Bessel functions

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Type	First kind	Second kind
Bessel functions	Jν	Yν
Modified Bessel functions	I ν	K ν
Hankel functions	H   (1)ν = Jν  +  i Yν	H   (2)ν = Jν i Yν
Spherical Bessel functions	jν	yν
Modified spherical Bessel functions	i ν	k ν
Spherical Hankel functions	h (1)ν = jν  +  i  yν	h (2)ν = jν i  yν

Bessel differential equation

The solutions of the Bessel differential equation^[1]

x 2 d  2  y d x 2 + x d y d x + (x 2 − ν 2 ) y = 0

are the Bessel functions,^[2] of which there are two kinds:

• Bessel functions of the first kind

  Jν (x)

   ^[3]: nonsingular at the origin;
• Bessel functions of the second kind

  Yν (x)

   ^[4]: singular at the origin.

Bessel functions of the first kind

The Bessel functions of the first kind

Jν (x)

...

Bessel functions of the first kind (integer order)

The Bessel functions of the first kind

Jn (x)

, with nonnegative order

n = 0, 1, 2, 3, ...

are also known as cylindrical Bessel functions.

Zeros of Bessel functions of the first kind (integer order):^[5]

• For the decimal expansion of first zero of the Bessel functions

  J0(z), J1(z), J2(z), J3(z), J4(z), J5(z),

  see: A115368, A115369, A115370, A115371, A115372, A115373.
• For the decimal expansion of second zero of the Bessel functions

  J0(z), J1(z), J2(z), J3(z), J4(z), J5(z),

  see: A280868 , A??????, A??????, A??????, A??????, A??????.

Bessel functions of the first kind (half-integer order)

(...)

Bessel functions of the second kind

The Bessel functions of the second kind

Yν (x)

...

Bessel functions of the second kind (integer order)

The Bessel functions of the second kind

Yn (x)

, with nonnegative order

n = 0, 1, 2, 3, ...

Bessel functions of the second kind (half-integer order)

(...)

Modified Bessel differential equation

The solutions of the modified Bessel differential equation^[6]

x 2 d  2  y d x 2 + x d y d x − (x 2 − ν 2 ) y = 0

are the modified Bessel functions, of which there are two kinds:

• Modified Bessel functions of the first kind

  I ν (x)

   ^[7]: nonsingular at the origin;
• Modified Bessel functions of the second kind

  K ν (x)

   ^[8]: singular at the origin.

Spherical Bessel differential equation

The solutions of the spherical Bessel differential equation^[9]

x 2 d  2  y d x 2 + 2 x d y d x + [x 2 − ν (ν + 1)] y = 0

are the spherical Bessel functions,^[10] of which there are two kinds:

• Spherical Bessel functions of the first kind

  jν (x)

   ^[11]: nonsingular at the origin;
• Spherical Bessel functions of the second kind

  yν (x)

   ^[12]: singular at the origin.

Modified spherical Bessel differential equation

The solutions of the modified spherical Bessel differential equation^[13]

x 2 d  2  y d x 2 + 2 x d y d x − [x 2 − ν (ν + 1)] y = 0

are the modified spherical Bessel functions,^[14] of which there are two kinds:

• Modified spherical Bessel functions of the first kind

  i ν  (x)

   ^[15]: nonsingular at the origin;
• Modified spherical Bessel functions of the second kind

  k ν  (x)

   ^[16]: singular at the origin.

Notes

External links

• F.W.J. Olver, L.C. Maximon, Chapter 10 Bessel Functions.—Digital Library of Mathematical Functions. © 2010–2018 NIST.
• J.R. Culham, Bessel Functions of the First and Second Kind.
• Martin Kreh, The Bessel Functions.