On the Euler angles for SU(N)

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Abstract

In this paper we reconsider the problem of the Euler parametrization for the unitary groups. After constructing the generic group element in terms of generalized angles, we compute the invariant measure on SU(N) and then we determine the full range of the parameters, using both topological and geometrical methods. In particular, we show that the given parametrization realizes the group \(SU(N+1)\) as a fibration of U(N) over the complex projective space \(\mathbb{CP}^n\). This justifies the interpretation of the parameters as generalized Euler angles.

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The volume of a compact Lie group

I G Macdonald (1980)

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Generalized Euler Angle Paramterization for SU(N)

, (2002)

In a previous paper (math-ph/0202002) an Euler angle parameterization for SU(4) was given. Here we present the derivation of a generalized Euler angle parameterization for SU(N). The formula for the calculation of the Haar measure for SU(N) as well as its relation to Marinov's volume formula for SU(N) will also be derived. As an example of this parameterization's usefulness, the density matrix parameterization and invariant volume element for a qubit/qutrit, three qubit and two three-state systems, also known as two qutrit systems, will also be given.