Mathieu function

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In mathematics, Mathieu functions, sometimes called angular Mathieu functions, are solutions of Mathieu's differential equation

d2ydx2+(a2qcos2x)y=0,

where a and q are parameters. They were first introduced by Émile Léonard Mathieu, who encountered them while studying vibrating elliptical drumheads.[1][2] They have applications in many fields of the physical sciences, such as optics, quantum mechanics, and general relativity. They tend to occur in problems involving periodic motion, or in the analysis of partial differential equation boundary value problems possessing ellipticTemplate:Disambiguation needed symmetry.[3]

Definition

Mathieu functions

In some usages, Mathieu function refers to solutions of the Mathieu differential equation for arbitrary values of a and q. When no confusion can arise, other authors use the term to refer specifically to π- or 2π-periodic solutions, which exist only for special values of a and q.[4] More precisely, for given (real) q such periodic solutions exist for an infinite number of values of a, called characteristic numbers, conventionally indexed as two separate sequences an(q) and bn(q), for n=1,2,3,. The corresponding functions are denoted cen(x,q) and sen(x,q), respectively. They are sometimes also referred to as cosine-elliptic and sine-elliptic, or Mathieu functions of the first kind.

As a result of assuming that q is real, both the characteristic numbers and associated functions are real-valued.[5]

cen(x,q) and sen(x,q) can be further classified by parity and periodicity (both with respect to x), as follows:[4]

Function Parity Period
cen,n even even π
cen,n odd even 2π
sen,n even odd π
sen,n odd odd 2π

The indexing with the integer n, besides serving to arrange the characteristic numbers in ascending order, is convenient in that cen(x,q) and sen(x,q) become proportional to cosnx and sinnx as q0. With n being an integer, this gives rise to the classification of cen and sen as Mathieu functions (of the first kind) of integral order. For general a and q, solutions besides these can be defined, including Mathieu functions of fractional order as well as non-periodic solutions.

Modified Mathieu functions

Closely related are the modified Mathieu functions, also known as radial Mathieu functions, which are solutions of Mathieu's modified differential equation

d2ydx2(a2qcosh2x)y=0,

which can be related to the original Mathieu equation by taking x±xi. Accordingly, the modified Mathieu functions of the first kind of integral order, denoted by Cen(x,q) and Sen(x,q), are defined from[6]

Cen(x,q)=cen(ix,q).Sen(x,q)=isen(ix,q).

These functions are real-valued when x is real.

Normalization

A common normalization,[7] which will be adopted throughout this article, is to demand

02πcen(x,q)2dx=02πsen(x,q)2dx=π

as well as require cen(x,q)+cosnx and sen(x,q)+sinnx as q0.

Floquet theory

Many properties of the Mathieu differential equation can be deduced from the general theory of ordinary differential equations with periodic coefficients, called Floquet theory. The central result is Floquet's theorem:

Floquet's theorem[8] Mathieu's equation always has at least one solution y(x) such that y(x+π)=σy(x), where σ is a constant which depends on the parameters of the equation and may be real or complex.

It is natural to associate the characteristic numbers a(q) with those values of a which result in σ=±1.[9] Note, however, that the theorem only guarantees the existence of at least one solution satisfying y(x+π)=σy(x), when Mathieu's equation in fact has two independent solutions for any given a, q. Indeed, it turns out that with a equal to one of the characteristic numbers, Mathieu's equation has only one periodic solution (that is, with period π or 2π), and this solution is one of the cen(x,q), sen(x,q). The other solution is nonperiodic, denoted fen(x,q) and gen(x,q), respectively, and referred to as a Mathieu function of the second kind.[10] This result can be formally stated as Ince's theorem:

Ince's theorem[11] Define a basically periodic function as one satisfying y(x+π)=±y(x). Then, except in the trivial case q=0, Mathieu's equation never possesses two (independent) basically periodic solutions for the same values of a and q.
An example P(a,q,x) from Floquet's theorem, with a=1, q=1/5, μ1+0.0995i (real part, red; imaginary part, green)

An equivalent statement of Floquet's theorem is that Mathieu's equation admits a complex-valued solution of form

F(a,q,x)=exp(iμx)P(a,q,x),

where μ is a complex number, the Floquet exponent (or sometimes Mathieu exponent), and P is a complex valued function periodic in x with period π. An example P(a,q,x) is plotted to the right.

Other types of Mathieu functions

Second kind

Since Mathieu's equation is a second order differential equation, one can construct two linearly independent solutions. Floquet's theory says that if a is equal to a characteristic number, one of these solutions can be taken to be periodic, and the other nonperiodic. The periodic solution is one of the cen(x,q) and sen(x,q), called a Mathieu function of the first kind of integral order. The nonperiodic one is denoted either fen(x,q) and gen(x,q), respectively, and is called a Mathieu function of the second kind (of integral order). The nonperiodic solutions are unstable, that is, they diverge as z±.[12]

The second solutions corresponding to the modified Mathieu functions Cen(x,q) and Sen(x,q) are naturally defined as Fen(x,q)=ifen(xi,q) and Gen(x,q)=gen(xi,q).

Fractional order

Mathieu functions of fractional order can be defined as those solutions cep(x,q) and sep(x,q), p a non-integer, which turn into cospx and sinpx as q0.[6] If p is irrational, they are non-periodic; however, they remain bounded as x.

An important property of the solutions cep(x,q) and sep(x,q), for p non-integer, is that they exist for the same value of a. In contrast, when p is an integer, cep(x,q) and sep(x,q) never occur for the same value of a. (See Ince's Theorem above.)

These classifications are summarized in the table below. The modified Mathieu function counterparts are defined similarly.

Classification of Mathieu functions[13]
Order First kind Second kind
Integral cen(x,q) fen(x,q)
Integral sen(x,q) gen(x,q)
Fractional

(p non-integral)

cep(x,q) sep(x,q)

Explicit representation and computation

First kind

Mathieu functions of the first kind can be represented as Fourier series:[4]

ce2n(x,q)=r=0A2r(2n)(q)cos(2rx)ce2n+1(x,q)=r=0A2r+1(2n+1)(q)cos[(2r+1)x]se2n+1(x,q)=r=0B2r+1(2n+1)(q)sin[(2r+1)x]se2n+2(x,q)=r=0B2r+2(2n+2)(q)sin[(2r+2)x]

The expansion coefficients Aj(i)(q) and Bj(i)(q) are functions of q but independent of x. By substitution into the Mathieu equation, they can be shown to obey three-term recurrence relations in the lower index. For instance, for each ce2n one finds[14]

aA0qA2=0(a4)A2q(A4+2A0)=0(a4r2)A2rq(A2r+2+A2r2)=0,r2

Being a second-order recurrence in the index 2r, one can always find two independent solutions X2r and Y2r such that the general solution can be expressed as a linear combination of the two: A2r=c1X2r+c2Y2r. Moreover, in this particular case, an asymptotic analysis[15] shows that one possible choice of fundamental solutions has the property

X2r=r2r1(e2q4)r[1+𝒪(r1)]Y2r=r2r1(4e2q)r[1+𝒪(r1)]

In particular, X2r is finite whereas Y2r diverges. Writing A2r=c1X2r+c2Y2r, we therefore see that in order for the Fourier series representation of ce2n to converge, a must be chosen such that c2=0. These choices of a correspond to the characteristic numbers.

In general, however, the solution of a three-term recurrence with variable coefficients cannot be represented in a simple manner, and hence there is no simple way to determine a from the condition c2=0. Moreover, even if the approximate value of a characteristic number is known, it cannot be used to obtain the coefficients A2r by numerically iterating the recurrence towards increasing r. The reason is that as long as a only approximates a characteristic number, c2 is not identically 0 and the divergent solution Y2r eventually dominates for large enough r.

To overcome these issues, more sophisticated semi-analytical/numerical approaches are required, for instance using a continued fraction expansion,[16][4] casting the recurrence as a matrix eigenvalue problem,[17] or implementing a backwards recurrence algorithm.[15] The complexity of the three-term recurrence relation is one of the reasons there are few simple formulas and identities involving Mathieu functions.[18]

In practice, Mathieu functions and the corresponding characteristic numbers can be calculated using pre-packaged software, such as Mathematica, Maple, MATLAB, and SciPy. For small values of q and low order n, they can also be expressed perturbatively as power series of q, which can be useful in physical applications.[19]

Second kind

There are several ways to represent Mathieu functions of the second kind.[20] One representation is in terms of Bessel functions:[21]

fe2n(x,q)=πγn2r=0(1)r+nA2r(2n)(q)Im[Jr(qeix)Yr(qeix)],where γn={2, if n=02n, if n1fe2n+1(x,q)=πq2r=0(1)r+nA2r+1(2n+1)(q)Im[Jr(qeix)Yr+1(qeix)+Jr+1(qeix)Yr(qeix)]ge2n+1(x,q)=πq2r=0(1)r+nB2r+1(2n+1)(q)Re[Jr(qeix)Yr+1(qeix)Jr+1(qeix)Yr(qeix)]ge2n+2(x,q)=πq4(n+1)r=0(1)r+nB2r+2(2n+2)(q)Re[Jr(qeix)Yr+2(qeix)Jr+2(qeix)Yr(qeix)]

where n,q>0, and Jr(x) and Yr(x) are Bessel functions of the first and second kind.

Modified functions

A traditional approach for numerical evaluation of the modified Mathieu functions is through Bessel function product series.[22] For large n and q, the form of the series must be chosen carefully to avoid subtraction errors.[23][24]

Properties

There are relatively few analytic expressions and identities involving Mathieu functions. Moreover, unlike many other special functions, the solutions of Mathieu's equation cannot in general be expressed in terms of hypergeometric functions. This can be seen by transformation of Mathieu's equation to algebraic form, using the change of variable t=cos(x):

(1t2)d2ydt2tdydt+(a+2q(12t2))y=0.

Since this equation has an irregular singular point at infinity, it cannot be transformed into an equation of the hypergeometric type.[18]

Qualitative behavior

Sample plots of Mathieu functions of the first kind
Plot of ce1(x,q) for varying q

For small q, cen and sen behave similarly to cosnx and sinnx. For arbitrary q, they may deviate significantly from their trigonometric counterparts; however, they remain periodic in general. Moreover, for any real q, cem(x,q) and sem+1(x,q) have exactly m simple zeros in 0<x<π, and as q the zeros cluster about x=π/2.[25][26]

For q>0 and as x the modified Mathieu functions tend to behave as damped periodic functions.

In the following, the A and B factors from the Fourier expansions for cen and sen may be referenced (see Explicit representation and computation). They depend on q and n but are independent of x.

Reflections and translations

Due to their parity and periodicity, cen and sen have simple properties under reflections and translations by multiples of π:[6]

cen(x+π)=(1)ncen(x)sen(x+π)=(1)nsen(x)cen(x+π/2)=(1)ncen(x+π/2)sen+1(x+π/2)=(1)nsen+1(x+π/2)

One can also write functions with negative q in terms of those with positive q:[4][27]

ce2n+1(x,q)=(1)nse2n+1(x+π/2,q)ce2n+2(x,q)=(1)nce2n+2(x+π/2,q)se2n+1(x,q)=(1)nce2n+1(x+π/2,q)se2n+2(x,q)=(1)nse2n+2(x+π/2,q)

Moreover,

a2n+1(q)=b2n+1(q)b2n+2(q)=b2n+2(q)

Orthogonality and completeness

Like their trigonometric counterparts cosnx and sinnx, the periodic Mathieu functions cen(x,q) and sen(x,q) satisfy orthogonality relations

02πcencemdx=02πsensemdx=δnmπ02πcensemdx=0

Moreover, with q fixed and a treated as the eigenvalue, the Mathieu equation is of Sturm-Liouville form. This implies that the eigenfunctions cen(x,q) and sen(x,q) form a complete set, i.e. any π- or 2π-periodic function of x can be expanded as a series in cen(x,q) and sen(x,q).[3]

Integral identities

Solutions of Mathieu's equation satisfy a class of integral identities with respect to kernels χ(x,x) that are solutions of

2χx22χx'2=2q(cos2xcos2x)χ

More precisely, if ϕ(x) solves Mathieu's equation with given a and q, then the integral

ψ(x)Cχ(x,x)ϕ(x)dx

where C is a path in the complex plane, also solves Mathieu's equation with the same a and q, provided the following conditions are met:[28]

Using an appropriate change of variables, the equation for χ can be transformed into the wave equation and solved. For instance, one solution is χ(x,x)=sinh(2q1/2sinxsinx). Examples of identities obtained in this way are[29]

se2n+1(x,q)=se'2n+1(0,q)πq1/2B1(2n+1)0πsinh(2q1/2sinxsinx)se2n+1(x,q)dx(q>0)Ce2n(x,q)=ce2n(π/2,q)πA0(2n)0πcos(2q1/2coshxcosx)ce2n(x,q)dx(q>0)

Identities of the latter type are useful for studying asymptotic properties of the modified Mathieu functions.[30]

There also exist integral relations between functions of the first and second kind, for instance:[21]

fe2n(x,q)=2n0xce2n(τ,q)J0(2q(cos2xcos2τ))dτ,n1

valid for any complex x and real q.

Asymptotic expansions

The following asymptotic expansions hold for q>0, Im(x)=0, Re(x), and 2q1/2coshxq1/2ex:[31]

Ce2n(x,q)(2πq1/2)1/2ce2n(0,q)ce2n(π/2,q)A0(2n)ex/2sin(q1/2ex+π4)Ce2n+1(x,q)(2πq3/2)1/2ce2n+1(0,q)ce'2n+1(π/2,q)A1(2n+1)ex/2cos(q1/2ex+π4)Se2n+1(x,q)(2πq3/2)1/2se'2n+1(0,q)se2n+1(π/2,q)B1(2n+1)ex/2cos(q1/2ex+π4)Se2n+2(x,q)(2πq5/2)1/2se'2n+2(0,q)se'2n+2(π/2,q)B2(2n+2)ex/2sin(q1/2ex+π4)

Thus, the modified Mathieu functions decay exponentially for large real argument. Similar asymptotic expansions can be written down for Fen and Gen; these also decay exponentially for large real argument.

For the even and odd periodic Mathieu functions ce,se and the associated characteristic numbers a one can also derive asymptotic expansions for large q.[32] For the characteristic numbers in particular, one has with N approximately an odd integer, i.e. NN0=2n+1,n=1,2,3,...,

a(N)=2q+2q1/2N123(N2+1)127q1/2N(N2+3)1212q(5N4+34N2+9)
1217q3/2N(33N4+410N2+405)1220q2(63N6+1260N4+2943N2+41807)+𝒪(q5/2)

Observe the symmetry here in replacing q1/2 and N by q1/2 and N, which is a significant feature of the expansion. Terms of this expansion have been obtained explicitly up to and including the term of order |q|7/2.[33] Here N is only approximately an odd integer because in the limit of q all minimum segments of the periodic potential cos2x become effectively independent harmonic oscillators (hence N0 an odd integer). By decreasing q, tunneling through the barriers becomes possible (in physical language), leading to a splitting of the characteristic numbers aa (in quantum mechanics called eigenvalues) corresponding to even and odd periodic Mathieu functions. This splitting is obtained with boundary conditions[34] (in quantum mechanics this provides the splitting of the eigenvalues into energy bands).[35] The boundary conditions are:

(dceN01dx)π/2=0,ceN0(π/2)=0,(dseN0dx)π/2=0,seN0+1(π/2)=0.

Imposing these boundary conditions on the asymptotic periodic Mathieu functions associated with the above expansion for a one obtains

NN0=2(2π)1/2(16q1/2)N0/2e4q1/2[12(N01)]![13(N02+1)26q1/2+1213q(9N0440N03+18N02136N0+9)+...].

The corresponding characteristic numbers or eigenvalues then follow by expansion, i.e.

a(N)=a(N0)+(NN0)(aN)N0+....

Insertion of the appropriate expressions above yields the result

a(N)a(N0)=2q+2q1/2N0123(N02+1)127q1/2N0(N02+3)1212q(5N04+34N02+9)...
(16q1/2)N0/2+1e4q1/2(8π)1/2[12(N01)]![1N026q1/2(3N02+8N0+3)+...].

For N0=1,3,5,... these are the eigenvalues associated with the even Mathieu eigenfunctions ceN0 or ceN01 (i.e. with upper, minus sign) and odd Mathieu eigenfunctions seN0+1 or seN0 (i.e. with lower, plus sign). The explicit and normalised expansions of the eigenfunctions can be found in [36] or [37].

Similar asymptotic expansions can be obtained for the solutions of other periodic differential equations, as for Lamé functions and prolate and oblate spheroidal wave functions.

Applications

Mathieu's differential equations appear in a wide range of contexts in engineering, physics, and applied mathematics. Many of these applications fall into one of two general categories: 1) the analysis of partial differential equations in elliptic geometries, and 2) dynamical problems which involve forces that are periodic in either space or time. Examples within both categories are discussed below.

Partial differential equations

Mathieu functions arise when separation of variables in elliptic coordinates is applied to 1) the Laplace equation in 3 dimensions, and 2) the Helmholtz equation in either 2 or 3 dimensions. Since the Helmholtz equation is a prototypical equation for modeling the spatial variation of classical waves, Mathieu functions can be used to describe a variety of wave phenomena. For instance, in computational electromagnetics they can be used to analyze the scattering of electromagnetic waves off elliptic cylinders, and wave propagation in elliptic waveguides.[38] In general relativity, an exact plane wave solution to the Einstein field equation can be given in terms of Mathieu functions.

More recently, Mathieu functions have been used to solve a special case of the Smoluchowski equation, describing the steady-state statistics of self-propelled particles.[39]

The remainder of this section details the analysis for the two-dimensional Helmholtz equation.[40] In rectangular coordinates, the Helmholtz equation is

(2x2+2y2)ψ+k2ψ=0,

Elliptic coordinates are defined by

x=ccoshμcosνy=csinhμsinν

where 0μ<, 0ν<2π, and c is a positive constant. The Helmholtz equation in these coordinates is

1c2(sinh2μ+sin2ν)(2μ2+2ν2)ψ+k2ψ=0

The constant μ curves are confocal ellipses with focal length c; hence, these coordinates are convenient for solving the Helmholtz equation on domains with elliptic boundaries. Separation of variables via ψ(μ,ν)=F(μ)G(ν) yields the Mathieu equations

d2Fdμ2(ac2k22cosh2μ)F=0d2Gdν2+(ac2k22cos2ν)G=0

where a is a separation constant.

As a specific physical example, the Helmholtz equation can be interpreted as describing normal modes of an elastic membrane under uniform tension. In this case, the following physical conditions are imposed:[41]

For given k, this restricts the solutions to those of the form Cen(μ,q)cen(ν,q) and Sen(μ,q)sen(ν,q), where q=c2k2/2. This is the same as restricting allowable values of a, for given k. Restrictions on k then arise due to imposition of physical conditions on some bounding surface, such as an elliptic boundary defined by μ=μ0>0. For instance, clamping the membrane at μ=μ0 imposes ψ(μ0,ν)=0, which in turn requires

Cen(μ0,q)=0Sen(μ0,q)=0

These conditions define the normal modes of the system.

Dynamical problems

In dynamical problems with periodically varying forces, the equation of motion sometimes takes the form of Mathieu's equation. In such cases, knowledge of the general properties of Mathieu's equation— particularly with regard to stability of the solutions—can be essential for understanding qualitative features of the physical dynamics.[42] A classic example along these lines is the inverted pendulum.[43] Other examples are

Quantum mechanics

Mathieu functions play a role in certain quantum mechanical systems, particularly those with spatially periodic potentials such as the quantum pendulum and crystalline lattices.

The modified Mathieu equation also arises when describing the quantum mechanics of singular potentials. For the particular singular potential V(r)=g2/r4 the radial Schrödinger equation

d2ydr2+[k2(+1)r2g2r4]y=0

can be converted into the equation

d2φdz2+[2h2cosh2z(+12)2]φ=0.

The transformation is achieved with the following substitutions

y=r1/2φ,r=γez,γ=igh,h2=ikg,h=eIπ/4(kg)1/2.

By solving the Schrödinger equation (for this particular potential) in terms of solutions of the modified Mathieu equation, scattering properties such as the S-matrix and the absorptivity can be obtained.[45]

See also

Notes

  1. Mathieu (1868).
  2. Morse and Feshbach (1953).
  3. 3.0 3.1 Gutiérrez-Vega (2015).
  4. 4.0 4.1 4.2 4.3 4.4 Arscott (1964), chapter III
  5. Arscott (1964) 43–44
  6. 6.0 6.1 6.2 McLachlan (1947), chapter II.
  7. Arscott (1964); Iyanaga (1980); Gradshteyn (2007); This is also the normalization used by the computer algebra system Maple.
  8. Arscott (1964), p. 29.
  9. It is not true, in general, that a 2π periodic function has the property y(x+π)=y(x). However, this turns out to be true for functions which are solutions of Mathieu's equation.
  10. McLachlan (1951), pp. 141-157, 372
  11. Arscott (1964), p. 34
  12. McLachlan (1947), p. 144
  13. McLachlan (1947), p. 372
  14. McLachlan (1947), p. 28
  15. 15.0 15.1 Wimp (1984), pp. 83-84
  16. McLachlan (1947)
  17. Chaos-Cador and Ley-Koo (2001)
  18. 18.0 18.1 Temme (2015), p. 234
  19. Müller-Kirsten (2012), pp. 420-428
  20. Meixner and Schäfke (1954); McLachlan (1947)
  21. 21.0 21.1 Malits (2010)
  22. Jin and Zhang (1996)
  23. Van Buren and Boisvert (2007)
  24. Bibby and Peterson (2013)
  25. Meixner and Schäfke (1954), p.134
  26. McLachlan (1947), pp. 234–235
  27. Gradshteyn (2007), p. 953
  28. Arscott (1964), pp. 40-41
  29. Gradshteyn (2007), pp. 763–765
  30. Arscott (1964), p. 86
  31. McLachlan (1947), chapter XI
  32. McLachlan (1947), p. 237; Dingle and Müller (1962); Müller (1962); Dingle and Müller(1964)
  33. Dingle and Müller (1962)
  34. Dingle and Müller (1962)
  35. Müller-Kirsten (2012)
  36. Dingle and Müller (1962)
  37. Müller-Kirsten (2012)
  38. Bibby and Peterson (2013); Barakat (1963); Sebak and Shafai (1991); Kretzschmar (1970)
  39. Solon et al (2015)
  40. see Willatzen and Voon (2011), pp. 61–65
  41. McLachlan (1947), pp. 294–297
  42. 42.0 42.1 Meixner and Schäfke (1954), pp. 324–343
  43. Ruby (1996)
  44. March (1997)
  45. Müller-Kirsten (2006)

References

External links