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 [section:remez Sample Article (The Remez Method)]

 The [@http://en.wikipedia.org/wiki/Remez_algorithm Remez algorithm]
 is a methodology for locating the minimax rational approximation
 to a function.  This short article gives a brief overview of the method, but
 it should not be regarded as a thorough theoretical treatment, for that you
 should consult your favorite textbook.

 Imagine that you want to approximate some function f(x) by way of a rational
 function R(x), where R(x) may be either a polynomial P(x) or a ratio of two
 polynomials P(x)/Q(x) (a rational function).  Initially we'll concentrate on the
 polynomial case, as it's by far the easier to deal with, later we'll extend
 to the full rational function case.

 We want to find the "best" rational approximation, where
 "best" is defined to be the approximation that has the least deviation
 from f(x).  We can measure the deviation by way of an error function:

 E[sub abs](x) = f(x) - R(x)

 which is expressed in terms of absolute error, but we can equally use
 relative error:

 E[sub rel](x) = (f(x) - R(x)) / |f(x)|

 And indeed in general we can scale the error function in any way we want, it
 makes no difference to the maths, although the two forms above cover almost
 every practical case that you're likely to encounter.

 The minimax rational function R(x) is then defined to be the function that
 yields the smallest maximal value of the error function.  Chebyshev showed
 that there is a unique minimax solution for R(x) that has the following
 properties:

 * If R(x) is a polynomial of degree N, then there are N+2 unknowns:
 the N+1 coefficients of the polynomial, and maximal value of the error
 function.
 * The error function has N+1 roots, and N+2 extrema (minima and maxima).
 * The extrema alternate in sign, and all have the same magnitude.

 That means that if we know the location of the extrema of the error function
 then we can write N+2 simultaneous equations:

 R(x[sub i]) + (-1)[super i]E = f(x[sub i])

 where E is the maximal error term, and x[sub i] are the abscissa values of the
 N+2 extrema of the error function.  It is then trivial to solve the simultaneous
 equations to obtain the polynomial coefficients and the error term.

 ['Unfortunately we don't know where the extrema of the error function are located!]

 [h4 The Remez Method]

 The Remez method is an iterative technique which, given a broad range of
 assumptions, will converge on the extrema of the error function, and therefore
 the minimax solution.

 In the following discussion we'll use a concrete example to illustrate
 the Remez method: an approximation to the function e[super x][space] over
 the range \[-1, 1\].

 Before we can begin the Remez method, we must obtain an initial value
 for the location of the extrema of the error function.  We could "guess"
 these, but a much closer first approximation can be obtained by first
 constructing an interpolated polynomial approximation to f(x).

 In order to obtain the N+1 coefficients of the interpolated polynomial
 we need N+1 points (x[sub 0]...x[sub N]): with our interpolated form
 passing through each of those points
 that yields N+1 simultaneous equations:

 f(x[sub i]) = P(x[sub i]) = c[sub 0] + c[sub 1]x[sub i] ... + c[sub N]x[sub i][super N]

 Which can be solved for the coefficients c[sub 0]...c[sub N] in P(x).

 Obviously this is not a minimax solution, indeed our only guarantee is that f(x) and
 P(x) touch at N+1 locations, away from those points the error may be arbitrarily
 large.  However, we would clearly like this initial approximation to be as close to
 f(x) as possible, and it turns out that using the zeros of an orthogonal polynomial
 as the initial interpolation points is a good choice.  In our example we'll use the
 zeros of a Chebyshev polynomial as these are particularly easy to calculate,
 interpolating for a polynomial of degree 4, and measuring /relative error/
 we get the following error function:

 [$images/remez-2.png]

 Which has a peak relative error of 1.2x10[super -3].

 While this is a pretty good approximation already, judging by the
 shape of the error function we can clearly do better.  Before starting
 on the Remez method propper, we have one more step to perform: locate
 all the extrema of the error function, and store
 these locations as our initial ['Chebyshev control points].

 [note
 In the simple case of a polynomial approximation, by interpolating through
 the roots of a Chebyshev polynomial we have in fact created a ['Chebyshev
 approximation] to the function: in terms of /absolute error/
 this is the best a priori choice for the interpolated form we can
 achieve, and typically is very close to the minimax solution.

 However, if we want to optimise for /relative error/, or if the approximation
 is a rational function, then the initial Chebyshev solution can be quite far
 from the ideal minimax solution.

 A more technical discussion of the theory involved can be found in this
 [@http://math.fullerton.edu/mathews/n2003/ChebyshevPolyMod.html online course].]

 [h4 Remez Step 1]

 The first step in the Remez method, given our current set of
 N+2 Chebyshev control points x[sub i], is to solve the N+2 simultaneous
 equations:

 P(x[sub i]) + (-1)[super i]E = f(x[sub i])

 To obtain the error term E, and the coefficients of the polynomial P(x).

 This gives us a new approximation to f(x) that has the same error /E/ at
 each of the control points, and whose error function ['alternates in sign]
 at the control points.  This is still not necessarily the minimax
 solution though: since the control points may not be at the extrema of the error
 function.  After this first step here's what our approximation's error
 function looks like:

 [$images/remez-3.png]

 Clearly this is still not the minimax solution since the control points
 are not located at the extrema, but the maximum relative error has now
 dropped to 5.6x10[super -4].

 [h4 Remez Step 2]

 The second step is to locate the extrema of the new approximation, which we do
 in two stages:  first, since the error function changes sign at each
 control point, we must have N+1 roots of the error function located between
 each pair of N+2 control points.  Once these roots are found by standard root finding
 techniques, we know that N extrema are bracketed between each pair of
 roots, plus two more between the endpoints of the range and the first and last roots.
 The N+2 extrema can then be found using standard function minimisation techniques.

 We now have a choice: multi-point exchange, or single point exchange.

 In single point exchange, we move the control point nearest to the largest extrema to
 the absissa value of the extrema.

 In multi-point exchange we swap all the current control points, for the locations
 of the extrema.

 In our example we perform multi-point exchange.

 [h4 Iteration]

 The Remez method then performs steps 1 and 2 above iteratively until the control
 points are located at the extrema of the error function: this is then
 the minimax solution.

 For our current example, two more iterations converges on a minimax
 solution with a peak relative error of
 5x10[super -4] and an error function that looks like:

 [$images/remez-4.png]

 [h4 Rational Approximations]

 If we wish to extend the Remez method to a rational approximation of the form

 f(x) = R(x) = P(x) / Q(x)

 where P(x) and Q(x) are polynomials, then we proceed as before, except that now
 we have N+M+2 unknowns if P(x) is of order N and Q(x) is of order M.  This assumes
 that Q(x) is normalised so that it's leading coefficient is 1, giving
 N+M+1 polynomial coefficients in total, plus the error term E.

 The simultaneous equations to be solved are now:

 P(x[sub i]) / Q(x[sub i]) + (-1)[super i]E = f(x[sub i])

 Evaluated at the N+M+2 control points x[sub i].

 Unfortunately these equations are non-linear in the error term E: we can only
 solve them if we know E, and yet E is one of the unknowns!

 The method usually adopted to solve these equations is an iterative one: we guess the
 value of E, solve the equations to obtain a new value for E (as well as the polynomial
 coefficients), then use the new value of E as the next guess.  The method is
 repeated until E converges on a stable value.

 These complications extend the running time required for the development
 of rational approximations quite considerably. It is often desirable
 to obtain a rational rather than polynomial approximation none the less:
 rational approximations will often match more difficult to approximate
 functions, to greater accuracy, and with greater efficiency, than their
 polynomial alternatives.  For example, if we takes our previous example
 of an approximation to e[super x], we obtained 5x10[super -4] accuracy
 with an order 4 polynomial.  If we move two of the unknowns into the denominator
 to give a pair of order 2 polynomials, and re-minimise, then the peak relative error drops
 to 8.7x10[super -5].  That's a 5 fold increase in accuracy, for the same number
 of terms overall.

 [h4 Practical Considerations]

 Most treatises on approximation theory stop at this point.  However, from
 a practical point of view, most of the work involves finding the right
 approximating form, and then persuading the Remez method to converge
 on a solution.

 So far we have used a direct approximation:

 f(x) = R(x)

 But this will converge to a useful approximation only if f(x) is smooth.  In
 addition round-off errors when evaluating the rational form mean that this
 will never get closer than within a few epsilon of machine precision.
 Therefore this form of direct approximation is often reserved for situations
 where we want efficiency, rather than accuracy.

 The first step in improving the situation is generally to split f(x) into
 a dominant part that we can compute accurately by another method, and a
 slowly changing remainder which can be approximated by a rational approximation.
 We might be tempted to write:

 f(x) = g(x) + R(x)

 where g(x) is the dominant part of f(x), but if f(x)\/g(x) is approximately
 constant over the interval of interest then:

 f(x) = g(x)(c + R(x))

 Will yield a much better solution: here /c/ is a constant that is the approximate
 value of f(x)\/g(x) and R(x) is typically tiny compared to /c/.  In this situation
 if R(x) is optimised for absolute error, then as long as its error is small compared
 to the constant /c/, that error will effectively get wiped out when R(x) is added to
 /c/.

 The difficult part is obviously finding the right g(x) to extract from your
 function: often the asymptotic behaviour of the function will give a clue, so
 for example the function __erfc becomes proportional to
 e[super -x[super 2]]\/x as x becomes large.  Therefore using:

 erfc(z) = (C + R(x)) e[super -x[super 2]]/x

 as the approximating form seems like an obvious thing to try, and does indeed
 yield a useful approximation.

 However, the difficulty then becomes one of converging the minimax solution.
 Unfortunately, it is known that for some functions the Remez method can lead
 to divergent behaviour, even when the initial starting approximation is quite good.
 Furthermore, it is not uncommon for the solution obtained in the first Remez step
 above to be a bad one: the equations to be solved are generally "stiff", often
 very close to being singular, and assuming a solution is found at all, round-off
 errors and a rapidly changing error function, can lead to a situation where the
 error function does not in fact change sign at each control point as required.
 If this occurs, it is fatal to the Remez method.  It is also possible to
 obtain solutions that are perfectly valid mathematically, but which are
 quite useless computationally: either because there is an unavoidable amount
 of roundoff error in the computation of the rational function, or because
 the denominator has one or more roots over the interval of the approximation.
 In the latter case while the approximation may have the correct limiting value at
 the roots, the approximation is nonetheless useless.

 Assuming that the approximation does not have any fatal errors, and that the only
 issue is converging adequately on the minimax solution, the aim is to
 get as close as possible to the minimax solution before beginning the Remez method.
 Using the zeros of a Chebyshev polynomial for the initial interpolation is a
 good start, but may not be ideal when dealing with relative errors and\/or
 rational (rather than polynomial) approximations.  One approach is to skew
 the initial interpolation points to one end: for example if we raise the
 roots of the Chebyshev polynomial to a positive power greater than 1
 then the roots will be skewed towards the middle of the \[-1,1\] interval,
 while a positive power less than one
 will skew them towards either end.  More usefully, if we initially rescale the
 points over \[0,1\] and then raise to a positive power, we can skew them to the left
 or right.  Returning to our example of e[super x][space] over \[-1,1\], the initial
 interpolated form was some way from the minimax solution:

 [$images/remez-2.png]

 However, if we first skew the interpolation points to the left (rescale them
 to \[0, 1\], raise to the power 1.3, and then rescale back to \[-1,1\]) we
 reduce the error from 1.3x10[super -3][space]to 6x10[super -4]:

 [$images/remez-5.png]

 It's clearly still not ideal, but it is only a few percent away from
 our desired minimax solution (5x10[super -4]).

 [h4 Remez Method Checklist]

 The following lists some of the things to check if the Remez method goes wrong,
 it is by no means an exhaustive list, but is provided in the hopes that it will
 prove useful.

 * Is the function smooth enough?  Can it be better separated into
 a rapidly changing part, and an asymptotic part?
 * Does the function being approximated have any "blips" in it?  Check
 for problems as the function changes computation method, or
 if a root, or an infinity has been divided out.  The telltale
 sign is if there is a narrow region where the Remez method will
 not converge.
 * Check you have enough accuracy in your calculations: remember that
 the Remez method works on the difference between the approximation
 and the function being approximated: so you must have more digits of
 precision available than the precision of the approximation
 being constructed.  So for example at double precision, you
 shouldn't expect to be able to get better than a float precision
 approximation.
 * Try skewing the initial interpolated approximation to minimise the
 error before you begin the Remez steps.
 * If the approximation won't converge or is ill-conditioned from one starting
 location, try starting from a different location.
 * If a rational function won't converge, one can minimise a polynomial
 (which presents no problems), then rotate one term from the numerator to
 the denominator and minimise again.  In theory one can continue moving
 terms one at a time from numerator to denominator, and then re-minimising,
 retaining the last set of control points at each stage.
 * Try using a smaller interval.  It may also be possible to optimise over
 one (small) interval, rescale the control points over a larger interval,
 and then re-minimise.
 * Keep absissa values small: use a change of variable to keep the abscissa
 over, say \[0, b\], for some smallish value /b/.

 [h4 References]

 The original references for the Remez Method and it's extension
 to rational functions are unfortunately in Russian:

 Remez, E.Ya., ['Fundamentals of numerical methods for Chebyshev approximations],
 "Naukova Dumka", Kiev, 1969.

 Remez, E.Ya., Gavrilyuk, V.T., ['Computer development of certain approaches
 to the approximate construction of solutions of Chebyshev problems
 nonlinearly depending on parameters], Ukr. Mat. Zh. 12 (1960), 324-338.

 Gavrilyuk, V.T., ['Generalization of the first polynomial algorithm of
 E.Ya.Remez for the problem of constructing rational-fractional
 Chebyshev approximations], Ukr. Mat. Zh. 16 (1961), 575-585.

 Some English language sources include:

 Fraser, W., Hart, J.F., ['On the computation of rational approximations
 to continuous functions], Comm. of the ACM 5 (1962), 401-403, 414.

 Ralston, A., ['Rational Chebyshev approximation by Remes' algorithms],
 Numer.Math. 7 (1965), no. 4, 322-330.

 A. Ralston, ['Rational Chebyshev approximation, Mathematical
 Methods for Digital Computers v. 2] (Ralston A., Wilf H., eds.),
 Wiley, New York, 1967, pp. 264-284.

 Hart, J.F. e.a., ['Computer approximations], Wiley, New York a.o., 1968.

 Cody, W.J., Fraser, W., Hart, J.F., ['Rational Chebyshev approximation
 using linear equations], Numer.Math. 12 (1968), 242-251.

 Cody, W.J., ['A survey of practical rational and polynomial
 approximation of functions], SIAM Review 12 (1970), no. 3, 400-423.

 Barrar, R.B., Loeb, H.J., ['On the Remez algorithm for non-linear
 families], Numer.Math. 15 (1970), 382-391.

 Dunham, Ch.B., ['Convergence of the Fraser-Hart algorithm for rational
 Chebyshev approximation], Math. Comp. 29 (1975), no. 132, 1078-1082.

 G. L. Litvinov, ['Approximate construction of rational
 approximations and the effect of error autocorrection],
 Russian Journal of Mathematical Physics, vol.1, No. 3, 1994.

 [endsect][/section:remez The Remez Method]
	[section:remez Sample Article (The Remez Method)]

	The [@http://en.wikipedia.org/wiki/Remez_algorithm Remez algorithm]
	is a methodology for locating the minimax rational approximation
	to a function. This short article gives a brief overview of the method, but
	it should not be regarded as a thorough theoretical treatment, for that you
	should consult your favorite textbook.

	Imagine that you want to approximate some function f(x) by way of a rational
	function R(x), where R(x) may be either a polynomial P(x) or a ratio of two
	polynomials P(x)/Q(x) (a rational function). Initially we'll concentrate on the
	polynomial case, as it's by far the easier to deal with, later we'll extend
	to the full rational function case.

	We want to find the "best" rational approximation, where
	"best" is defined to be the approximation that has the least deviation
	from f(x). We can measure the deviation by way of an error function:

	E[sub abs](x) = f(x) - R(x)

	which is expressed in terms of absolute error, but we can equally use
	relative error:

	E[sub rel](x) = (f(x) - R(x)) / \|f(x)\|

	And indeed in general we can scale the error function in any way we want, it
	makes no difference to the maths, although the two forms above cover almost
	every practical case that you're likely to encounter.

	The minimax rational function R(x) is then defined to be the function that
	yields the smallest maximal value of the error function. Chebyshev showed
	that there is a unique minimax solution for R(x) that has the following
	properties:

	* If R(x) is a polynomial of degree N, then there are N+2 unknowns:
	the N+1 coefficients of the polynomial, and maximal value of the error
	function.
	* The error function has N+1 roots, and N+2 extrema (minima and maxima).
	* The extrema alternate in sign, and all have the same magnitude.

	That means that if we know the location of the extrema of the error function
	then we can write N+2 simultaneous equations:

	R(x[sub i]) + (-1)[super i]E = f(x[sub i])

	where E is the maximal error term, and x[sub i] are the abscissa values of the
	N+2 extrema of the error function. It is then trivial to solve the simultaneous
	equations to obtain the polynomial coefficients and the error term.

	['Unfortunately we don't know where the extrema of the error function are located!]

	[h4 The Remez Method]

	The Remez method is an iterative technique which, given a broad range of
	assumptions, will converge on the extrema of the error function, and therefore
	the minimax solution.

	In the following discussion we'll use a concrete example to illustrate
	the Remez method: an approximation to the function e[super x][space] over
	the range \[-1, 1\].

	Before we can begin the Remez method, we must obtain an initial value
	for the location of the extrema of the error function. We could "guess"
	these, but a much closer first approximation can be obtained by first
	constructing an interpolated polynomial approximation to f(x).

	In order to obtain the N+1 coefficients of the interpolated polynomial
	we need N+1 points (x[sub 0]...x[sub N]): with our interpolated form
	passing through each of those points
	that yields N+1 simultaneous equations:

	f(x[sub i]) = P(x[sub i]) = c[sub 0] + c[sub 1]x[sub i] ... + c[sub N]x[sub i][super N]

	Which can be solved for the coefficients c[sub 0]...c[sub N] in P(x).

	Obviously this is not a minimax solution, indeed our only guarantee is that f(x) and
	P(x) touch at N+1 locations, away from those points the error may be arbitrarily
	large. However, we would clearly like this initial approximation to be as close to
	f(x) as possible, and it turns out that using the zeros of an orthogonal polynomial
	as the initial interpolation points is a good choice. In our example we'll use the
	zeros of a Chebyshev polynomial as these are particularly easy to calculate,
	interpolating for a polynomial of degree 4, and measuring /relative error/
	we get the following error function:

	[$images/remez-2.png]

	Which has a peak relative error of 1.2x10[super -3].

	While this is a pretty good approximation already, judging by the
	shape of the error function we can clearly do better. Before starting
	on the Remez method propper, we have one more step to perform: locate
	all the extrema of the error function, and store
	these locations as our initial ['Chebyshev control points].

	[note
	In the simple case of a polynomial approximation, by interpolating through
	the roots of a Chebyshev polynomial we have in fact created a ['Chebyshev
	approximation] to the function: in terms of /absolute error/
	this is the best a priori choice for the interpolated form we can
	achieve, and typically is very close to the minimax solution.

	However, if we want to optimise for /relative error/, or if the approximation
	is a rational function, then the initial Chebyshev solution can be quite far
	from the ideal minimax solution.

	A more technical discussion of the theory involved can be found in this
	[@http://math.fullerton.edu/mathews/n2003/ChebyshevPolyMod.html online course].]

	[h4 Remez Step 1]

	The first step in the Remez method, given our current set of
	N+2 Chebyshev control points x[sub i], is to solve the N+2 simultaneous
	equations:

	P(x[sub i]) + (-1)[super i]E = f(x[sub i])

	To obtain the error term E, and the coefficients of the polynomial P(x).

	This gives us a new approximation to f(x) that has the same error /E/ at
	each of the control points, and whose error function ['alternates in sign]
	at the control points. This is still not necessarily the minimax
	solution though: since the control points may not be at the extrema of the error
	function. After this first step here's what our approximation's error
	function looks like:

	[$images/remez-3.png]

	Clearly this is still not the minimax solution since the control points
	are not located at the extrema, but the maximum relative error has now
	dropped to 5.6x10[super -4].

	[h4 Remez Step 2]

	The second step is to locate the extrema of the new approximation, which we do
	in two stages: first, since the error function changes sign at each
	control point, we must have N+1 roots of the error function located between
	each pair of N+2 control points. Once these roots are found by standard root finding
	techniques, we know that N extrema are bracketed between each pair of
	roots, plus two more between the endpoints of the range and the first and last roots.
	The N+2 extrema can then be found using standard function minimisation techniques.

	We now have a choice: multi-point exchange, or single point exchange.

	In single point exchange, we move the control point nearest to the largest extrema to
	the absissa value of the extrema.

	In multi-point exchange we swap all the current control points, for the locations
	of the extrema.

	In our example we perform multi-point exchange.

	[h4 Iteration]

	The Remez method then performs steps 1 and 2 above iteratively until the control
	points are located at the extrema of the error function: this is then
	the minimax solution.

	For our current example, two more iterations converges on a minimax
	solution with a peak relative error of
	5x10[super -4] and an error function that looks like:

	[$images/remez-4.png]

	[h4 Rational Approximations]

	If we wish to extend the Remez method to a rational approximation of the form

	f(x) = R(x) = P(x) / Q(x)

	where P(x) and Q(x) are polynomials, then we proceed as before, except that now
	we have N+M+2 unknowns if P(x) is of order N and Q(x) is of order M. This assumes
	that Q(x) is normalised so that it's leading coefficient is 1, giving
	N+M+1 polynomial coefficients in total, plus the error term E.

	The simultaneous equations to be solved are now:

	P(x[sub i]) / Q(x[sub i]) + (-1)[super i]E = f(x[sub i])

	Evaluated at the N+M+2 control points x[sub i].

	Unfortunately these equations are non-linear in the error term E: we can only
	solve them if we know E, and yet E is one of the unknowns!

	The method usually adopted to solve these equations is an iterative one: we guess the
	value of E, solve the equations to obtain a new value for E (as well as the polynomial
	coefficients), then use the new value of E as the next guess. The method is
	repeated until E converges on a stable value.

	These complications extend the running time required for the development
	of rational approximations quite considerably. It is often desirable
	to obtain a rational rather than polynomial approximation none the less:
	rational approximations will often match more difficult to approximate
	functions, to greater accuracy, and with greater efficiency, than their
	polynomial alternatives. For example, if we takes our previous example
	of an approximation to e[super x], we obtained 5x10[super -4] accuracy
	with an order 4 polynomial. If we move two of the unknowns into the denominator
	to give a pair of order 2 polynomials, and re-minimise, then the peak relative error drops
	to 8.7x10[super -5]. That's a 5 fold increase in accuracy, for the same number
	of terms overall.

	[h4 Practical Considerations]

	Most treatises on approximation theory stop at this point. However, from
	a practical point of view, most of the work involves finding the right
	approximating form, and then persuading the Remez method to converge
	on a solution.

	So far we have used a direct approximation:

	f(x) = R(x)

	But this will converge to a useful approximation only if f(x) is smooth. In
	addition round-off errors when evaluating the rational form mean that this
	will never get closer than within a few epsilon of machine precision.
	Therefore this form of direct approximation is often reserved for situations
	where we want efficiency, rather than accuracy.

	The first step in improving the situation is generally to split f(x) into
	a dominant part that we can compute accurately by another method, and a
	slowly changing remainder which can be approximated by a rational approximation.
	We might be tempted to write:

	f(x) = g(x) + R(x)

	where g(x) is the dominant part of f(x), but if f(x)\/g(x) is approximately
	constant over the interval of interest then:

	f(x) = g(x)(c + R(x))

	Will yield a much better solution: here /c/ is a constant that is the approximate
	value of f(x)\/g(x) and R(x) is typically tiny compared to /c/. In this situation
	if R(x) is optimised for absolute error, then as long as its error is small compared
	to the constant /c/, that error will effectively get wiped out when R(x) is added to
	/c/.

	The difficult part is obviously finding the right g(x) to extract from your
	function: often the asymptotic behaviour of the function will give a clue, so
	for example the function __erfc becomes proportional to
	e[super -x[super 2]]\/x as x becomes large. Therefore using:

	erfc(z) = (C + R(x)) e[super -x[super 2]]/x

	as the approximating form seems like an obvious thing to try, and does indeed
	yield a useful approximation.

	However, the difficulty then becomes one of converging the minimax solution.
	Unfortunately, it is known that for some functions the Remez method can lead
	to divergent behaviour, even when the initial starting approximation is quite good.
	Furthermore, it is not uncommon for the solution obtained in the first Remez step
	above to be a bad one: the equations to be solved are generally "stiff", often
	very close to being singular, and assuming a solution is found at all, round-off
	errors and a rapidly changing error function, can lead to a situation where the
	error function does not in fact change sign at each control point as required.
	If this occurs, it is fatal to the Remez method. It is also possible to
	obtain solutions that are perfectly valid mathematically, but which are
	quite useless computationally: either because there is an unavoidable amount
	of roundoff error in the computation of the rational function, or because
	the denominator has one or more roots over the interval of the approximation.
	In the latter case while the approximation may have the correct limiting value at
	the roots, the approximation is nonetheless useless.

	Assuming that the approximation does not have any fatal errors, and that the only
	issue is converging adequately on the minimax solution, the aim is to
	get as close as possible to the minimax solution before beginning the Remez method.
	Using the zeros of a Chebyshev polynomial for the initial interpolation is a
	good start, but may not be ideal when dealing with relative errors and\/or
	rational (rather than polynomial) approximations. One approach is to skew
	the initial interpolation points to one end: for example if we raise the
	roots of the Chebyshev polynomial to a positive power greater than 1
	then the roots will be skewed towards the middle of the \[-1,1\] interval,
	while a positive power less than one
	will skew them towards either end. More usefully, if we initially rescale the
	points over \[0,1\] and then raise to a positive power, we can skew them to the left
	or right. Returning to our example of e[super x][space] over \[-1,1\], the initial
	interpolated form was some way from the minimax solution:

	[$images/remez-2.png]

	However, if we first skew the interpolation points to the left (rescale them
	to \[0, 1\], raise to the power 1.3, and then rescale back to \[-1,1\]) we
	reduce the error from 1.3x10[super -3][space]to 6x10[super -4]:

	[$images/remez-5.png]

	It's clearly still not ideal, but it is only a few percent away from
	our desired minimax solution (5x10[super -4]).

	[h4 Remez Method Checklist]

	The following lists some of the things to check if the Remez method goes wrong,
	it is by no means an exhaustive list, but is provided in the hopes that it will
	prove useful.

	* Is the function smooth enough? Can it be better separated into
	a rapidly changing part, and an asymptotic part?
	* Does the function being approximated have any "blips" in it? Check
	for problems as the function changes computation method, or
	if a root, or an infinity has been divided out. The telltale
	sign is if there is a narrow region where the Remez method will
	not converge.
	* Check you have enough accuracy in your calculations: remember that
	the Remez method works on the difference between the approximation
	and the function being approximated: so you must have more digits of
	precision available than the precision of the approximation
	being constructed. So for example at double precision, you
	shouldn't expect to be able to get better than a float precision
	approximation.
	* Try skewing the initial interpolated approximation to minimise the
	error before you begin the Remez steps.
	* If the approximation won't converge or is ill-conditioned from one starting
	location, try starting from a different location.
	* If a rational function won't converge, one can minimise a polynomial
	(which presents no problems), then rotate one term from the numerator to
	the denominator and minimise again. In theory one can continue moving
	terms one at a time from numerator to denominator, and then re-minimising,
	retaining the last set of control points at each stage.
	* Try using a smaller interval. It may also be possible to optimise over
	one (small) interval, rescale the control points over a larger interval,
	and then re-minimise.
	* Keep absissa values small: use a change of variable to keep the abscissa
	over, say \[0, b\], for some smallish value /b/.

	[h4 References]

	The original references for the Remez Method and it's extension
	to rational functions are unfortunately in Russian:

	Remez, E.Ya., ['Fundamentals of numerical methods for Chebyshev approximations],
	"Naukova Dumka", Kiev, 1969.

	Remez, E.Ya., Gavrilyuk, V.T., ['Computer development of certain approaches
	to the approximate construction of solutions of Chebyshev problems
	nonlinearly depending on parameters], Ukr. Mat. Zh. 12 (1960), 324-338.

	Gavrilyuk, V.T., ['Generalization of the first polynomial algorithm of
	E.Ya.Remez for the problem of constructing rational-fractional
	Chebyshev approximations], Ukr. Mat. Zh. 16 (1961), 575-585.

	Some English language sources include:

	Fraser, W., Hart, J.F., ['On the computation of rational approximations
	to continuous functions], Comm. of the ACM 5 (1962), 401-403, 414.

	Ralston, A., ['Rational Chebyshev approximation by Remes' algorithms],
	Numer.Math. 7 (1965), no. 4, 322-330.

	A. Ralston, ['Rational Chebyshev approximation, Mathematical
	Methods for Digital Computers v. 2] (Ralston A., Wilf H., eds.),
	Wiley, New York, 1967, pp. 264-284.

	Hart, J.F. e.a., ['Computer approximations], Wiley, New York a.o., 1968.

	Cody, W.J., Fraser, W., Hart, J.F., ['Rational Chebyshev approximation
	using linear equations], Numer.Math. 12 (1968), 242-251.

	Cody, W.J., ['A survey of practical rational and polynomial
	approximation of functions], SIAM Review 12 (1970), no. 3, 400-423.

	Barrar, R.B., Loeb, H.J., ['On the Remez algorithm for non-linear
	families], Numer.Math. 15 (1970), 382-391.

	Dunham, Ch.B., ['Convergence of the Fraser-Hart algorithm for rational
	Chebyshev approximation], Math. Comp. 29 (1975), no. 132, 1078-1082.

	G. L. Litvinov, ['Approximate construction of rational
	approximations and the effect of error autocorrection],
	Russian Journal of Mathematical Physics, vol.1, No. 3, 1994.

	[endsect][/section:remez The Remez Method]