English

Bicomplex Quantum Mechanics: II. The Hilbert Space

Quantum Physics 2013-07-10 v5

Abstract

Using the bicomplex numbers T\mathbb{T} which is a commutative ring with zero divisors defined by T={w0+w1i1+w2i2+w3jw0,w1,w2,w3R}\mathbb{T}=\{w_0 + w_1 i_1 + w_2 i_2 + w_3 j | w_0, w_1, w_2, w_3 \in \mathbb{R}\} where i12=1,i22=1,j2=1,i1i2=j=i2i1i_{1}^{2} = -1, i_{2}^{2} = -1, j^2 = 1, i_1 i_2 = j = i_2 i_1, we construct hyperbolic and bicomplex Hilbert spaces. Linear functionals and dual spaces are considered and properties of linear operators are obtained; in particular it is established that the eigenvalues of a bicomplex self-adjoint operator are in the set of hyperbolic numbers.

Keywords

Cite

@article{arxiv.quant-ph/0510203,
  title  = {Bicomplex Quantum Mechanics: II. The Hilbert Space},
  author = {Dominic Rochon and Sebastien Tremblay},
  journal= {arXiv preprint arXiv:quant-ph/0510203},
  year   = {2013}
}

Comments

25 pages, no figure