Examples of Hilbert Spaces - Time Travel, Quantum Entanglement and Quantum Computing

Hilbert Spaces can be FINITE dimensional or INFINITE Dimensional

Finite Dimensional Hilbert Spaces

n-Tuples of real numbers – $R^n$ – e.g. $R^5$
Inner Product would be just the dot product of two vectors
$\vec{x} = \begin{pmatrix}x1\\x2\\x3\\x4\\x5 \end{pmatrix} and \vec{y} = \begin{bmatrix}y1 & y2 & y3 & y4 & y5 \end{bmatrix}$

n-Tuples of complex numbers – $C^n$ – e.g. $C^2$

$\vec{c1} = \begin{pmatrix}a1+ib1 \\a2+ib2 \end{pmatrix}$

The inner product here would be the complex inner product: $ (complex conjugate of c1)^T (c2)

Infinite Dimensional Hilbert Spaces

Space of all complex valued functions with inner product defined in a particular way (square integrable functions)