2010`): print(`This version: Jan. 10,2011, using comments of referee Emilie Hogan`): print(`[the corrections to the program do not effect the paper].`): print(` This is InvMaj `): print(`A Maple package that accompanies the article `): print(`The Number of Inversions and the Major Index of Permutations `): print(`are Asymptotically Joint-Independently-Normal`): print(`by Andrew Baxter and Doron Zeilberger`): print(`and also available from Baxter's Zeilberger's websites.`): print(``): print(`Please report bugs to zeilberg at math dot rutgers dot edu`): print(``): print(`The most current version of this package and paper`): print(` are available from`): print(`http://www.math.rutgers.edu/~zeilberg/ .`): print(`For a list of the procedures type ezra();, for help with`): print(`a specific procedure, type ezra(procedure_name); .`): print(``): with(combinat): ezra1:=proc() if args=NULL then print(` The supporting procedures are: `): print(`F `): else ezra(args): fi: end: ezra:=proc() if args=NULL then print(`The main procedures are: Check1, Check2, FM8,FM8m, frs, MOP, G `): print(` `): elif nops([args])=1 and op(1,[args])=Check1 then print(`Check1(L,n,i): verifies empirically (and hence rigorously), that the conjectured`): print(`expressions for the leading terms of the factorial moments about the mean satisfy the recurrences`): print(`that they are supposed to, regarding the first equation on p. 8 of the article`): print(`do: Check1(FM8m(n,i),n,i) `): elif nops([args])=1 and op(1,[args])=Check2 then print(`Check2(L,n,i): verifies empirically (and hence rigorously), that the conjectured`): print(`expressions for the leading terms of the factorial moments about the mean satisfy the recurrences`): print(`that they are supposed to, regarding the second equation on p. 8 of the article`): print(`do: Check2(FM8m(n,i),n,i) `): elif nops([args])=1 and op(1,[args])=F then print(`F(n,i,p,q) the weight-enumerator`): print(`according to the weight p^inv(pi)q^(maj(pi))`): print(`for the pair (inv,maj) defined over n-permutations`): print(`that end in i. For example, try:`): print(`F(4,2,p,q);`): elif nops([args])=1 and op(1,[args])=FM8 then print(`FM8(n,i): pre-computed table of the factorial moments`): print(`about the means, as polynomial expressions in (n,i)`): print(`for the pair (inv,maj) defined over n-permutations`): print(`that end in i. The output is a list-of-lists, let's call`): print(`it L, such that L[r][s] gives the (r,s)-mixed-factorial-moment`): print(`about the mean for 1<=r,s<=8`): print(`Try:`): print(`FM8(n,i); `): elif nops([args])=1 and op(1,[args])=FM8m then print(`FM8m(n,i): pre-computed table of the leading terms of the`): print(`factorial moments`): print(`about the means, as polynomial expressions in (n,i)`): print(`for the pair (inv,maj) defined over n-permutations`): print(`that end in i. The output is a list-of-lists, let's call`): print(`it L, such that L[r][s] gives the (r,s)-mixed-factorial-moment`): print(`about the mean for 1<=r,s<=8`): print(`Try:`): print(`FM8m(n,i); `): elif nops([args])=1 and op(1,[args])=frs then print(`frs(r0,s0,n,i): The (r0,s0)-factorial moment of (inv,maj) over`): print(`n-permutations that end in i.`): print(`For example, try:`): print(`frs(2,2,n,i);`): elif nops([args])=1 and op(1,[args])=G then print(`G(n,i,p,q) the prob. generating function`): print(`with variables p (for inv) and q(for maj)`): print(`for the pair (inv,maj) defined over n-permutations`): print(`that end in i. For example, try:`): print(`G(4,2,p,q);`): elif nops([args])=1 and op(1,[args])=MOP then print(`MOP(ope,p,q,N,I1,r,s,R,S,m0): inputs an operator`): print(`ope(n,i,p,q,N^(-1),I1^(-1)) such that a sequence of discrete`): print(`prob. gen. functions satisfies the recurrence`): print(`p_{n,i}(p,q)=ope(n,i,p,q,N^(-1),I1^(-1))p_{n,i}(p,q),`): print(` expressed in terms of the discrete variables n and i and`): print(` (negative) shift-operator`): print(`N^(-1) amd I1^(-1), and given symbols r and s, and respective`): print(` shift-operators R and S`): print(`and a pos. integer m0, outputs an operator, let's call it`): print(`Ope(r,s,n,i,N^(-1),I1^(-1),R^(-1),S^(-1)) `): print(`such that the factorial moments f_{r,s}(n,i)`): print(`satisfy the recurrence, up to order m0 in R^(-1) and S^(-1)`): print(`f_{r,s}(n)=Ope(r,s,N^(-1),I1^(-1),R^(-1),S^(-1))f_{r,s}(n,i) .`): print(`For example, try: `): print(`MOP(I1/q+(q^(n-1)-1)/(n-1)*p^(n/2-i)/q^(n/2)/N,p,q,N,I1,r,s,R,S,3);`): print(`MOP((p*q)^(n/2-i)/N/(n-1),p,q,N,I1,r,s,R,S,1);`): else print(`There is no ezra for`,args): fi: end: ezExtra:=proc(): print(` F(n,i,p,q)`): print(`AllTay(R0,N0), DataSets(R0,N0), GP2a(S,i,n,d), GP2(S,i,n)`): print(`GuessFrs(R0,n,i), Nor(L,i,n) `): print(`MOP(I1/q+(q^(n-1)-1)/(n-1)*p^(n/2-i)/q^(n/2)/N,p,q,N,I1,r,s,R,S,3);`): print(`qbin(q,n,k), A(n,p,q), , B(n,p,q), , Bd(n,p,q) `): print(` `): print(`FindLeading(r,s,Aee,Aeo,Aoe,Aoo), Manig(P,x,y), FM8(n,i), FM8m() `): print(`FM8ee(), FM8eo(), FMoe(), FMoo(), Bdokee(), Bdokeo()`): print(`Check1(L,n,i), Check2(L,n,i)`): end: ####Data #FM8(n,i): pre-computed table of the factorial moments #about the means, as polynomial expressions in (n,i) #for the pair (inv,maj) defined over n-permutations #that end in i. The output is a list-of-lists, let's call #it L, such that L[r][s] gives the (r,s)-mixed-factorial-moment #about the mean for 1<=r,s<=10 FM8:=proc(n,i): [[1/4-1/2*i+1/2*i^2+1/8*n-1/2*n*i+1/8*n^2, -1/4+1/2*i-1/2*i^2-1/8*n+1/2*n*i-1/8 *n^2, 7/16-7/8*i+7/8*i^2+1/6*n-37/48*n*i-5/48*n*i^2+31/192*n^2+1/6*n^2*i-1/16*n ^2*i^2-1/48*n^3+1/48*n^3*i+1/24*n^3*i^2-1/192*n^4-1/24*n^4*i+1/96*n^5, -9/8+9/4 *i-9/4*i^2-1/4*n+13/8*n*i+5/8*n*i^2-7/32*n^2-n^2*i+3/8*n^2*i^2+1/8*n^3-1/8*n^3* i-1/4*n^3*i^2+1/32*n^4+1/4*n^4*i-1/16*n^5, -763/96*i+419/1920*n+763/192-749/ 4608*n^4-283/80*n*i^2-46943/69120*n^3+97403/17280*n^2*i-7255/3456*n^2*i^2+2209/ 3456*n^3*i+841/576*n^3*i^2-5027/3456*n^4*i+24391/69120*n^5+1831/34560*n^2+763/ 96*i^2-31/1440*n^5*i^2+17/1080*n^6*i+5/864*n^6*i^2-5/864*n^7*i-19/3456*n^4*i^2+ 467/17280*n^5*i-2117/480*n*i+5/3456*n^8-17/4320*n^7-89/23040*n^6, 1175/32*i+221 /128*n+1345/1536*n^4+349/16*n*i^2+18143/4608*n^3-39803/1152*n^2*i+14675/1152*n^ 2*i^2-3845/1152*n^3*i-1805/192*n^3*i^2+10735/1152*n^4*i-9991/4608*n^5+6089/2304 *n^2-1175/32*i^2-1175/64+31/96*n^5*i^2-17/72*n^6*i-25/288*n^6*i^2+25/288*n^7*i+ 95/1152*n^4*i^2-467/1152*n^5*i+477/32*n*i-25/1152*n^8+17/288*n^7+89/1536*n^6, -\ 81469/384*i-168781/7560*n+24467/17418240*n^9+35/124416*n^11-1981/1244160*n^10-\ 4889/1451520*n^8*i-25256003/4976640*n^4-36464719/241920*n*i^2-110008091/4354560 *n^3+38249741/161280*n^2*i-1194851/13824*n^2*i^2+22863641/1244160*n^3*i+ 84672949/1244160*n^3*i^2-2608649/38880*n^4*i+37097981/2488320*n^5-13479517/ 483840*n^2+81469/384*i^2-1546801/414720*n^5*i^2+140987/51840*n^6*i+3103/3072*n^ 6*i^2-2963869/2903040*n^7*i-44303/46080*n^4*i^2+243191/51840*n^5*i+81469/768+ 1981/311040*n^9*i-14860751/241920*n*i+15767/1451520*n^7*i^2+2920357/11612160*n^ 8-1958051/2903040*n^7-553859/829440*n^6+35/31104*n^9*i^2-259/34560*n^8*i^2-35/ 31104*n^10*i, 141463/96*i+936181/4320*n-24467/622080*n^9-245/31104*n^11+13867/ 311040*n^10+4889/51840*n^8*i+39464621/1244160*n^4+10110559/8640*n*i^2+14047273/ 77760*n^3-10532401/5760*n^2*i+2275217/3456*n^2*i^2-32772887/311040*n^3*i-\ 171996643/311040*n^3*i^2+21081347/38880*n^4*i-141463/192-71528807/622080*n^5+ 4377487/17280*n^2-141463/96*i^2+4265527/103680*n^5*i^2-387149/12960*n^6*i-25963 /2304*n^6*i^2+1199869/103680*n^7*i+13769/1280*n^4*i^2-336301/6480*n^5*i-13867/ 77760*n^9*i+2621111/8640*n*i-15767/51840*n^7*i^2-1156357/414720*n^8+758531/ 103680*n^7+1522073/207360*n^6-245/7776*n^9*i^2+1813/8640*n^8*i^2+245/7776*n^10* i], [-1/4+1/3*i-1/3*i^3+1/24*n-1/6*n*i+1/2*n*i^2+1/24*n^2-1/6*n^2*i, -1/3*i+1/ 72*n+17/144+151/5184*n^4+11/12*n*i^2+83/864*n^3-2/3*i^3-1/2*n^2*i+3/4*n^2*i^2-1 /4*n^3*i-1/432*n^5+403/5184*n^2+1/2*i^2+1/2*i^4-1/4*n*i-n*i^3+1/1296*n^6, 11/12 *i-3/8*n-1/36*n^3*i^3+1/24*n^2*i^3-77/864*n^4-35/8*n*i^2-31/96*n^3+37/12*i^3+ 293/144*n^2*i-113/48*n^2*i^2+5/6*n^3*i-1/16*n^3*i^2+1/144*n^4*i+1/96*n^5-515/ 864*n^2-5/2*i^2+1/24*n^4*i^2-1/72*n^5*i-3/2*i^4+20/9*n*i+221/72*n*i^3-1/432*n^6 -1/24, -11/2*i+210437/86400*n+1/15552*n^9+1/4*n^3*i^3-5/24*n*i^4-1/8*n^2*i^4+1/ 12*n^3*i^4-1/6*n^4*i^3+247/320+5/12*n^2*i^3+26087/115200*n^4+49/3*n*i^2+2805919 /3110400*n^3-12*i^3-965/144*n^2*i+1013/144*n^2*i^2-359/144*n^3*i-5/24*n^3*i^2+ 23/144*n^4*i-64699/1036800*n^5+104993/34560*n^2+51/4*i^2+1/8*n^5*i^2-1/24*n^6*i -29/144*n^4*i^2+5/144*n^5*i+19/4*i^4-97/8*n*i-19/2*n*i^3-29/86400*n^8+2771/ 518400*n^7+383/23040*n^6, 1681/48*i-46013/3456*n-5/7776*n^9-467/288*n^3*i^3-5/ 2592*n^8*i+25/12*n*i^4+5/4*n^2*i^4-5/6*n^3*i^4+8659/5184*n^4*i^3-28745/5184*n^2 *i^3-535/64-86441/207360*n^4-17671/288*n*i^2-1246187/622080*n^3+2359/48*i^3+ 537019/25920*n^2*i-15497/720*n^2*i^2+367463/51840*n^3*i+13385/3456*n^3*i^2-\ 16309/10368*n^4*i+31/2160*n^5*i^3-5/1296*n^6*i^3+1457/4608*n^5-167251/11520*n^2 -200/3*i^2-4339/3456*n^5*i^2+22267/51840*n^6*i-31/1440*n^6*i^2+17/3240*n^7*i+ 401/576*n^4*i^2+4121/51840*n^5*i-35/2*i^4+265967/4320*n*i+5/864*n^7*i^2+35347/ 1080*n*i^3+199/51840*n^8-2839/51840*n^7-25937/207360*n^6, -3485/16*i+177199679/ 2540160*n+419639/91445760*n^9-17/233280*n^11+84919/68584320*n^10+5659/576*n^3*i ^3+329/8640*n^8*i-1349/80*n*i^4-11575/1152*n^2*i^4+1321/192*n^3*i^4-2977/216*n^ 4*i^3+5/559872*n^12+213817/4320*n^2*i^3-5/144*n^7*i^3+5/288*n^6*i^4-19/1152*n^4 *i^4-31/480*n^5*i^4-1589639549/2194698240*n^4+76339/320*n*i^2-1077421/18289152* n^3-1759/8*i^3-90433/1728*n^2*i+352979/5760*n^2*i^2-531451/34560*n^3*i-1208797/ 34560*n^3*i^2+10169/960*n^4*i-17/320*n^5*i^3+329/2160*n^6*i^3+1043479/16128-\ 4666099/3732480*n^5+2096051611/30481920*n^2+11563/32*i^2+355673/34560*n^5*i^2-\ 683/192*n^6*i+509/3840*n^6*i^2+41/34560*n^7*i-2549/2304*n^4*i^2-6655/3456*n^5*i -5/576*n^9*i+2443/32*i^4-180259/576*n*i-581/4320*n^7*i^2-91123/720*n*i^3-\ 32584687/731566080*n^8+9050077/20321280*n^7+4048625/4478976*n^6+5/192*n^8*i^2, 783793/576*i-43800433/120960*n-507467/17418240*n^9+3031/1866240*n^11-231073/ 8709120*n^10-112773469/1866240*n^3*i^3-4444453/8709120*n^8*i+10829/80*n*i^4+ 30625/384*n^2*i^4-3647/64*n^3*i^4+23611189/207360*n^4*i^3-43441/96-35/186624*n^ 12-534373/1280*n^2*i^3+1571833/2177280*n^7*i^3-35/96*n^6*i^4+133/384*n^4*i^4+ 217/160*n^5*i^4+80009011/4354560*n^4-5472863/5760*n*i^2+22720753/435456*n^3+ 629927/576*i^3-382367/181440*n^2*i-21612329/241920*n^2*i^2-72342749/3265920*n^3 *i+6472613/23040*n^3*i^2-231908233/3732480*n^4*i-696503/622080*n^5*i^3-539699/ 207360*n^6*i^3+13554971/7464960*n^5-9796439/30240*n^2-65877/32*i^2+259/51840*n^ 8*i^3-35/46656*n^9*i^3+35/31104*n^10*i^2-35/93312*n^11*i-11573737/138240*n^5*i^ 2+3575317/124416*n^6*i+202499/414720*n^6*i^2-274459/362880*n^7*i-16463471/ 1244160*n^4*i^2+7526897/373248*n^5*i+2376533/13063680*n^9*i-12663/32*i^4+ 73913479/45360*n*i+266867/138240*n^7*i^2+198151783/362880*n*i^3+4292213/8709120 *n^8-7588267/2177280*n^7-2429903/373248*n^6-259/34560*n^9*i^2-778033/1451520*n^ 8*i^2+1981/933120*n^10*i, -1264543/144*i+23208801713/12441600*n+87191774443/ 564350976000*n^9-311833007/11287019520*n^11+25661587237/62705664000*n^10+ 90707723/233280*n^3*i^3+8931983/1451520*n^8*i-13842323/12096*n*i^4-2297351/3456 *n^2*i^4+155570629/311040*n^3*i^4-154835377/155520*n^4*i^3+35/5184*n^11*i^2-35/ 15552*n^12*i+15767/362880*n^7*i^4-259/8640*n^8*i^4+35/7776*n^9*i^4-35/3888*n^10 *i^3+39257599/23514624000*n^12+21888025/6048*n^2*i^3-11846069/1088640*n^7*i^3+ 4223/768*n^6*i^4-60263/11520*n^4*i^4-421853/20736*n^5*i^4-6066074896633/ 31352832000*n^4+14197601/3780*n*i^2-950276533163/1567641600*n^3-222317/36*i^3+ 73333291/40320*n^2*i-186757801/181440*n^2*i^2+5031355513/6531840*n^3*i-\ 153769831/68040*n^3*i^2+469379567/1451520*n^4*i+4564313/155520*n^5*i^3+123347/ 3456*n^6*i^3+22989303067531/564350976000*n^5+107260302413/72576000*n^2+1202449/ 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2-473453043151176133441/1269789696000*n^6*i-222503609779456220633/338610585600* n^6*i^2+32946213739562138339/376233984000*n^7*i-655908546993305875931/ 65840947200*n^4*i^2-21586903252120125619289/1975228416000*n^5*i-6175960/3*i^13-\ 275623564995431143/118513704960*n^9*i-415350509/432*n^3*i^12+902003872945385/ 13824*i^4+465496674317077451/2073600*n*i-2648928366787471740077/10158317568000* n^7*i^2+131114559015247/90720*n^2*i^9-5813738439031/466560*n^5*i^9-788064868889 /2821754880*n^13*i^4+1892923256011/14814213120*n^14*i^3-567826696309/1679616000 *n^12*i^5-1047182402771/671846400*n^11*i^5-4069478423233/223948800*n^10*i^6+ 1191086164069/13063680*n^9*i^7-2017799586203/806400*n^7*i^8+11379690149903/ 6531840*n^8*i^7+383851175393/155520*n^6*i^9-9213046887881/349920*n^3*i^9+ 19378584239/540*n*i^11+175514406020281581371/3071875232563200000*n^14-\ 3108752987996352569/511979205427200000*n^15-75056619568902557/6826389405696000* n^13-752371132661856061/2177280*n*i^3-76361454089787121033743113/ 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1 to nops(pi) do for j from i+1 to nops(pi) do if pi[i]>pi[j] then co:=co+1: fi: od: od: co: end: maj:=proc(pi) local i,co: co:=0: for i from 1 to nops(pi)-1 do if pi[i]>pi[i+1] then co:=co+i: fi: od: co: end: #CheckF(n): checks the recurrence scheme for F directly CheckF:=proc(n) local p,q,gu,i,pi,T: gu:=permute(n): for i from 1 to n do T[i]:=0: od: for pi in gu do T[pi[n]]:=T[pi[n]]+p^(inv(pi))*q^(maj(pi)): od: evalb([seq(T[i]-F(n,i,p,q),i=1..n)]=[0$n]): end: #G(n,i,p,q) the prob. generating function #with variables p (for inv) and q(for maj) #for the pair (inv,maj) defined over n-permutations #that end in i. For example, try: #G(4,2,p,q); G:=proc(n,i,p,q) local i1: option remember: if n<1 then RETURN(FAIL): fi: if n=1 then if i=1 then RETURN(1): else RETURN(0): fi: fi: if i=n then RETURN(expand(add(simplify((p*q)^(n/2-i1)*G(n-1,i1,p,q)/(n-1)),i1=1..n-1))): fi: expand(simplify(G(n,i+1,p,q)/q+ p^(n-i)*(q^(n-1)-1)/(p*q)^(n/2)/(n-1)*G(n-1,i,p,q))): end: CheckG:=proc(n) local p,q,i: [seq(simplify(Gd(n,i,p,q)-G(n,i,p,q)),i=1..n)]: end: #GuessPOL1V1(L,x,d): Given a list L, tries to find #a polynomial P(x) of degree d such that L[i]=P(i) for i=1..nops(L) #For example, try: #GuessPOL1V1([seq(i^2,i=1..10)],x,2); GuessPOL1V1:=proc(L,x,d) local eq,var,a,P,i: #if nops(L)-d<3 then if nops(L)-d<1 then print(`Insufficient data`): RETURN(FAIL): fi: P:=add(a[i]*x^i,i=0..d): var:={seq(a[i],i=0..d)}: eq:={seq(expand(subs(x=i,P)-L[i]),i=1..nops(L))}: var:=solve(eq,var): if var=NULL then RETURN(FAIL): fi: subs(var,P): end: #GP(L,x): Given a list L, tries to find #a polynomial P(x) such that L[i]=P(i) for i=1..nops(L) . #For example, try: #GP([seq(i^2,i=1..10)],x); GP:=proc(L,x) local d,gu,i: #for d from 0 to nops(L)-3 do for d from 0 to nops(L)-1 do gu:=GuessPOL1V1(L,x,d): if gu<>FAIL then if {seq(expand(subs(x=i,gu)-L[i]),i=1..nops(L))}={0} then RETURN(gu): fi: fi: od: FAIL: end: #Taylor11(f,p,q,r0,s0): inputs an expression f in p and q #f(p,q) #and outputs the list-of-lists L such that L[r][s] #is the coefficient of x^r*y^s/r!/s! in f(1+x,1+y) #for r=1..r0, s=1..s0 . #For example, try: #Taylor11(1/p/q,p,q,3,3); Taylor11:=proc(f,p,q,r0,s0) local x,y,F,gu,i,j,F1: option remember: F:=subs({p=1+x,q=1+y},f): gu:=[]: F:=taylor(F,x=0,r0+1): for i from 1 to r0 do F1:=coeff(F,x,i): F1:=taylor(F1,y=0,s0+1): gu:=[op(gu),[seq(i!*j!*coeff(F1,y,j),j=1..s0)]]: od: gu: end: #frs(r0,s0,n,i): The (r0,s0)-factorial moment of (inv,maj) over #n-permutations that end in i #For example, try: #frs(2,2,n,i); frs:=proc(r0,s0,n,i) local gu,n1,i1,mu,p,q,mu1,pol,lu: gu:=[]: for n1 from r0+s0+4 to 2*r0+2*s0+10 do mu:=[seq(Taylor11(G(n1,i1,p,q),p,q,r0,s0)[r0][s0],i1=1..n1)]: mu1:=GP(mu,i): if mu1=FAIL then RETURN(FAIL,mu): fi: gu:=[op(gu),mu1]: od: pol:=GP(gu,n): if pol=FAIL then print(gu): RETURN(FAIL): fi: pol:=expand(subs(n=n-r0-s0-3,pol)): lu:= {seq(seq( evalb(subs({n=n1,i=i1},pol)=Taylor11(G(n1,i1,p,q),p,q,r0,s0)[r0][s0]), i1=1..n1),n1=1..r0+s0+8)}: if lu<>{true} then print(`Something went wrong`): print(pol,lu): RETURN(FAIL): fi: pol: end: #frsT(n,i,R0): a table of f_{r,s}(n,i) for 1<=r,s<=R0 frsT:=proc(n,i,R0) local r0,s0: [seq([seq(frs(r0,s0,n,i),s0=1..R0)],r0=1..R0)]: end: AllTay:=proc(R0,N0) local i1,n1,p,q: option remember: seq([seq(Taylor11(G(n1,i1,p,q),p,q,R0,R0),i1=1..n1)],n1=1..N0): end: #DataSets(R0,N0): all the data sets for f[r][s](n,i) #for 1<=r,s<=r0 using (n,i) data with 1<=i<=n<=N0 DataSets:=proc(R0,N0) local gu,r0,s0,mu,n1,i1,gu1,gu11: mu:=AllTay(R0,N0): gu:=[]: for r0 from 1 to R0 do gu1:=[]: for s0 from 1 to R0 do gu11:={seq(seq([i1,n1,mu[n1][i1][r0][s0]],i1=1..n1),n1=1..N0)}: gu1:=[op(gu1),gu11]: od: gu:=[op(gu),gu1]: od: gu: end: #GP2a(S,i,n,d): guesses a polynomial in (n,i) of degree <=d #that agrees with the data-set S GP2a:=proc(S,i,n,d) local a, eq,var,pol,i1,j1: pol:=add(add(a[i1,j1]*n^i1*i^j1,j1=0..d-i1),i1=0..d): var:={seq(seq(a[i1,j1],j1=0..d-i1),i1=0..d)}: if nops(S)-nops(var)<4 then RETURN(FAIL): fi: eq:={seq(subs({i=S[j1][1],n=S[j1][2]},pol)-S[j1][3],j1=1..nops(S))}: var:=solve(eq,var): if var=NULL then FAIL: else expand(subs(var,pol)): fi: end: #GP2(S,i,n): guesses a polynomial in (n,i) #that agrees with the data-set S GP2:=proc(S,i,n) local gu,d: for d from 0 while nops(S)-binomial(d+1,2)>=10 do #for d from 0 while nops(S)-binomial(d+1,2)>=1 do gu:=GP2a(S,i,n,d): if gu<>FAIL then RETURN(gu): fi: od: FAIL: end: #GP2aT(S,i,n,d): guesses a polynomial in (n,i) of degree <=d #that agrees with the data-set S GP2aT:=proc(S,i,n,d) local a, eq,var,pol,i1,j1: pol:=add(add(a[i1,j1]*n^i1*i^j1,j1=0..d-i1),i1=0..d): var:={seq(seq(a[i1,j1],j1=0..d-i1),i1=0..d)}: if nops(S)-nops(var)<1 then RETURN(FAIL): fi: eq:={seq(subs({i=S[j1][1],n=S[j1][2]},pol)-S[j1][3],j1=1..nops(S))}: var:=solve(eq,var): if var=NULL then FAIL: else expand(subs(var,pol)): fi: end: #GP2T(S,i,n): guesses a polynomial in (n,i) #that agrees with the data-set S GP2T:=proc(S,i,n) local gu,d: for d from 0 while nops(S)-binomial(d+1,2)>=10 do gu:=GP2aT(S,i,n,d): if gu<>FAIL then RETURN(gu): fi: od: FAIL: end: #GuessFrs(R0,n,i): guesses f_{r,s}(n,i) for r,s<=R0 GuessFrs:=proc(R0,n,i) local gu,N0,r0,s0: N0:=3*R0+2: gu:=DataSets(R0,N0): [seq([seq(GP2(gu[r0][s0],i,n),s0=1..R0)],r0=1..R0)]: end: #Nor(L,i,n): normalizes a list of lists of moments #in variables (i,n) #assumed to be asymptotically normal Nor:=proc(L,i,n) local lu,d1,r0,s0,T: d1:=degree(L[2][2],{i,n}): lu:=sqrt(coeff(L[2][2],n,d1)): if lu=0 then RETURN(FAIL): fi: for r0 from 1 to nops(L)/2 do for s0 from 1 to nops(L[r0])/2 do T[2*r0,2*s0]:=L[2*r0][2*s0]/lu^(r0+s0)/ ((2*r0)!/r0!/2^r0)/((2*s0)!/s0!/2^s0): T[2*r0-1,2*s0-1]:=L[2*r0-1][2*s0-1]/lu^(r0+s0)/ ((2*r0)!/r0!/2^r0)/((2*s0)!/s0!/2^s0): T[2*r0-1,2*s0]:=L[2*r0-1][2*s0]/lu^(r0+s0)/ ((2*r0)!/r0!/2^r0)/((2*s0)!/s0!/2^s0): T[2*r0,2*s0-1]:=L[2*r0][2*s0-1]/lu^(r0+s0)/ ((2*r0)!/r0!/2^r0)/((2*s0)!/s0!/2^s0): od: od: [seq([seq(T[r0,s0],s0=1..nops(L))],r0=1..nops(L))]: end: #MOP(ope,p,q,N,I1,r,s,R,S,m0): inputs an operator #ope(n,i,p,q,N^(-1),I1^(-1)) such that a sequence of discrete #prob. gen. functions satisfies the recurrence #p_{n,i}(p,q)=ope(n,i,p,q,N^(-1),I1^(-1))p_{n,i}(p,q), expressed in terms #of the discrete variables n and i and (negative) shift-operator #N^(-1) amd I1^(-1), and given symbols r and s, and respective shift-operators # R and S #and a pos. integer m0, outputs an operator, let's call it #Ope(r,s,n,i,N^(-1),I1^(-1),R^(-1),S^(-1)) such that the factorial moments #f_{r,s}(n,i) #satisfy the recurrence, up to order m0 in R^(-1) and S^(-1) #f_{r,s}(n)=Ope(r,s,N^(-1),I1^(-1),R^(-1),S^(-1))f_{r,s}(n,i) #For example, try: #MOP(I1/q+(q^(n-1)-1)/(n-1)*p^(n/2-i)/q^(n/2)/N,n,i,p,q,N,I1,r,s,R,S,3); MOP:=proc(ope2,p,q,N,I1,r,s,R,S,m0) local z,w,gu,ope,a,b,j1,j2, gu1,gu11,s1,mu: ope:=subs({p=1+z,q=1+w},ope2): for a from ldegree(ope,N) to degree(ope,N) do for b from ldegree(ope,I1) to degree(ope,I1) do gu:=coeff(coeff(ope,N,a),I1,b): gu1:=taylor(gu,z=0,m0+5): for j1 from 0 to m0 do gu11:=coeff(gu1,z,j1): gu11:=taylor(gu11,w=0,m0+5): for j2 from 0 to m0 do s1[a,b,j1,j2]:=coeff(gu11,w,j2): od: od: od: od: gu:=add( add( add( add( s1[a,b,j1,j2]* expand(r!/(r-j1)!*s!/(s-j2)!) *R^(-j1)*S^(-j2)*N^(a)*I1^b,j1=0..m0), j2=0..m0), a=ldegree(ope2,N)..degree(ope2,N)), b=ldegree(ope2,I1)..degree(ope2,I1)): gu:=expand(gu): mu:=0: for j1 from ldegree(gu,R) to degree(gu,R) do for j2 from ldegree(gu,S) to degree(gu,S) do for a from ldegree(gu,N) to degree(gu,N) do for b from ldegree(gu,I1) to degree(gu,I1) do mu:=mu+ factor(coeff(coeff(coeff(coeff(gu,R,j1),S,j2),N,a),I1,b))*R^j1*S^j2*N^a*I1^b: od: od: od: od: mu: end: #qbin(q,n,k): the q-binomial coefficient qbin:=proc(q,n,k) local i: expand(normal(mul(1-q^(n-i),i=0..k-1)/mul(1-q^i,i=1..k))): end: #A(n,p,q): the g.f. of permutations according to (inv,maj) A:=proc(n,p,q) local k,i: option remember: if n=0 then RETURN(1): else expand(add((-1)^(k-1)*qbin(p,n,k)*p^binomial(k,2)*mul(1-q^i,i=n-k+1..n-1)* A(n-k,p,q),k=1..n)): fi: end: #Bd(n,p,q): the g.f. of permutations according to (inv,maj) #divided by n!*(p*q)^(binomial(n,2)/2) Bd:=proc(n,p,q): expand(A(n,p,q)/n!/(p*q)^(n*(n-1)/4)): end: #Bng(n,p,q): the g.f. of permutations according to (inv,maj) #divided by n!*(p*q)^(binomial(n,2)/2) Bng:=proc(n,p,q) local k,i: option remember: if n=0 then RETURN(1): else expand(add((-1)^(k-1)*qbin(p,n,k)*p^binomial(k,2)*mul(1-q^i,i=n-k+1..n-1)* Bng(n-k,p,q)*(n-k)!/n!*p^(k*(3*k-1-2*n)/4)*q^(k*(k+1-2*n)/4) ,k=1..n)): fi: end: #B(n,p,q): the g.f. of permutations according to (inv,maj) B:=proc(n,p,q) local k,i: option remember: if n=0 then RETURN(1): else expand(add((-1)^(k-1)*qbin(p,n,k)*mul(1-q^i,i=n-k+1..n-1)* B(n-k,p,q)*(n-k)!/n!*p^(k*(3*k-1-2*n)/4)* q^(k*(-2*n+k+1)/4),k=1..n)): fi: end: FindLeading:=proc(r,s,Aee,Aeo,Aoe,Aoo) local n,Fee,Feo,Foe,Foo,x: ##### Fee:=Aee[r,s]*n^(3*(r+s)-3)*n^3-Aee[r,s]*(n-1)^(3*(r+s)-3)*(n-1)^3+ s*(n-1)*Aeo[r,s]*(n-1)^(3*(r+s)-3)- s*(n-1)*Aeo[r,s]*(n-2)^(3*(r+s)-3): Feo:=Aeo[r,s]*n^(3*r+3*s-3)-Aeo[r,s]*(n-1)^(3*r+3*s-3) +(s-1/2)*(n-1)*(Aee[r,s-1]*(n-1)^(3*(r+s-1))- Aee[r,s-1]*(n-2)^(3*(r+s-1))): Foe:=Aoe[r,s]*n^(3*r+3*s-4)*n-Aoe[r,s]*(n-1)^(3*r+3*s-4)*(n-1)+ s*(n-1)*(Aoo[r,s]*(n-1)^(3*r+3*s-4)- Aoo[r,s]*(n-2)^(3*r+3*s-4)): Foo:=Aoo[r,s]*(n^(3*(r+s)-6)*n^2-(n-1)^(3*(r+s)-6)*(n-1)^2) +(2*s-1)*(n-1)/2*Aoe[r,s-1]*((n-1)^(3*(r+s)-6)-(n-2)^(3*(r+s)-6)): ##### Fee:=Aee[r,s]*n^3-Aee[r,s]*(1-x)^(3*(r+s)-3)*(n-1)^3+ s*(n-1)*Aeo[r,s]*(1-x)^(3*(r+s)-3)- s*(n-1)*Aeo[r,s]*(1-2*x)^(3*(r+s)-3): Feo:=Aeo[r,s]-Aeo[r,s]*(1-x)^(3*r+3*s-3) +(s-1/2)*(n-1)*(Aee[r,s-1]*(1-x)^(3*(r+s-1))- Aee[r,s-1]*(1-2*x)^(3*(r+s-1))): Foe:=Aoe[r,s]*n-Aoe[r,s]*(1-x)^(3*r+3*s-4)*(n-1)+ s*(n-1)*(Aoo[r,s]*(1-x)^(3*r+3*s-4)- Aoo[r,s]*(1-2*x)^(3*r+3*s-4)): Foo:=Aoo[r,s]*(n^2-(1-x)^(3*(r+s)-6)*(n-1)^2) +(2*s-1)*(n-1)/2*Aoe[r,s-1]*((1-x)^(3*(r+s)-6)-(1-2*x)^(3*(r+s)-6)): Fee:=subs(n=1/x,Fee): Feo:=subs(n=1/x,Feo): Foe:=subs(n=1/x,Foe): Foo:=subs(n=1/x,Foo): series(Fee,x=0,7), series(Feo,x=0,7), series(Feo,x=0,7), series(Foo,x=0,7): end: #Manig(P,x,y): the leading coefficient of the pol. P Manig:=proc(P,x,y) local t,P1,d: P1:=expand(subs({x=x*t,y=y*t},P)): d:=degree(P1,t): factor(coeff(P1,t,d)): end: FM8m:=proc(n,i) local gu: gu:=FM8(n,i): gu:=[seq([seq(Manig(gu[i1][j1],n,i),j1=1..nops(gu[i1]))],i1=1..nops(gu))]: end: FM8ee:=proc(n,i) local gu,T,r,s: gu:=FM8m(n,i): for r from 1 to 4 do for s from 1 to 4 do T[r,s]:=gu[2*r][2*s]/((2*r)!/r!/2^r)/((2*s)!/s!/2^s)*36^(r+s)/ n^(3*(r+s)): od: od: evalb(normal({seq(seq(T[r,s],s=1..4),r=1..4)})={1}): end: FM8eo:=proc(n,i) local gu,T,r,s: gu:=FM8m(n,i): for r from 1 to 4 do for s from 1 to 4 do T[r,s]:=gu[2*r][2*s-1]/((2*r)!/r!/2^r)/((2*s)!/s!/2^s)*36^(r+s-1)/ (n^(3*(r+s-2))*(-(s-1)*n^3-6*r*n^2*i+18*r*n*i^2-12*r*i^3)): od: od: evalb(normal({seq(seq(T[r,s],s=1..4),r=1..4)})={1}): end: FM8oe:=proc(n,i) local gu,T,r,s: gu:=FM8m(n,i): for r from 2 to 4 do for s from 2 to 4 do T[r,s]:=-gu[2*r-1][2*s]/((2*r)!/r!/2^r)/((2*s)!/s!/2^s)*36^(r+s)/36/ n^(3*(r+s-1))/(r-1): od: od: evalb({seq(seq(normal(T[r,s]),s=2..4),r=2..4)}={1}): end: FM8oo:=proc(n,i) local gu,T,r,s: gu:=FM8m(n,i): for r from 1 to 4 do for s from 1 to 4 do T[r,s]:=gu[2*r-1][2*s-1]/((2*r)!/r!/2^r)/((2*s)!/s!/2^s)*36^(r+s)/ n^(3*(r+s)-6)/(162)/(2*i-n)^2: od: od: evalb(normal({seq(seq(T[r,s],s=1..4),r=1..4)})={1}): end: GM8ee:=proc(n,i) local gu,T,r,s: gu:=FM8m(n,i): for r from 1 to 4 do for s from 1 to 4 do T[r,s]:=gu[2*r][2*s]-(2*r)!/r!/2^r*(2*s)!/s!/2^s*(1/36^(r+s))*n^(3*(r+s)): od: od: evalb(normal({seq(seq(T[r,s],s=1..4),r=1..4)})={0}): end: GM8eo:=proc(n,i) local gu,T,r,s: gu:=FM8m(n,i): for r from 1 to 4 do for s from 1 to 4 do T[r,s]:= expand(gu[2*r][2*s-1]- (2*r)!/r!/2^r*(2*s)!/s!/2^s*(1/36)^(r+s-1)* (n^(3*(r+s-2))*(-(s-1)*n^3-6*r*n^2*i+18*r*n*i^2-12*r*i^3))): od: od: evalb(normal({seq(seq(T[r,s],s=1..4),r=1..4)})={0}): end: GM8oe:=proc(n,i) local gu,T,r,s: gu:=FM8m(n,i): for r from 2 to 4 do for s from 1 to 4 do T[r,s]:= gu[2*r-1][2*s] + (2*r)!/r!/2^r*(2*s)!/s!/2^s*1/36^(r+s-1)*n^(3*(r+s-1))*(r-1): od: od: evalb(normal({seq(seq(T[r,s],s=1..4),r=2..4)})={0}): end: GM8oo:=proc(n,i) local gu,T,r,s: gu:=FM8m(n,i): for r from 1 to 4 do for s from 1 to 4 do T[r,s]:=expand(gu[2*r-1][2*s-1]- (2*r)!/r!/2^r*(2*s)!/s!/2^s/36^(r+s-1)*9/2*n^(3*(r+s)-6)*(2*i-n)^2): od: od: evalb(normal({seq(seq(T[r,s],s=1..4),r=1..4)})={0}): end: Bdokee:=proc() local r,s,n,EE,EO,OE,OO,i,guee,t1,t2,T: #EE:=(2*r)!/r!/2^r*(2*s)!/s!/2^s*(1/36^(r+s))*n^(3*(r+s)): EE:=(2*r)!/r!/2^r*(2*s)!/s!/2^s*(1/36^(r+s)): #EO:=(2*r)!/r!/2^r*(2*s)!/s!/2^s*(1/36)^(r+s-1)* #n^(3*(r+s-2))*(-(s-1)*n^3-6*r*n^2*i+18*r*n*i^2-12*r*i^3): EO:=(2*r)!/r!/2^r*(2*s)!/s!/2^s*(1/36)^(r+s-1)* (-(s-1)*n^3-6*r*n^2*i+18*r*n*i^2-12*r*i^3): #OE:=-(2*r)!/r!/2^r*(2*s)!/s!/2^s*1/36^(r+s-1)*n^(3*(r+s-1))*(r-1): OE:=-(2*r)!/r!/2^r*(2*s)!/s!/2^s*1/36^(r+s-1)*(r-1): #OO:=(2*r)!/r!/2^r*(2*s)!/s!/2^s/36^(r+s-1)*9/2*n^(3*(r+s)-6)*(2*i-n)^2: OO:=(2*r)!/r!/2^r*(2*s)!/s!/2^s/36^(r+s-1)*9/2*(2*i-n)^2: #RETURN(EE,EO,OE,OO): #1/n=t1 1/i=t2 guee:=1 -subs(n=1/t1, simplify(subs(i=i+1,EE)/EE ) ) +2*s*t1^6*subs(n=1/t1,simplify(subs(i=i+1,EO)/EE)) -2*s*t1^6*(1-t1)^(3*(r+s-2))*subs(n=1/t1,simplify(subs(n=n-1,EO)/EE)) : guee:=subs(i=1/t2,guee): guee:=normal(subs({t1=t1*T,t2=t2*T},guee)): guee:=taylor(guee,T=0,10): evalb({seq(coeff(guee,T,i),i=0..3)}={0}): end: #Check1(L,n,i): applies the operator Oper1 to the list-of-lists L Check1:=proc(L,n,i) local r,s,gu1,vu: vu:={}: for r from 1 to nops(L) do for s from 2 to nops(L[r]) do gu1:=L[r][s]-subs(i=i+1,L[r][s])+s*subs(i=i+1,L[r][s-1])- s*subs(n=n-1,L[r][s-1]): gu1:=expand(gu1): vu:=vu union {degree(gu1,{n,i})-degree(L[r][s],{n,i})}: od: od: evalb(max(op(vu))<0) : end: #Check2(L,n,i): applies the operator Oper2 to the list-of-lists L Check2:=proc(L,n,i) local r,s,gu1,gu2,vu,lu: vu:={}: for r from 2 to nops(L) do for s from 2 to nops(L[r]) do gu1:= normal(sum(subs(n=n-1,L[r][s]),i=1..n-1)/(n-1))- normal(s/2*sum((2*i-n)*subs(n=n-1,L[r][s-1]),i=1..n-1)/(n-1))- normal(r/2*sum((2*i-n)*subs(n=n-1,L[r-1][s]),i=1..n-1)/(n-1)) + normal(r*s/4*sum((2*i-n)^2*subs(n=n-1,L[r-1][s-1]),i=1..n-1)/(n-1)) : gu1:=expand(gu1): gu2:=expand(subs(i=n,L[r][s])): gu1:=gu2-gu1: lu:=degree(gu1,{n,i})-degree(gu2,n): vu:=vu union {lu}: od: od: evalb(max(op(vu))<0) : end: