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Modified Bessel Functions

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Presentation on theme: "Modified Bessel Functions"— Presentation transcript:

1 Modified Bessel Functions
ECE 6382 Fall 2017 David R. Jackson Notes 20 Modified Bessel Functions and Kelvin Functions Notes are from D. R. Wilton, Dept. of ECE

2 Modified Bessel Functions
Modified Bessel differential equation: or (self-adjoint form) Motivation: Bessel functions of imaginary argument:

3 Modified Bessel Function of the First Kind
Definition: (I is a real function of x.) Use the Frobenius solution for J : Frobenius series solution for I :

4 Second Solution of Modified Bessel Equation
For   n, the modified Bessel function of the 2nd kind is defined as: For  = n (an integer):

5 Relations Between Bessel and Modified Bessel Functions
The modified Bessel functions are related to the regular Bessel functions as Note: The added factors in front ensure that the functions are real.

6 Small Argument Approximations
For small arguments we have:

7 Large Argument Approximations
For large arguments we have:

8 Plots of Modified Bessel Functions for Real Arguments
x I0 I1 I2 The In functions increase exponentially. The are finite at x = 0.

9 Plots of Modified Bessel Functions for Real Arguments
x K0 K1 K2 The Kn functions decrease exponentially. The are infinite at x = 0.

10 Recurrence Relations Some recurrence relations are:

11 Wronskians A Wronskian identity is:

12 Kelvin Functions The Kelvin functions are defined as
Note: These are important for studying the fields inside of a conducting wire.

13 Kelvin Functions (cont.)
The Ber functions increase exponentially. They are finite at x = 0. Ber0 Ber1 Ber2 x

14 Kelvin Functions (cont.)
The Bei functions increase exponentially. They are finite at x = 0. Bei1 Bei2 Bei0 x

15 Kelvin Functions (cont.)
Normalizing makes it more obvious that the Ber and Bei functions increase exponentially and also oscillate. x x

16 Kelvin Functions (cont.)
Normalizing makes it more obvious that the Ber and Bei functions increase exponentially and also oscillate. x x

17 Kelvin Functions (cont.)
The Ker functions decay exponentially. They are infinite at x = 0. Ker0 Ker1 x

18 Kelvin Functions (cont.)
The Kei functions decay exponentially. They are infinite at x = 0. Kei0 Kei1 x

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