Trigonometric functions of matrices

The trigonometric functions (especially sine and cosine) for real or complex square matrices occur in solutions of second-order systems of differential equations.[1] They are defined by the same Taylor series that hold for the trigonometric functions of real and complex numbers:[2]

with Xn being the nth power of the matrix X, and I being the identity matrix of appropriate dimensions.

Equivalently, they can be defined using the matrix exponential along with the matrix equivalent of Euler's formula, eiX = cos X + i sin X, yielding

For example, taking X to be a standard Pauli matrix,

one has

as well as, for the cardinal sine function,

Properties

The analog of the Pythagorean trigonometric identity holds:[2]

If X is a diagonal matrix, sin X and cos X are also diagonal matrices with (sin X)nn = sin(Xnn) and (cos X)nn = cos(Xnn), that is, they can be calculated by simply taking the sines or cosines of the matrices's diagonal components.

The analogs of the trigonometric addition formulas are true if and only if XY = YX:[2]

Other functions

The tangent, as well as inverse trigonometric functions, hyperbolic and inverse hyperbolic functions have also been defined for matrices:[3]

(see Inverse trigonometric functions#Logarithmic forms, Matrix logarithm, Square root of a matrix)

and so on.

gollark: I don't know yet.
gollark: Okay, I must de some bugs.
gollark: OH NOT AGAIN.
gollark: I decided to try and copy my Amazon eböök library into Calibre. It seems that they *really* don't want anyone to do that, because due to a minefield of Byzantine file format and DRM insanity I've had to install an ancient version of their Windows client in Wine to even get ebook files in a usable format. Still to do, figure out where it keeps the encryption key. FUN!
gollark: Another super stupid fact: there is an infinite amount of prime numbers.

References

  1. Gareth I. Hargreaves, Nicholas J. Higham (2005). "Efficient Algorithms for the Matrix Cosine and Sine". Numerical Analysis Report. Manchester Centre for Computational Mathematics (461).CS1 maint: uses authors parameter (link)
  2. Nicholas J. Higham (2008). Functions of matrices: theory and computation. pp. 287f. ISBN 9780898717778.
  3. Scilab trigonometry.
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