# Solve numerically:

soln := dsolve({eq1, eq2, eq3, ic1, ic2, ic3}, numeric)

pn := plots:-display(
  plots:-odeplot(soln, [t, U(t)], t=0..10, color=red  , legend=typeset(U(t))),
  plots:-odeplot(soln, [t, V(t)], t=0..10, color=blue , legend=typeset(V(t))),
  plots:-odeplot(soln, [t, w(t)], t=0..10, color=green, legend=typeset(w(t)))
):

display(pn)

Order := 20:

sols:= dsolve({eq1, eq2, eq3, ic1, ic2, ic3}, {U(t), V(t), w(t)}, type='series'):
sols := map(convert, sols, polynom):

ps := plots:-display(
  plot(eval(U(t), sols), t=0..10, color=red  , style=point, symbol=circle),
  plot(eval(V(t), sols), t=0..10, color=blue , style=point, symbol=circle),
  plot(eval(w(t), sols), t=0..10, color=green, style=point, symbol=circle)
):

display(pn, ps, view=[default, 0..4])

restart

with(LinearAlgebra):

J := Matrix(3, 3, [[0, 0, -m+Rstar/m], [xi, -1, m-Rstar/m], [0, 1, -m]])

char_poly := CharacteristicPolynomial(J, lambda)

# Coefficients of lambda in char_poly sorted by decreasing powers of lambda

c := [coeffs(char_poly, lambda, 'p')];
sort([p]);
c := c[sort([p], output=permutation)]

# Condiitons for char_poly to be a Hurwitz polynomial

HurwitzConditions := { (c >~ 0)[], c[2]*c[3] - c[1]*c[4] > 0};

# char_poly is a Hurwitz polynomial iif

sol := {solve(HurwitzConditions)}:
print~(%):
 

# Check that random choices of (m, xi, Rstar) which verifie sol[2] lead
# to characteristic polynomials whose roots have a negative real part.

ind := indets(sol):

K    := 1:
sol[K];
V    := {m = rand(0.0 .. 1.)()}:
W    := select(has, eval(sol[K], V), ind):
V    := V union select(type, W, `=`):
W    := select(has, eval(sol[K], V), ind):
V    := V union {Rstar = rand(lhs(W[1])..2*lhs(W[1]))()};

eval(char_poly, V):
evalf([solve(%)]):
Re~(%);

# Check that random choices of (m, xi, Rstar) which verifie sol[2] lead
# to characteristic polynomials whose roots have a negative real part.

ind := indets(sol):

K    := 2:
sol[K];
V    := {m = rand(0.0 .. 1.)(), xi = rand(0.0 .. 1.)()}:
W    := select(has, eval(sol[K], %), ind):
V    := V union {Rstar = rand(lhs(W[1])..rhs(W[2]))()};

eval(char_poly, V):
evalf([solve(%)]):
Re~(%);

# Check that random choices of (m, xi, Rstar) which verifie sol[3] lead
# to characteristic polynomials whose roots have a negative real part.

ind := indets(sol):

K    := 3:
sol[K];
V    := {m = rand(0.0 .. 1.)()}:
W    := select(has, eval(sol[K], V), ind):
V    := V union {xi = rand(2*rhs(W[3])..rhs(W[3]))()}:
W    := select(has, eval(sol[K], V), ind):
V    := V union {Rstar = rand(lhs(W[1])..rhs(W[2]))()};

eval(char_poly, V):
evalf([solve(%)]):
Re~(%);

# Check that random choices of (m, xi, Rstar) which verifie sol[4] lead
# to characteristic polynomials whose roots have a negative real part.

ind := indets(sol):

K    := 4:
sol[K];
V    := {m = rand(0.0 .. 1.)()}:
W    := select(has, eval(sol[K], V), ind):
V    := V union {xi = rand(lhs(W[1])..rhs(W[3]))()}:
W    := select(has, eval(sol[K], V), ind):
V    := V union {Rstar = rand(lhs(W[1])..2*lhs(W[1]))()};

eval(char_poly, V):
evalf([solve(%)]):
Re~(%);

# Check that random choices of (m, xi, Rstar) which verifie sol[5] lead
# to characteristic polynomials whose roots have a negative real part.

ind := indets(sol):

K    := 5:
sol[K];
V    := {m = rand(-1.0 .. 0.)()};
W    := select(has, eval(sol[K], V), ind);
V    := V union {xi = rand(lhs(W[1])..rhs(W[3]))()};
W    := select(has, eval(sol[K], V), ind);
V    := V union {Rstar = rand(2*rhs(W[1])..rhs(W[1]))()};

eval(char_poly, V):
evalf([solve(%)]):
Re~(%);

Error, too many levels of recursion

# For k=0 the computation of T2 is responsible of the error.
# When r=0 you invoke Theta[r+2]= Theta[2]=Theta[k+2] (being processed) for k=2.
#
# Check your indices.

for k  from 0 to 7 do
  Theta_Indices_in_T1 := seq([k-r+1, r+1], r = 0 .. k);
  T1 := beta*add((k-r+1)*Theta[k-r+1]*(r+1)*Theta[r+1], r = 0 .. k);
  Theta_Indices_in_T2 := seq([k-r, r+2], r = 0 .. k);
  T2 := beta*add(Theta[k-r]*(r+1)*(r+2)*Theta[r+2], r = 0 .. k);

  T3 := beta*add(add(Theta[r-m]*(k-r+1)*Theta[k-r+1]/(1+delta[m-1]), m = 0 .. r), r = 0 .. k);

  T4 :=add((k-r+1)*Theta[k-r+1]/(1+delta[r-1]), r = 0 .. k)-2*lambda*Theta[k];

  Theta[k+2] := -1/((k+1)*(k+2))*(T1+T2+T3+T4)
end do;

Error, too many levels of recursion

with(Student[MultivariateCalculus]):

# Preliminaries

f0 := evalf(f):
g  := phi -> .5*(1+tanh(phi)):  # note that 0 <= g(..) <= 1

Tf := (n, p, q) -> mtaylor(f0, [xx=p, yy=q], n);
Tg := (m, n, p, q) -> mtaylor(g(Tf(n, p, q)), [xx=p, yy=q], m);

# examples

Tf(5, 0, 0):
Tg(4, 5, 0, 0):

 

# Observe expression g(f0)):

# Observation 1:
#
# As the expression below is numerical equal to 0, and because the min value
# of g(any_function) is 0 too, xx=yy=0 is already extremely far from the
# region where g(..) takes values significantly larger than 0 and lower then 1.


eval(f0, [xx=0, yy=0]);
g(%);
 

# Observation 2:
#
# Can we get an approximation of where the previous region takes place?
# To do this we search(arbitrarily on the direction <xx, yy=xx> and get

BL := fsolve(eval(g(f0), yy=xx)=0.001);
BR := fsolve(eval(g(f0), yy=xx)=0.999);
plot3d(
  g(f0)
  , xx=BL..BR, yy=BL..BR
  , color = blue
  , style = surface
);

# Consider now the taylor expansion of g(f0) around xx = yy = AT
# where AT stands for (BL+BR)/2).
#
# Comparing the values of g(g0) and TG(5, AT, AT) shows a good agreement.


AT := (BL+BR)/2;
eval(g(f0), [xx=AT, yy=AT]);


Tg(5, (BL+BR)/2, (BL+BR)/2):
eval(%, [xx=AT, yy=AT]);

# Before computing the Taylor expansion of g(f0), let us
# begin observing how close could be g(f0) and g(Tf(n, AT, AT)).
#
# Taking arbitrarily n=2 already gives a good agreement.
# For more security I will nevertheless use the value n = 3.

plot3d(
  [g(f0),  g(Tf(3, AT, AT))]
  , xx=BL..BR, yy=BL..BR
  , color = [blue, red]
  , style = [surface$2]
);

# Finally ask yourself theis simple question:
#  "Can the Taylor expansion of tanh(x) around x=0 be reasonably acute
#   in the range, let's say -4..4, where on considers than tanh(x)
#   takes values in its almost complete rnge of variation 1..1?@
#
# Let us see:

plot(
  [tanh(x), seq(mtaylor(tanh(x), x, k), k=4..16, 4)]
  , x=-4..4
  , color=[blue, red, orange, cyan, green]
  , legend=[typeset(tanh(x)), seq(cat("k=", k), k=4..16, 4)]
  , view=[default, -2..2]
  , gridlines=true
)

# The conclusion is obvious: as no Taylor expansion of tanh(x) gives
# an acceptable representation of tanh(x) outside of a limited range
# (here around -1..1), there is absolutely no chance at all that
# a Taylor expansion og g(f0) will give you a reliable representation
# in a quite limited range around yy=AT (as you see the variation of
# g(f0) is far more rapid along yy than along xx).


# Defining the range where tanh(x) has significant variations this way

SignificantRange := fsolve(tanh(x)=-0.999)..fsolve(tanh(x)=0.999);

# one observes this range extends far from 0 for about 2.4 times the radius of
# convergence of its Taylor expansion.
# Converting this radius of convergence in terms of BR and BL then gives:

xi := (Pi/2) / op(2, SignificantRange);

# and then

ConvergenceRange := AT-(AT-BL)*xi .. AT+(BR-AT)*xi;

g35f3 := Tg(35, 3, AT, AT):

plot3d(
  [g(f0), g35f3]
  , xx=ConvergenceRange, yy=ConvergenceRange
  , color = [blue, red]
  , style = [surface$2]
);

# But if push further out from this range

PossibleRange := AT-(AT-BL)*(xi*1.1) .. AT+(BR-AT)*(xi*1.1);


plot3d(
  [g(f0), g35f3]
  , xx=PossibleRange, yy=PossibleRange
  , color = [blue, red]
  , style = [surface$2]
);

R0, NoR0 := selectremove(has, [op(expand(lhs(z11)))], r);
R0, NoR0 := map(add, [R0, NoR0])[]

R0 := factor(R0)

# Remark:
#
# The notation f(i+(1/2)*h, t) is commonly ised to represent symbolically the
# mean value of fome function f(x, t) at time t within the interval [i, i+h].
#
# More precisely, in discretization scheme f(i+(1/2)*h, t) is th approximation
# of int(r(x, t), x=i..i+h) got by the mid-point rule.
#
# This strategy, when it comes to a function representing a mass is named
# "mass lumping". This name is used whatever the function f represents
#
# Thus here

MassLumping := r(i+(1/2)*h, t) = ``(r(i+h, t)+r(i, t))/2

# Generally one starts from the continuous equation and then derive a discretization
# scheme from it.
# For instance, assuming is mass-liming is used, a term such as r(x, t)*diff(r(x, t), x)
# could be discretized as:
r(x, t)*diff(r(x, t), x) = r(i+(1/2)*h, t) . ``((r(i+h, t)-r(i, t)) / h);

# Now let's try to buid the continuous PDE from its discretzation
# ASSUMING THE MASS-LUMPING STRATEGY IS USED
#
# Step 1 , for convenience set: I/h = C

R0 := algsubs(I/h = C, R0);

# Set 2:


FromMassLumping := 2*~(rhs=lhs)(value(MassLumping));

R := subsop(2=rhs(FromMassLumping), R0)

# Set 3: identify the second term in R using a 2nd order Taylor expansion

MyRule := op(2, R) = convert(convert(taylor(op(2, R), h, 2), polynom), diff)

# Set 4: use MyRule to rewrite R

R := eval(eval(R, C=I/h), MyRule)

# Set 5: use a 1st order expansion of r(i+(1/2)*h, t) as h --> 0

UnlumpedMass := op(-1, R) = convert(taylor(op(-1, R), h, 1), polynom)

# Set 6: use a 1st order expansion of r(i+(1/2)*h, t) as h --> 0

R := eval(R, UnlumpedMass)

# Set 7: finally replace "i" by "x"

R := eval(R, i=x)

# Step 8: focus on NoR:
#
# Basically I apply here some of the same steps as above

NoR := algsubs(I/h = C, NoR0);
NoR := eval(NoR, i=x);
NoR := convert(convert(taylor(NoR, h, 2), polynom), diff);
NoR := eval(NoR, C=I/h)

# Step 9: assembling

ContinuousPDE := R + NoR

restart

`eq (3.4)` := a^3*b*xi^2*(diff(V(xi), `$`(xi, 2)))+a^3*b*xi*(diff(V(xi), xi))+3*a^2*b*V(xi)^2-(3*a*c+2*b*omega)*V(xi)

# The "constant V" case:
# Let K a non null constant

Cst := factor(eval(`eq (3.4)`, V(xi)=K)):

# K being non nul by definition one keeps onlu

Cst := Cst/K:

# Then Cst is null if

isolate(Cst, omega):

# The special case displayed in the excerpt you reproduce corresponds to K=a/3
# (why this choice?).
map(factor, eval(%, K=a/3))

verbose := false:

Guess := xi -> (p[0]+p[1]*xi+p[2]*xi^(2)+p[3]*xi^(3))/(q[0]+q[1]*xi+q[2]*xi^(2)+q[3]*xi^(3))

# Plug this guess into `eq (3.4)`

f := eval(`eq (3.4)`, V=(xi -> Guess(xi))):

if verbose then print(f): end if:

# Assuming that the denominator doesn't vanish one can concentrate on the numerator of f.
# This numerator is to be seen seen like a polynom with indeterminate xi (9th degree)?
# For it to be identically null whatever xi, it is necessary that all the coefficients
# of this polynom are equal to 0

collect(numer(f), xi):
coefficients := [coeffs(%, xi)]:
if verbose then print(%): end if:

SOL := solve(coefficients):
if verbose then print~({SOL}): end if:

SOL := allvalues([SOL]):

AllPossibleSolutions := NULL:

for s in map(op, {SOL}) do
  try
   eval(Guess(xi), s):
   AllPossibleSolutions := AllPossibleSolutions, simplify(%);
  catch:
  end try
end do:

AllNonConstantSolutions := {AllPossibleSolutions}:                    # eliminate potential multiple occurrences
AllNonConstantSolutions := select(has, AllNonConstantSolutions, xi):  # select non constant guesses
AllNonConstantSolutions := remove(has, AllNonConstantSolutions, I):   # remove possibly complex solutions

print~(AllNonConstantSolutions):

# Check the last solution
#
# Note the result is obviously not 0
eval(`eq (3.4)`, diff=Diff);
eval(%, V(xi) = AllNonConstantSolutions[-1]);
simplify(value(%));

# A few words
#
# The first solution is generic and not interesting:
#
# The last solution corresponds to the solution given in equation (3.5)
# once done the transformation {a*q[1] -> q[1], p[2] -> q[2]} (remember a <> 0).
# The previous one is also the solution given in equation (3.5)
# under the transformation p[1] --> q[1] and p[2] -->  -q[2]).
#
# I didn't dig into these solutions to understand the meaning of
# AllPossibleSolutions[2..4].
 

# Give a look now to constant solutions

AllConstantSolutions := {AllPossibleSolutions}:                 # eliminate potential multiple occurrences
AllConstantSolutions := remove(has, AllConstantSolutions, xi):  # select non constant guesses
AllConstantSolutions := remove(has, AllConstantSolutions, I):   # remove possibly complex solutions

print~(AllConstantSolutions):

# A few words
#
# The first solution is obvious
#
# The last solution corresponds to the constant olution given in equation (3.5)
 

# Let's tke for instance stress[5]:

s5 := stress[5]

# You impose quite large values for the owar bounds of tau.
# So s5 is almost equal to

s5_1 := eval(s5, {seq(tau[i]=+infinity, i=1..9)})

# Assuming that the Gshave almost the same value g one gets

s5_2 := normal(eval(s5_1, {seq(G[i]=g, i=1..9)}))

# s5_2 is singular at

singular(s5_2);
plot(s5_2, g=-1e10..-1e8)

# What is the range of positive values for s5_2?
# As you impose the Gs are negative:
solve(s5_2 > 0) assuming g < 0;
domains := solve({s5_2 > 0, g < 0})

# In the two domains 5_2 is contiously increasing:

normal(diff(s5_2, g))

# The minium value of s5_2 in domains[1] is

s5_2_min_1 := limit(s5_2, g=-infinity);

# a value 10^6 times larger than true_stress[5]

# The minium value of s5_2 in domains[1] is

s5_2_min_2 := 0;

# So if you expect than s5 canbe close to true_stress[5]=191,
# it seems reasonable to impose that g verifies

domains[2]

# Note that the value of s5_2 are rapidly much higher than 191 in the
# range of interest.

plot(s5_2, g=lhs(op(1, domains[2]))..0, axis[2]=[mode=log])

# When is s5_2 equal to true_stress[5]?

solve({s5_2 = true_stress[5], domains[2][]})

# Now, assuming each tau is large enough for the limit tau -> +oo
# is reasonable, lets define this simplified problem

ObjLimit := eval(obj, {seq(tau[i]=+infinity, i=1..9)}):

# And, all the G[1],.., G[9] only intervene through their sum SG, set:

ObjSimple := algsubs(add(1.*G[i], i=1..9) = SG, ObjLimit):

ObjSimple := simplify(ObjSimple, size);

# Try to minimize ObjSimple without taking any precautions at all:

minimize(ObjSimple, location=true)

# Even for its minimizer ObjSimple gets the amazing high value 10^9.
# Might one reason be the crude approximation tau = +oo?
#
# Let's look to the values of exp(-strain/(strain_rate*tau[a])) for the
# constraints you impose to the taus.

exp(-strain/(strain_rate*tau[a]));

TauMin := {1540 = tau[1], 155260 = tau[2], 10546880 = tau[3], 6.000000000*10^8 = tau[4], 1.080000000*10^10 = tau[5], 4.040000000*10^11 = tau[6], 1.100000000*10^13 = tau[7], 1.080000000*10^14 = tau[8], 2.040000000*10^16 = tau[9]};


eval( [seq([seq(exp(-x/(strain_rate*tau[i])), i=1..9)], x in varepsilon)], (rhs=lhs)~(TauMin)):
print~(%):

# In ObjSimple I used the value "1" instead of the values above.
# As you can see my approximation is not that crude and cannot be responsible
# of the extremely high value of the minimum of ObjSimple.
#
# So the problem is elsewhere, on the side of your model certainly,
# maybe you should also look on the side of the units you use (are they consistent?)

restart

V := exp(lambda*S) = S^4*a4 + S^3*a3 + S^2*a2 + S*a1 + a0;

V1 := subs(S = 2, V);

V2 := subs(S = 1, V);

V3 := subs(S = 0, V);

V4 := subs(S = -1, V);

V5 := subs(S = -2, V);

sol := solve(subs(a0 = 1, {V1, V2, V4, V5}), {a1, a2, a3, a4});

trigsol := convert~(sol, trigh)

rel := {
         sinh(2*lambda)=2*sinh(lambda)*cosh(lambda)
         , cos(2*lambda)=cos(lambda)^2+sin(lambda)^2
       }:
map(factor, simplify(trigsol, rel))

restart

eq1 := z*(1/150-2*y)*exp(-2*Pi*x*y)+1/5*((z^2-y^2)*sin(2*Pi*x*z)-2*y*z*cos(2*Pi*x*z))=0

eq2 := (z^2-y^2+1/150*y-1)*exp(-2*Pi*x*y)+1/5*((z^2-y^2)*sin(2*Pi*x*z)+2*y*z*cos(2*Pi*x*z))=0

# As no formal solution (y(x), z(x)) can be found a good start is to
# do some graphics, to understand what happens.

Digits := 15:

X := 0.1;   # my arbitrary choice in [0, 1]

L  := 20:
NG := 1000:

pp :=
plots:-implicitplot(
  eval([eq1, eq2], x=X)
  , y=-L..L, z=-L..L
  , color=[red, blue]
  , legend=["eq1=0", "eq2=0"]
  , grid=[NG, NG]
):

# 10 solutions are likely to be seen here

plots:-display(pp)

NC1 := nops~([op(1, pp)])[]-2;  # NC1 red curves
NC2 := nops~([op(2, pp)])[]-2;  # NC2 blue curves

# Matrix representation of each curve

AllCurves := map2(op, -1, [plottools:-getdata(pp)]):

# Let J the objective function which is equal to 0 iif eq1 and eq2 areboth
# verified (log[10] is an artifact to lessen the range of variation of J)

J := log[10](add(lhs~([eq1, eq2])^~2)):

# Solution search algorithm

Digits := 15:

SignChanges      := NULL:
minima           := NULL:
SolutionsChecked := NULL:

# For each curve eq1=0
for ac in AllCurves[1..NC1] do
  pts1 := convert(ac, listlist):

  # Find the points on this curve where lhs(eq2) changes its sign
  # (points where a red and a blue curve will tangent will be missed)
  StartSign   := signum(eval(eval(lhs(eq2), x=X), [y, z] =~ pts1[1]));
  for i from 2 to numelems(pts1) do
    EndSign := signum(eval(eval(lhs(eq2), x=X), [y, z] =~ pts1[i]));
    if EndSign <> StartSign then
      StartSign   := EndSign;
      SignChanges := SignChanges, [pts1[max(1, i-2)], pts1[i]]
    end if:
  end do:
end do:
# Each couple of points (y, z) within which a sign change occurs defines
# a domain where to search a solution where J is minimal (theoritically null).
for s in [SignChanges] do
  dom := y = (min..max)(map2(op, 1, s)), z = (min..max)(map2(op, 2, s));
  try
    minima := minima, Optimization:-Minimize(eval(J, x=X), dom, optimalitytolerance=1e-8, iterationlimit=1000):
  catch:
    printf("No solution found in domain %a\n", [dom])
  end try:
end do:

# Evaluate eq1 and eq2 at the minima found.
for sol in [minima] do
  SolutionsChecked := SolutionsChecked, eval(eval(lhs~([eq1, eq2]), x=X), sol[2])
end do:
#print~(map2(op, 2, [minima]) implies~ [SolutionsChecked]):

# Due to numerical precision some minima appear to give significantly non nul solution.
# I arbitrarily discard them.
AlmostSolutions := zip((u, v) -> if `and`(is~(abs~(u) <=~ 1e-5)[]) then v end if, [SolutionsChecked], map2(op, 2, [minima])):
print~(AlmostSolutions):

plots:-display(
  pp,
  seq(
    plot([eval([y, z], AlmostSolutions[i])], style=point, symbol=circle, symbolsize=20, color=black),
    i = 1..numelems(AlmostSolutions)
  )
)

SearchSolutions := proc(X, L, {see::boolean:=false, verbose::boolean:=false})
  local NG, pp, NC1, NC2, AllCurves, SignChanges, minima, SolutionsChecked,
        ac, pts1, StartSign, i, EndSign, s, dom, sol, AlmostSolutions:
  
  uses plots:

  NG := 1000:
  pp := implicitplot(
    eval([eq1, eq2], x=X)
    , y=-L..L, z=-L..L
    , color=[red, blue]
    , legend=["eq1=0", "eq2=0"]
    , grid=[NG, NG]
    , title=typeset('x'=X)
  ):

  NC1 := nops~([op(1, pp)])[]-2;
  NC2 := nops~([op(2, pp)])[]-2;

  AllCurves := map2(op, -1, [plottools:-getdata(pp)]):

  SignChanges      := NULL:
  minima           := NULL:
  SolutionsChecked := NULL:


  for ac in AllCurves[1..NC1] do
    pts1        := convert(ac, listlist):
    StartSign   := signum(eval(eval(lhs(eq2), x=X), [y, z] =~ pts1[1]));
    for i from 2 to numelems(pts1) do
      EndSign := signum(eval(eval(lhs(eq2), x=X), [y, z] =~ pts1[i]));
      if EndSign <> StartSign then
        StartSign   := EndSign;
        SignChanges := SignChanges, [pts1[max(1, i-2)], pts1[i]]
      end if:
    end do:
  end do:

  for s in [SignChanges] do
    dom := y = (min..max)(map2(op, 1, s)), z = (min..max)(map2(op, 2, s));
    try
      minima := minima, Optimization:-Minimize(eval(J, x=X), dom, optimalitytolerance=1e-8, iterationlimit=1000):
    catch:
      if verbose then
        printf("X = %3a  No solution found in domain %a\n", X, [dom])
      end if;
    end try:
  end do:


  for sol in [minima] do
    SolutionsChecked := SolutionsChecked, eval(eval(lhs~([eq1, eq2]), x=X), sol[2])
  end do:
  AlmostSolutions := zip((u, v) -> if `and`(is~(abs~(u) <=~ 1e-5)[]) then v end if, [SolutionsChecked], map2(op, 2, [minima])):


  if see then
    print(
      plots:-display(
        pp,
        seq(
          plot([eval([y, z], AlmostSolutions[i])], style=point, symbol=circle, symbolsize=20, color=black),
          i = 1..numelems(AlmostSolutions)
        )
      )
    );
    print():
  end if:

  return AlmostSolutions
end proc:

 

SearchSolutions(0.2, 20, see=true)

# Sweep the range 0..1 for x and collect all the solutions found in this range

Xs := [seq](0.1..1, 0.1):

Sol_wrt_X := table([ seq(xs = SearchSolutions(xs, 20, verbose=true), xs in Xs) ]):

X =  .4  No solution found in domain [y = 15.6066929420051 .. 15.6457631113523, z = 15.6245382892261 .. 15.6255081599189]
X =  .4  No solution found in domain [y = 11.8689358202139 .. 11.9077186173179, z = 11.8748079235297 .. 11.8760651664658]

X =  .5  No solution found in domain [y = 12.4853581013289 .. 12.5244290234156, z = 12.499626883656 .. 12.5005960016093]

X =  .8  No solution found in domain [y = 16.5565565565565 .. 16.5965965965966, z = 16.5624419179027 .. 16.5629167275484]

X =  .8  No solution found in domain [y = 12.7927927927928 .. 12.8328328328328, z = -12.8127796536036 .. -12.8121695242539]
X =  .8  No solution found in domain [y = 5.3053053053053 .. 5.3453453453453, z = 5.31222489410908 .. 5.31366125682572]

X =  .8  No solution found in domain [y = .314327082446639 .. .356413032179948, z = -2.59865527442221 .. -2.59660936472894]

X = 1.0  No solution found in domain [y = .4604604604604 .. .5005005005005, z = -10.0192011299064 .. -10.0185580322442]
X = 1.0  No solution found in domain [y = 13.2332332332332 .. 13.2732732732732, z = 13.2497897695701 .. 13.2502623826246]

X = 1.0  No solution found in domain [y = 2.23548973487505 .. 2.27305935450115, z = 2.24899474960935 .. 2.25146517002328]

# Plot all the solutions found for each value of X in Xs

plots:-display(
  seq(
    plot(
      [seq](eval([y, z], Sol_wrt_X[k][i]), i = 1..numelems(Sol_wrt_X[k]))
      , style=point
      , symbol=solidcircle
      , symbolsize=10
      ,  color=ColorTools:-Color([rand()/10^12, rand()/10^12, rand()/10^12])
      , legend=typeset('x'=k)
      , legendstyle=[location=right]
      , labels=[y, z]
    )
    , k in Xs[2..-1]
  )
  , gridlines=true
  , view=[-0.1..20, -20..20]
  , size=[500, 400]
)

restart

expr := a^2-b^2;

solve(expr >= 0)

plots:-inequal(expr >= 0, a=-3..3, b=-3..3 );

f := u -> u^2:
g := u -> u/(1+u^2):

expr := f(x)^2 - g(y)^2;

solve(expr >= 0)

plots:-inequal(expr >= 0, x=-3..3, y=-3..3 );