@salim-barzani 

non-schrodinger.mw

@salim-barzani Converting abs to conjugate immediately doesn't always solve the problem of diff with abs, but adding the Physics package usually solves this problem.

For the substitution u(x,t) =f(x,t)*exp(I*g(x,t)), it makes sense to me that one would choose f(x,t) and g(x,t) real since then they are simply interpreted as amplitude and phase functions, and subsequent math using real functions is simpler. Since Eq 11 in the original paper in this thread has no conjugate(theta), I think those authors chose theta real.
In the last paper f(x,t) was allowed to be complex and so the equivalent of Eq 11 had complex conjugates. However then the phase is not simply g(x,t) which leads to difficulties in interpretation. Bottom line, you can do it either way.

Edit:

If one just assumes Q(x,t) is real, then one finds that m is always real, which makes sense since it is part of the phase under the assumption f(x,t) and g(x,t) are real:

p5.mw

Perhaps there is some subtle physics reason to have a complex amplitude function. But looks like different papers make different choices.

@salim-barzani Yes, I assumed Q(x,t) was real. Rather than the awkward hand-coding of abs(u(x,t)) as U, it is easier just to enter the abs as written, then use convert(.., conjugate). So here is this case, which comes out correctly. [Edit, p4 slightly more general than earlier p3]

Download p4.mw

@acer Thanks for that improvement. (I played around with this at various times, and thought I'd tried that and found it inferior, but I must have misremembered.). I expected that _d01amc would be the default for a semi-infinite range, but infolevel suggests the range was split into 2 and the part from 15 to infinity done by a non-NAG routine.

I guess the take-home message is that if you are about to do a plot with thousands of integrations, choose a specific NAG one (after testing it against the slower default) so that the overhead of the singularity analysis etc is not done thousands of times.

@Paras31 Here's an analysis that shows how to get both fast and accurate results from the Fokas method.

Download Fokas.mw

@dharr "and about step one is not about appearing twice i think, is about non linear term which we chose which a-N is bigger and non linear term is about a+b-N which N is begger and have same a then we can find b like the non couple equation ."

Let me see if I understand this. Say some terms give a-3, a-4, a-5 then we take the minimum a-5. Now suppose we have also a+b-3, a+b-4, a+b-5 so we take a+b-5. So now we set them equal and find b=0. Then the value a-5 and a+0-5 appears twice (since we set them equal). If we have different N, then we get different b (for the same a), e.g.,

a-6 = a+b-5 leads to b=-1, and then the value a-6 = a-1-5 appears twice.

Is there a problem with this?

@salim-barzani You say "intrested about the u[0],v[0] i think they are not the same which i am not sure which is corect  i don't have issue with yours one of g[x] is extra if you watch you will see". I don't see an extra g[x]; please specify exactly where this is (there are some g's there because I am not not calculating u[0] directly; do I have them incorrect?).

" the other point is about that condition how he got that condition in eq((16),  and when N=2 we have to find the u[1],u[2],..u[6] and v[1],v[2],...v[6] ". I don't see N=2 in eq 16. Please specify exactly where you mean.

You have now added the other paper here which I didn't deal with. That paper has p =1 and not p=-1 so that seems wrong to me. 

Basically I am not understanding; please spend a bit more time specifying some details of what you think is wrong or needs to be done. 

@salim-barzani To get the resonances and other solutions correct you have to evaluate with the earlier solutions (see how I did the KdV example), and the resonant ones set to zero (not sure why, but otherwise their deriatives don't disappear). 

all-steps-Dr.D.mw

I am working to understand the coupled case.

@salim-barzani I have updated the files here to reflect my improved understanding of the step 1 procedure. In particular see the plot in AllStepsHBnew.mw for how to interpret the lowest exponents rule. I'll work on the coupled case next.

@salim-barzani This paper doi.org/10.2991/jnmp.2006.13.1.8 seems clearer about how to do step 1, so I'll work through it; it also should help with the case of multiple equations as in the non-linear Schroedinger equations.

@acer's routine (and my general practice) expects the pde to be an expression, but you have added =0.

schrodinger-test.mw

@Alfred_F So in general cos/sin/exp of an algebraic number is transendental. The only thing I know about the exceptions is that Maple sometimes finds roots of a polynomial in trig form, when they might (or might not?) be also be expressible in radical form. The case of cyclotomic polynomials where these are roots of unity is the easiest to find.

Download trig.mw

@salim-barzani You're wecome. I think you can get the extra functions for the HB (and other equations) by continuing solving the equations in turn, recognizing the resonant point ones will simplify to zero, after substituting in the earlier solutions (which shows the compatibility condition is satisfied, if I understand it correctly).

Sort was improved in 2025, but nothing much relevant to differential equations, so there is probably not much need for you to upgrade to 2025.

@dharr 

Here it is, so I think I am done!

AllStepsKdVnew2.mw

AllStepsHBnew.mw

@salim-barzani I updated the solution to include step 3. It works for the Burgers equation, and it is clear that you have to think about the resonance points, and won't be able to just solve the whole system.