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28 Mathieu Functions and Hill’s EquationMathieu Functions of Noninteger Order

§28.15 Expansions for Small q

Contents

§28.15(i) Eigenvalues λν(q)

Keywords:
Mathieu’s equation, continued-fraction equations, eigenvalues (or characteristic values), power-series expansions in q
Notes:
See Meixner and Schäfke (1954, pp. 119 and 117).
Referenced by:
item (a)
Permalink:
http://dlmf.nist.gov/28.15.i
See also:
Annotations for §28.15 and Ch.28
28.15.1 λν(q)=ν2+12(ν2-1)q2+5ν2+732(ν2-1)3(ν2-4)q4+9ν4+58ν2+2964(ν2-1)5(ν2-4)(ν2-9)q6+.
Symbols:
λν+2n(q): eigenvalues of Mathieu equation, q=h2: parameter and ν: complex parameter
A&S Ref:
20.3.15 (in slightly different form)
Permalink:
http://dlmf.nist.gov/28.15.E1
Encodings:
TeX, pMML, png
See also:
Annotations for §28.15(i), §28.15 and Ch.28

Higher coefficients can be found by equating powers of q in the following continued-fraction equation, with a=λν(q):

28.15.2 a-ν2-q2a-(ν+2)2-q2a-(ν+4)2-=q2a-(ν-2)2-q2a-(ν-4)2-.
Symbols:
q=h2: parameter, ν: complex parameter and a: parameter
Referenced by:
item (e)
Permalink:
http://dlmf.nist.gov/28.15.E2
Encodings:
TeX, pMML, png
See also:
Annotations for §28.15(i), §28.15 and Ch.28

§28.15(ii) Solutions meν(z,q)

Keywords:
Mathieu functions, power series in q
Notes:
See Meixner and Schäfke (1954, p. 122).
Referenced by:
item (a)
Permalink:
http://dlmf.nist.gov/28.15.ii
See also:
Annotations for §28.15 and Ch.28
28.15.3 meν(z,q)=eiνz-q4(1ν+1ei(ν+2)z-1ν-1ei(ν-2)z)+q232(1(ν+1)(ν+2)ei(ν+4)z+1(ν-1)(ν-2)ei(ν-4)z-2(ν2+1)(ν2-1)2eiνz)+;
Symbols:
men(z,q): Mathieu function, e: base of natural logarithm, i: imaginary unit, q=h2: parameter, z: complex variable and ν: complex parameter
A&S Ref:
20.3.17 (only two terms and without normalization)
Permalink:
http://dlmf.nist.gov/28.15.E3
Encodings:
TeX, pMML, png
See also:
Annotations for §28.15(ii), §28.15 and Ch.28

compare §28.6(ii).

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