Bi-coherent states as generalized eigenstates of the position and the momentum operators

Abstract: In this paper we show that the position and the derivative operators, $\hat q$ and $\hat D$, can be treated as ladder operators connecting the various vectors of two biorthonormal families, $\mathcal{F}\varphi$ and $\mathcal{F}\psi$. In particular, the vectors in $\mathcal{F}\varphi$ are essentially monomials in $x$, $x^k$, while those in $\mathcal{F}\psi$ are weak derivatives of the Dirac delta distribution, $\delta^{(m)}(x)$, times some normalization factor. We also show how bi-coherent states can be constructed for these $\hat q$ and $\hat D$, both as convergent series of elements of $\mathcal{F}\varphi$ and $\mathcal{F}\psi$, or using two different displacement-like operators acting on the two vacua of the framework. Our approach generalizes well known results for ordinary coherent states.