dharr

Numerical solution after non-dimensional...

Answered: dharr 8522

30 minutes ago

0 0

I did this before your latest comments, so you may need to alter to suit.

>

restart;

>	with(PDEtools, dchange):with(plots):

>	with(Units):

Automatically loading the Units[Simple] subpackage

>	params:={k= 1.380649000010^(-23)Unit(J/K),rb=5.29310^(-11)Unit(m), ec= 1.60217663410^(-19)Unit(C),Tq=1.76510^(-19)Unit(s), c= 299792458Unit(m/s),T=297Unit(K),a=1,nu1=7.88097944210^14Unit(s^(-1)),E__nu1=8.94159473310^(-20)Unit(J)};

${E__nu1 = 0.8941594733e-19*Units:-Unit(J), T = 297*Units:-Unit(K), Tq = 0.1765000000e-18*Units:-Unit(s), a = 1, c = 299792458*Units:-Unit(m/s), ec = 0.1602176634e-18*Units:-Unit(C), k = 0.1380649000e-22*Units:-Unit(J/K), nu1 = 0.7880979442e15*Units:-Unit(1/s), rb = 0.5293000000e-10*Units:-Unit(m)}$

>	N:=8PiTq^2nu^2E(nu)/(c^3(exp(E(nu)/(kT)) - 1));V:=Pi*rb^3;

8*Pi*Tq^2*nu^2*E(nu)/(c^3*(exp(E(nu)/(k*T))-1))

Find value and units of NV at nu1 and E__nu1.

>	NV:=N*V; eval(eval(NV,{E(nu)=E__nu1,nu=nu1}),params);

8*Pi^2*Tq^2*nu^2*E(nu)*rb^3/(c^3*(exp(E(nu)/(k*T))-1))

Expected units ??????????? I'll assume NV really has units J*s^3 = s kg m^2. NV has the same units as C

>	convert(1Unit(Js^3/m^3),system,base);

Non dim energy e=E/kT; non-dim time tau = t/Tg; non dim frequency f=nu*Tq,

So tau*f = t*nu =1

>	NV2:=eval(NV,{E(nu)=e(f)kT, nu=f/Tq}); const:=8Pi^2kTrb^3/c^3; NV3:=algsubs(const=C,NV2);

8*Pi^2*f^2*e(f)*k*T*rb^3/(c^3*(exp(e(f))-1))

8*Pi^2*k*T*rb^3/c^3

f^2*e(f)*C/(exp(e(f))-1)

Still rather small

>	eval(const,params);

Now we change from frequency to time by a substitution.

>	NV_tau:=dchange(f=1/tau,NV3);

e(tau)*C/(tau^2*(exp(e(tau))-1))

Difference over 1 period

>	sol_tau:=NV_tau - eval(NV_tau, tau=tau+1);

e(tau)*C/(tau^2*(exp(e(tau))-1))-e(tau+1)*C/((tau+1)^2*(exp(e(tau+1))-1))

>	sol_f:=simplify(dchange(tau=1/f,sol_tau));

f^3*e(f)*C*(f+2)/((1+f)^2*(exp(e(f))-1))

Next we differentiation sol_nu wrt nu. dsdnu has units of C*Tq

>	Diff(sol(nu),nu); dchange({nu=f/Tq},%,[f],'params'=Tq); # chain rule dsdnu:=simplify(eval(%,sol(f)=sol_f));

-((1+(e(f)-1)*exp(e(f)))*(1+f)*(f+2)*f*(diff(e(f), f))-2*e(f)*(f^2+3*f+3)*(exp(e(f))-1))*f^2*Tq*C/((1+f)^3*(exp(e(f))-1)^2)

Now we integrate from t = t0 to t0+Tq.
But dsdnu is not a finction of t (?), so this just amounts to multiplying by Tq.
B has same units as C*Tq^2

>	B:=dsdnu*Tq;

-((1+(e(f)-1)*exp(e(f)))*(1+f)*(f+2)*f*(diff(e(f), f))-2*e(f)*(f^2+3*f+3)*(exp(e(f))-1))*f^2*Tq^2*C/((1+f)^3*(exp(e(f))-1)^2)

The differential equation is sol = B*A or sol-B*A (=0 is assumed by Maple). From a unit point of view A must have same units as 1/Tq^2 = s^(-2). So write A = a/Tq^2, where a is dimensionless.

Just set the numerator zero to simplify the problem. C cancels out, and there is a single dimensionless parameter a

>	de:=simplify(numer(normal(sol_f - B*a/Tq^2)))/C/f^2;

(1+(e(f)-1)*exp(e(f)))*a*(f+2)*f*(1+f)*(diff(e(f), f))-2*(exp(e(f))-1)*e(f)*(-(1/2)*f^3+(a-3/2)*f^2+(3*a-1)*f+3*a)

No analytical solution

>	dsolve({de,e(f0)=e0},e(f));

Initial condition and end of frequency range - now numbers seem more reasonable but note exp(e1) is still large.

>	invals:=eval({f1=nu1Tq,e1=E__nu1/(kT),f2=1e18Unit(s^(-1))Tq},params);

Numerical solution for a=1

>	sol:=dsolve(eval({de,e(f1)=e1},{a=1} union invals),e(f),numeric,stiff=true);

>	odeplot(sol,[f,e(f)],f=eval(f1..f2,invals),labels=[nu/Tq,E/k/T]);

>

Download plm3.mw

maybe this?...

Answered: dharr 8522

Yesterday at 1:46 PM

1 1

It's not entirely clear what you want. This can be modified if it is not what you want.

>

List of characters to choose from

>

Random number generator to pick a number between 1 and n

>

Choose three characters

>

So to do it k times

>

As a procedure

>	rands := proc(s::string, k::posint, q::posint) local L, r, n; L := [seq(s)]; n := nops(L); r := rand(1 .. n); [seq(cat(op(L[[seq(r(), 1 .. q)]])), 1 .. k)] end proc:

>

Download rands.mw

What does linear mean?...

Answered: dharr 8522

October 08 2025

1 3

According to the text, Eq (1) has nonlinear terms. But the linear/non-linear test in pde-condition.mw says all terms are linear. That test finds it linear because if you double the function you are solving for, you double the pde. That would be consistent with the usual practice in say, second order ODEs like the Bessel equation, where multiplying y(x) by a function of x does not make it a nonlinear equation, but multiplying by a function of y(x) would.

This is the source of your problem finding R. When you choose a form u = R*ln(f)_x and substitute it into the pde, you get R*(something)=0; since the PDE is linear, multiplying it by R leads to R*pde=0 and solving for R gives zero (the pde part is zero but Maple doesn't know that).

So what is the definition of linear/non-linear that you want?

[Edit @acer had some better code for linear/nonlinear parts - maybe that already works for what you want? [moderator: example] ]

Paper is wrong...

Answered: dharr 8522

September 29 2025

2 2

Unless I've mistyped something, it looks like the paper is wrong. It is possible the complicated lambda[0] that Maple gives can be simplified to something similar to the lambda[0] in the paper (different sign perhaps), but I don't see it immediately.

>

G(xi) = (-aleph^2/((-aleph^2+2)*lambda[4]))^(1/2)*JacobiDN((lambda[2]/(-aleph^2+2))^(1/2)*xi, aleph)

>

lambda[0] = -(aleph^4*(aleph^2-lambda[2])*JacobiSN(lambda[2]^(1/2)*(-1/(aleph^2-2))^(1/2)*xi, aleph)^4+(-2*aleph^4+2*aleph^2*lambda[2])*JacobiSN(lambda[2]^(1/2)*(-1/(aleph^2-2))^(1/2)*xi, aleph)^2+(lambda[2]+1)*aleph^2-2*lambda[2])*aleph^2/(lambda[4]*(aleph^2-2)^2)

>

Paper has lambda[0] as

>

eq3 := lambda[0] = lambda[2]^2*(-aleph^2+1)/(lambda[4]*(-aleph^2+2)^2)

lambda[0] = lambda[2]^2*(-aleph^2+1)/(lambda[4]*(-aleph^2+2)^2)

Check paper version

>

-(aleph^2-lambda[2])*(JacobiSN(lambda[2]^(1/2)*(-1/(aleph^2-2))^(1/2)*xi, aleph)^4*aleph^6-2*JacobiSN(lambda[2]^(1/2)*(-1/(aleph^2-2))^(1/2)*xi, aleph)^2*aleph^4+(lambda[2]+1)*aleph^2-lambda[2])/(lambda[4]*(aleph^2-2)^2)

The two lambda[0]'s are not the same;

>

-(aleph^2-lambda[2])*(JacobiSN(lambda[2]^(1/2)*(-1/(aleph^2-2))^(1/2)*xi, aleph)^4*aleph^6-2*JacobiSN(lambda[2]^(1/2)*(-1/(aleph^2-2))^(1/2)*xi, aleph)^2*aleph^4+(lambda[2]+1)*aleph^2-lambda[2])/(lambda[4]*(aleph^2-2)^2)

>

Download compare.mw

partial answer...

Answered: dharr 8522

September 29 2025

1 3

The following works except for the indexed names where the index is a constant, such as m[e]. Probably I would consider assigning these to variables m__e rather than m['e'] and always needing the uneval quotes.

Download Using_the_constants_.mw

name(assignable)...

Answered: dharr 8522

September 29 2025

3 0

Download indets.mw

size...

Answered: dharr 8522

September 28 2025

0 0

If you make a larger size plot using size=[1000,1000] then you can get minimal overlap. The orientation of the plot differs each time you hit enter on the DrawGraph command, and that influences the amount of overlap, so you want to repeat until you get a nice result. Then exporting with the right-click menu to prn gives you a 1000x1000 pixel image.

Download DrawGraph.mw

This is the output prn file:

removing singularity...

Answered: dharr 8522

September 27 2025

1 3

Here I removed the singularity by multiplying by the denominator and so derived Eq. 9. Is that what you wanted or were you looking for something more? Maybe the ConservedCurrents would work after a while. But the condition in the paper does not seem to be satisfied by alpha[5]=0, n=2/3.

For the equilibria, if you don't like the complicated solutions, I think you will just have to give the parameters some numerical values and use fsolve.

>

>	with(plots):

>	with(DEtools):

>

ode := n*Omega(xi)*(2*alpha[6]*n*Omega(xi)^2+alpha[5]*n*Omega(xi)+beta)*(diff(diff(Omega(xi), xi), xi))+(2*alpha[6]*n^2*Omega(xi)^2-beta*(n-1))*(diff(Omega(xi), xi))^2-n^2*Omega(xi)^2*(-alpha[4]*Omega(xi)^4-alpha[3]*Omega(xi)^3+beta*k^2-Omega(xi)^2*alpha[2]-Omega(xi)*alpha[1]+w) = 0

n*Omega(xi)*(2*alpha[6]*n*Omega(xi)^2+alpha[5]*n*Omega(xi)+beta)*(diff(diff(Omega(xi), xi), xi))+(2*alpha[6]*n^2*Omega(xi)^2-beta*(n-1))*(diff(Omega(xi), xi))^2-n^2*Omega(xi)^2*(-alpha[4]*Omega(xi)^4-alpha[3]*Omega(xi)^3+beta*k^2-Omega(xi)^2*alpha[2]-Omega(xi)*alpha[1]+w) = 0

>	#Typesetting:-Settings(prime=xi): #Typesetting:-Settings(typesetprime=true):

I don't know why Q, QP doesn't work here, but you need to specify otherwise it is hard to work with the escaped locals Y and YP chosen by default.

>	raw := DEtools[convertsys]({ode}, {}, Omega(xi), xi, s, QP, QP)[1..2];

[[QP[1] = s[2], QP[2] = (-(2*alpha[6]*n^2*s[1]^2-beta*(n-1))*s[2]^2+n^2*s[1]^2*(-alpha[4]*s[1]^4-alpha[3]*s[1]^3+beta*k^2-alpha[2]*s[1]^2-alpha[1]*s[1]+w))/(n*s[1]*(2*n*alpha[6]*s[1]^2+n*alpha[5]*s[1]+beta))], [s[1] = Omega(xi), s[2] = diff(Omega(xi), xi)]]

Extract the denominator and scale the right hand sides by it

>	den:=denom(eval(QP[2],raw[1])); raw_eta:=map(q->rhs(q)*den,raw[1]);

[s[2]*n*s[1]*(2*n*alpha[6]*s[1]^2+n*alpha[5]*s[1]+beta), -(2*alpha[6]*n^2*s[1]^2-beta*(n-1))*s[2]^2+n^2*s[1]^2*(-alpha[4]*s[1]^4-alpha[3]*s[1]^3+beta*k^2-alpha[2]*s[1]^2-alpha[1]*s[1]+w)]

Back to the real transformed variables, which are now in terms of eta.

>	$rhs_eta := eval(raw_eta, {s[1] = Omega(eta), s[2] = y(eta)})$

[y(eta)*n*Omega(eta)*(2*alpha[6]*n*Omega(eta)^2+alpha[5]*n*Omega(eta)+beta), -(2*alpha[6]*n^2*Omega(eta)^2-beta*(n-1))*y(eta)^2+n^2*Omega(eta)^2*(-alpha[4]*Omega(eta)^4-alpha[3]*Omega(eta)^3+beta*k^2-Omega(eta)^2*alpha[2]-Omega(eta)*alpha[1]+w)]

Find equilibrium points - one is at the origin; the others are a complicated mess.

>	$equilibria := [solve(rhs_eta, {Omega(eta), y(eta)}, explicit)]; nops(%)$

Eq 9.

>

de1 := diff(Omega(eta), eta) = rhs_eta[1]; de2 := diff(y(eta), eta) = rhs_eta[2]

diff(y(eta), eta) = -(2*alpha[6]*n^2*Omega(eta)^2-beta*(n-1))*y(eta)^2+n^2*Omega(eta)^2*(-alpha[4]*Omega(eta)^4-alpha[3]*Omega(eta)^3+beta*k^2-Omega(eta)^2*alpha[2]-Omega(eta)*alpha[1]+w)

>	#now we need to construct conservative quantity

Following is too slow, but might work.

>

We want the condition diff(P,Omega) = -diff(Q,y), so we want the following to be zero

>

y(eta)*n*(2*alpha[6]*n*Omega(eta)^2+alpha[5]*n*Omega(eta)+beta)+y(eta)*n*Omega(eta)*(4*n*Omega(eta)*alpha[6]+n*alpha[5])-2*(2*alpha[6]*n^2*Omega(eta)^2-beta*(n-1))*y(eta)

According to the paper this is satisfied for alpha[5]=0,n=2/3 but this seems not to be the case.

>	$factor(cons_eq); eval(%, {n = 2/3, alpha[5] = 0})$

(8/9)*y(eta)*alpha[6]*Omega(eta)^2

>

Download bi-1.mw

Also no solution...

Answered: dharr 8522

September 26 2025

2 5

Following @rcorless's suggestion, a "dimensional" analysis allows us to eliminate two variables, but we still cannot solve it in any reasonable time; the same conclusion that @sand15 came to.

>

K2 := -(Pn-Pr)/(1-delta)+(-beta*((-2*delta+2)*tau^2+((-Pn+Pr-delta+1)*Cr+(-2+2*delta)*(w+i2))*tau+Cr*i2*(-1+delta+Pn-Pr))*upsilon/((4*delta-4)*tau+Cr*(-1+delta+Pn-Pr))+Pr)/delta+(Pr-w-Cr)*beta*(-2+2*delta)*tau*upsilon/(((4*delta-4)*tau+Cr*(-1+delta+Pn-Pr))*delta) = 0

>

K3 := 1-(Pn-Pr)/(1-delta)-(Pn-Cn)/(1-delta)+(Pr-w-Cr)*(1/(1-delta)-(-beta*(Cr*i2-Cr*tau)*upsilon/((4*delta-4)*tau+Cr*(-1+delta+Pn-Pr))+beta*((-2*delta+2)*tau^2+((-Pn+Pr-delta+1)*Cr+(-2+2*delta)*(w+i2))*tau+Cr*i2*(-1+delta+Pn-Pr))*upsilon*Cr/((4*delta-4)*tau+Cr*(-1+delta+Pn-Pr))^2)/delta)+Ce*rho0/(1-delta) = 0

>

Write as numerator over denominator then just take the numerators, which we want equal to zero.

>

Let's try @rcorless's suggestion to reduce the number of variables.
All the terms in Q2 have the same dimensions. If we divide all terms by the first term, then each of the new terms is dimensionless.

>

Combine with the ones from Q3 and Q4 and remove duplicates. We want the "real" variables Pr, Pn and w last.

>

terms := [{Q2nondims, op(2 .. (), expand(Q3/op(1, Q3))), op(2 .. (), expand(Q4/op(1, Q4)))}[]]; nterms := nops(terms); allvars := [(`minus`(indets(terms), vars))[], vars[]]; nvars := nops(allvars)

We construct a matrix K that contains the powers of allvars (rows) in each of the terms (columns)
Matrix K has 12 rows but rank 10, so we can eliminate 12-10=2 variables. The code below shows we can, for example eliminate beta and Ce (these are the ones = 1 in "rewrites").

>	K := Matrix(nvars, nterms, (i, j) -> diff(terms[j], allvars[i])*allvars[i]/terms[j]): DataFrame(K,rows=allvars,columns=[$nops(terms)]); r1:=Rank(K);

Some technical stuff. See E. Hubert, G, Labahn, Found Comput Math 13 (2013) 479–516, doi:10.1007/s10208-013-9165-9.

or https://youtu.be/Nl2FBAbU1pE

>

H, U := HermiteForm(K, output = ['H', 'U'], method = 'integer'):
Determinant(U):
A := U[-nvars + r1 .. -1, ..]:
rA := Rank(A):
V:=ColumnHermiteFormSpecial(A): #ColumnHermiteFormSpecial is in startup region
# Find the non-dim variables
nondims := table():
for i to nvars-rA do
        nondimvars[i]:=cat(allvars[i+rA], "__new");
        nondims[i] := nondimvars[i] = mul(allvars^~V[.., i+rA]);
end do:
nondimvars:=convert(nondimvars,list):
nondims:=convert(nondims, list);
W:=V^(-1):
Wd:=W[-(nvars-rA)..-1,..]:
rewrites := table():
for i to nvars do
        rewrites[i] := allvars[i] = mul(nondimvars^~Wd[.., i])
end do:
rewrites := convert(rewrites, list);

[Ce = 1, Cn = Cr__new, Cr = beta__new, beta = 1, delta = delta__new, i2 = i2__new, rho0 = rho0__new, tau = tau__new, upsilon = upsilon__new, Pn = Pn__new, Pr = Pr__new, w = w__new]

The naming isn't optimal here so we'll ignore it and make up our own. Basically (see nondims), we can leave all variables the same except introduce R=Ce*rho0, B=beta*upsilon. (I used R instead of rho0__new, B instead of upsilon_new.) So we need to do the following substitutions to get rid of Ce and beta.

>

eqBR := {B = beta*upsilon, R = Ce*rho0}; eqCebeta := solve(eqBR, {Ce, beta}); eqs := eval({Q2, Q3, Q4}, eqCebeta); newvars := indets(eqs)

We are down to 3 unknowns and 7 parameters, but this is still too hard for solve. Trying a polynomial solve specifying that we want vars in terms of the others is still too slow. We can get solutions without backsubstitution if we let it choose the solver choose the variable order by specifying newvars as a set.

>

We have 8 solutions. Some are simple, e.g. tau=Cr=0. We should check that even if they solve {Q2,Q3,Q4}, they also don't give a division by zero error for {K2,K3,K4}

>

sols[2]; eval({Q2, Q3, Q4}, {Cr = 0, tau = 0}); eval({K2, K3, K4}, {Cr = 0, tau = 0})

Error, numeric exception: division by zero

For solution 1 we have B=0 (so either beta=0 or upsilon=0), and a range of solutions only for particular relationships involving Pn-Pr, not Pn and Pr separately. The solution is only valid when delta is not 1.

>

sols[1]; eqPn := isolate(%[1][2], Pn); simplify(eval(eval({Q2, Q3, Q4}, eqBR), {eqPn, beta = 0})); simplify(eval(eval({K2, K3, K4}, eqBR), {eqPn, beta = 0}))

Error, numeric exception: division by zero

This one also depends on Pn-Pr

>

sols[3]; simplify(eval(eval({Q2, Q3, Q4}, eqBR), {Pn = Pr-delta+1, tau = 0})); simplify(eval(eval({K2, K3, K4}, eqBR), {Pn = Pr-delta+1, tau = 0}))

Error, numeric exception: division by zero

Cr = 0 and delta=1 is a solution but not to the originals

>

sols[4]; eval({Q2, Q3, Q4}, {Cr = 0, delta = 1}); eval({K2, K3, K4}, {Cr = 0, delta = 1})

Error, numeric exception: division by zero

The next one has only the combination Pr-Pn=0 i.e. Pr=Pn

>

sols[5]; eval({Q2, Q3, Q4}, {Pr = Pn, delta = 1}); eval({K2, K3, K4}, {Pr = Pn, delta = 1})

Error, numeric exception: division by zero

Similar to above but a more complicated relationship. For a given Pr we can get w and Pn. delta=0

>

sols[8]; eqwPn := eval(solve(%[1][1 .. 2], {Pn, w}), eqBR); simplify(eval(eval({Q2, Q3, Q4}, eqBR), {eqwPn[], delta = 0})); simplify(eval(eval({K2, K3, K4}, eqBR), {eqwPn[], delta = 0}))

$[[((-Pn+Pr+1)*Cr+2*tau)*B*i2+(-2*tau^2+((Pn-Pr-3)*Cr+2*Pr)*tau)*B-4*tau*Pr+((Pn-1)*Pr-Pr^2)*Cr, w+Cr-Pr, delta], {((-Pn+Pr+1)*Cr+2*tau)*B <> 0}]$

${Pn = (Cr*Pr*beta*i2*upsilon-Cr*Pr*beta*tau*upsilon+Cr*beta*i2*upsilon-3*Cr*beta*tau*upsilon+2*Pr*beta*tau*upsilon+2*beta*i2*tau*upsilon-2*beta*tau^2*upsilon-Cr*Pr^2-Cr*Pr-4*Pr*tau)/(Cr*(beta*i2*upsilon-beta*tau*upsilon-Pr)), w = -Cr+Pr}$

Error, numeric exception: division by zero

In this case we get a solution for all of Pr,Pn,w for {Q2,Q3,Q4} but not for the original system. Close!

>

sols[7]; eqwPn := eval(solve(%[1], {Pn, Pr, w}), eqBR); simplify(eval(eval({Q2, Q3, Q4}, eqBR), eqwPn)); simplify(eval(eval({K2, K3, K4}, eqBR), eqwPn))

$[[(Pr-Pn-delta+1)*Cr*i2+(4*delta-4)*tau^2+((2*Pn-2*Pr+6*delta-6)*Cr+(-4*delta+4)*Pr)*tau, w+Cr-Pr, (4*delta-4)*tau+Cr*(-Pr+Pn+delta-1)], {(Pr-Pn-delta+1)*Cr <> 0, 4*delta-4 <> 0}]$

${Pn = (Cr^2-Cr*delta+Cr*i2-Cr*tau-4*delta*tau+Cr+4*tau)/Cr, Pr = i2-tau+Cr, w = i2-tau}$

Error, (in simplify/normal) numeric exception: division by zero

And now the hard one, which is probably not so different from the original

>

And we still cannot solve this in any reasonable time.

>

Download Q_solve2.mw

corrections...

Answered: dharr 8522

September 24 2025

1 9

Corrected. I entered psi(y) directly instead of using psi:=psi(y). You can use diff_table to shorten how the odes are entered, but then you also shorten how the derivatives are entered.

The first and second derivatives of a function of 1 variable are D(psi)(1) and (D@@2)(psi)(1); the D[1] and D[2] notation means derivative wrt 1st or 2nd variable if you have a function of two variables.

OdeSys and Cond should have been sequences not lists; you then can combine them into the single list [OdeSys,Cond].

I changed the y range from -1.5..1.5 to -1..1 to agree with the bcs otherwise odeplot gives a warning and changes them anyway.

All your plots are on top of each other; I guess the value of Rd doesn't make much difference.

Download pulatile_flow_error.mw

Using combstruct...

Answered: dharr 8522

September 23 2025

4 3

Your description is not very clear, but I think the following does what you want.

>

Define trees with k branches from each node. Z here is a leaf on the tree.

>

Find all possibilities

>

Convert the Prod(...) to [...]

>

The LeafToSymbol routine below then substitutes the a,b,c,d for the Z's

Here is a procedure to carry out the whole thing

>

Groupings := proc(L::list(symbol), k::posint)
local Tree, Leaf, sys, n, lists, LeafToSymbol;
LeafToSymbol := proc(lst) local S, x;
  S:=String(lst);
  for x in L do
    S := StringTools:-Substitute(S, "Leaf", String(x));
  end do;
  parse(S)
end proc;
if k = 1 then error "k must be greater than 1" end if;
n := nops(L);
sys := {Tree = 'Union'(Leaf, 'Prod'(Tree $ k)), Leaf = 'Atom'};
lists := eval(combstruct['allstructs']([Tree, sys], 'size' = n), 'Prod' = (()->[args]));
map(LeafToSymbol, lists);
end proc:

>

Download Groupings.mw

On a technical note, there has to be a more elegant way to implement LeafToSymbol that doesn't involve conversion to a string, string proccessing and parse, but I'm out of ideas today.

matrixplot...

Answered: dharr 8522

September 22 2025

0 1

Here's one way to look at the matrix (in Maple 2025 there is also a colorbar that doesn't display here).

Download image.mw

solve simultaneously...

Answered: dharr 8522

September 22 2025

2 0

For your new question, I believe this is what you want?

Simultaneously_solve.mw

66 solutions...

Answered: dharr 8522

September 21 2025

1 3

You had an extra 0=0 equation. Not sure that made much difference, but more importantly if you leave out the explicit option, you get back 66 solutions in a quite short time. If they have RootOfs, you can use allvalues on them. If you want to keep option explicit and wait longer, you could try maxsols=200 (or perhaps infinity)

f-p-.mw

Too complicated...

Answered: dharr 8522

September 20 2025

2 0

[Edited] The immediate error is just because solve returned NULL. You can find a parametric solution (at least in Maple 2025).

There are very many parameters here. What sort of answer do you want here - many specifications of say 10 different conditiions between parameters that leads to the relation being true? If so you could look more into the parametric solution that Maple provides. Note that many of the cases are for negative parameters and so not of interest. Making assumptions might narrow down the possibilities but the time will likely be too long. A full analysis might also be possible with the tools in the regular chains package.

Otherwise a more manual solution might make some progress, but would need more input about feasible parameter ranges, e.g., you may know that delta<1 or eta>1.

>

>	temp := collect(ineq,i1);

rho*(1-(Pn-Pr)/(1-delta)+eta*(Pn-Pr)/(1-delta)) <= (1/2)*beta*upsilon*i1^2/(tau*delta)+((1/2-(1/2)*i2/tau)*beta*upsilon/delta+(1/2)*(1-Pr/delta)/tau+eta*beta*upsilon/delta)*i1+(1/2-(1/2)*i2/tau)*(1-Pr/delta)-eta*Pr/delta

Move the lhs over to the rhs

>

0 <= (1/2)*beta*upsilon*i1^2/(tau*delta)+((1/2-(1/2)*i2/tau)*beta*upsilon/delta+(1/2)*(1-Pr/delta)/tau+eta*beta*upsilon/delta)*i1+(1/2-(1/2)*i2/tau)*(1-Pr/delta)-eta*Pr/delta-rho*(1-(Pn-Pr)/(1-delta)+eta*(Pn-Pr)/(1-delta))

It looks as thogh Maple can solve the whole problem, but it will be a nightmare sorting through the various 1368 cases (and the "otherwise" case).

>

A typical condition and result.

>

Let's simplify by collecting the complicated combinations of parameters into simpler parameters

>	params:={(a,b,c)=~(seq(coeff(rhs(temp2),i1,k),k=2..0,-1))};

{a = (1/2)*beta*upsilon/(tau*delta), b = (1/2-(1/2)*i2/tau)*beta*upsilon/delta+(1/2)*(1-Pr/delta)/tau+eta*beta*upsilon/delta, c = (1/2-(1/2)*i2/tau)*(1-Pr/delta)-eta*Pr/delta-rho*(1-(Pn-Pr)/(1-delta)+eta*(Pn-Pr)/(1-delta))}

So in simpler form we have

>	temp3 := 0 <= ai1^2 + bi1 + c;

>

piecewise(And(a = 0, b = 0, 0 <= c), [[i1 = i1]], And(a = 0, 0 < b), [[-c/b <= i1]], And(a = 0, b < 0), [[i1 <= -c/b]], And(0 < a, (1/4)*b^2/a <= c), [[i1 = i1]], And(0 < a, c < (1/4)*b^2/a), [[i1 <= -(1/2)*(b+(-4*a*c+b^2)^(1/2))/a], [(1/2)*(-b+(-4*a*c+b^2)^(1/2))/a <= i1]], And(a < 0, (1/4)*b^2/a <= c), [[(1/2)*(-b+(-4*a*c+b^2)^(1/2))/a <= i1, i1 <= -(1/2)*(b+(-4*a*c+b^2)^(1/2))/a]], [])

Aside from the cases with b=0, there are three different cases, depending on the value of , which is just the discriminant of the quadratic a*i1^2+b*i1+c. We want to know the values of i1 for which the parabola is above the i1 axis. Since a is positive, the parabola is not inverted. If the roots are complex, and the whole parabola is above the axis. This is case 4. If the roots are real (part of the parabola is below/on the axis) and for the relation to hold i1 must be greater than the more positive root or less than the more negative root (outside the interval between the roots) - this is case 5. Case 6 is for a<0, which is not of interest.

So we want to find when the discriminant is positive or negative

>

-2*((1/2-(1/2)*i2/tau)*(1-Pr/delta)-eta*Pr/delta-rho*(1-(Pn-Pr)/(1-delta)+eta*(Pn-Pr)/(1-delta)))*beta*upsilon/(tau*delta)+(1/4)*(upsilon*((-2*eta-1)*tau+i2)*beta-delta+Pr)^2/(tau^2*delta^2)

This is going to depend on the exact values of the parameters and is still a complicated problem. But if you know some extra conditions you might be able to narrow it down. For example it seems important to know if delta<1

>

So this is progress, but not enough to narrow it down

>

${Pn = (1/8)*(4*beta^2*delta*eta^2*tau^2*upsilon^2-4*beta^2*delta*eta*i2*tau*upsilon^2+4*beta^2*delta*eta*tau^2*upsilon^2-4*beta^2*eta^2*tau^2*upsilon^2+8*Pr*beta*delta*eta*rho*tau*upsilon+beta^2*delta*i2^2*upsilon^2-2*beta^2*delta*i2*tau*upsilon^2+beta^2*delta*tau^2*upsilon^2+4*beta^2*eta*i2*tau*upsilon^2-4*beta^2*eta*tau^2*upsilon^2+4*Pr*beta*delta*eta*tau*upsilon-8*Pr*beta*delta*rho*tau*upsilon-beta^2*i2^2*upsilon^2+2*beta^2*i2*tau*upsilon^2-beta^2*tau^2*upsilon^2+4*beta*delta^2*eta*tau*upsilon+8*beta*delta^2*rho*tau*upsilon-2*Pr*beta*delta*i2*upsilon+2*Pr*beta*delta*tau*upsilon-4*Pr*beta*eta*tau*upsilon+2*beta*delta^2*i2*upsilon-2*beta*delta^2*tau*upsilon-4*beta*delta*eta*tau*upsilon-8*beta*delta*rho*tau*upsilon+2*Pr*beta*i2*upsilon-2*Pr*beta*tau*upsilon-2*beta*delta*i2*upsilon+2*beta*delta*tau*upsilon+Pr^2*delta-2*Pr*delta^2+delta^3-Pr^2+2*Pr*delta-delta^2)/(rho*beta*upsilon*tau*delta*(eta-1)), Pr = Pr, beta = beta, delta = delta, eta = eta, i2 = i2, rho = rho, tau = tau, upsilon = upsilon}$

>

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These are answers submitted by dharr

Numerical solution after non-dimensional...

maybe this?...

What does linear mean?...

Paper is wrong...

partial answer...

name(assignable)...

size...

removing singularity...

Also no solution...

corrections...

Using combstruct...

matrixplot...

solve simultaneously...

66 solutions...

Too complicated...

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