Related papers: Boson Operator Ordering Identities from Generalized Stirling and Eulerian Numbers

Boson Operator Ordering Identities from Generalized Stirling and Eulerian Numbers

URL: http://arxiv.org/abs/2308.10332v4
Date: Fri, 9 Feb 2024 10:17:18 GMT
Title: Boson Operator Ordering Identities from Generalized Stirling and Eulerian Numbers
Authors: Robert S. Maier
Abstract summary: boson string composed of creation and annihilation operators can be expanded as a linear combination of other such strings. Two kinds of expansion are derived: (i) that of a power of a string $Omega$ in lower powers of another string $Omega'$, and (ii) that of a power of $Omega$ in twisted versions of the same power of $Omega'$.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Ordering identities in the Weyl-Heisenberg algebra generated by single-mode boson operators are investigated. A boson string composed of creation and annihilation operators can be expanded as a linear combination of other such strings, the simplest example being a normal ordering. The case when each string contains only one annihilation operator is already combinatorially nontrivial. Two kinds of expansion are derived: (i) that of a power of a string $\Omega$ in lower powers of another string $\Omega'$, and (ii) that of a power of $\Omega$ in twisted versions of the same power of $\Omega'$. The expansion coefficients are shown to be, respectively, generalized Stirling numbers of Hsu and Shiue, and certain generalized Eulerian numbers. Many examples are given. These combinatorial numbers are binomial transforms of each other, and their theory is developed, emphasizing schemes for computing them: summation formulas, Graham-Knuth-Patashnik (GKP) triangular recurrences, terminating hypergeometric series, and closed-form expressions. The results on the first type of expansion subsume a number of previous results on the normal ordering of boson strings.

Related papers

Efficient unitary designs and pseudorandom unitaries from permutations [35.66857288673615]
We show that products exponentiated sums of $S(N)$ permutations with random phases match the first $2Omega(n)$ moments of the Haar measure. The heart of our proof is a conceptual connection between the large dimension (large-$N$) expansion in random matrix theory and the method.
arXiv Detail & Related papers (2024-04-25T17:08:34Z)
A quantum Pascal pyramid and an extended de Moivre-Laplace theorem [0.0]
We describe a "quantum Pascal pyramid" as a generalization of Pascal's triangle. An extension of the devrevre-Laplace theorem is applied to the $q$-th columns of the quantum pyramid. An exercise is shown in which the first two columns of the quantum Pascal pyramid are used to calculate the previously known Hermite-Gaussian modes in laser physics.
arXiv Detail & Related papers (2024-04-04T16:15:44Z)
Quantum One-Wayness of the Single-Round Sponge with Invertible Permutations [49.1574468325115]
Sponge hashing is a widely used class of cryptographic hash algorithms. Intrepid permutations have so far remained a fundamental open problem. We show that finding zero-pairs in a random $2n$-bit permutation requires at least $Omega (2n/2)$ many queries.
arXiv Detail & Related papers (2024-03-07T18:46:58Z)
A Unified Framework for Uniform Signal Recovery in Nonlinear Generative Compressed Sensing [68.80803866919123]
Under nonlinear measurements, most prior results are non-uniform, i.e., they hold with high probability for a fixed $mathbfx*$ rather than for all $mathbfx*$ simultaneously. Our framework accommodates GCS with 1-bit/uniformly quantized observations and single index models as canonical examples. We also develop a concentration inequality that produces tighter bounds for product processes whose index sets have low metric entropy.
arXiv Detail & Related papers (2023-09-25T17:54:19Z)
Vectorization of the density matrix and quantum simulation of the von Neumann equation of time-dependent Hamiltonians [65.268245109828]
We develop a general framework to linearize the von-Neumann equation rendering it in a suitable form for quantum simulations. We show that one of these linearizations of the von-Neumann equation corresponds to the standard case in which the state vector becomes the column stacked elements of the density matrix. A quantum algorithm to simulate the dynamics of the density matrix is proposed.
arXiv Detail & Related papers (2023-06-14T23:08:51Z)
General expansion of natural power of linear combination of Bosonic operators in normal order [3.42658286826597]
We present a general expansion of the natural power of a linear combination of bosonic operators in normal order. Our results have important applications in the study of many-body systems in quantum mechanics.
arXiv Detail & Related papers (2023-05-29T14:26:45Z)
Sampled Transformer for Point Sets [80.66097006145999]
sparse transformer can reduce the computational complexity of the self-attention layers to $O(n)$, whilst still being a universal approximator of continuous sequence-to-sequence functions. We propose an $O(n)$ complexity sampled transformer that can process point set elements directly without any additional inductive bias.
arXiv Detail & Related papers (2023-02-28T06:38:05Z)
Efficient application of the factorized form of the unitary coupled-cluster ansatz for the variational quantum eigensolver algorithm by using linear combination of unitaries [0.0]
The variational quantum eigensolver is one of the most promising algorithms for near-term quantum computers. It has the potential to solve quantum chemistry problems involving strongly correlated electrons.
arXiv Detail & Related papers (2023-02-17T04:03:06Z)
Quantum algorithms for spectral sums [50.045011844765185]
We propose new quantum algorithms for estimating spectral sums of positive semi-definite (PSD) matrices. We show how the algorithms and techniques used in this work can be applied to three problems in spectral graph theory.
arXiv Detail & Related papers (2020-11-12T16:29:45Z)
Sub-bosonic (deformed) ladder operators [62.997667081978825]
We present a class of deformed creation and annihilation operators that originates from a rigorous notion of fuzziness. This leads to deformed, sub-bosonic commutation relations inducing a simple algebraic structure with modified eigenenergies and Fock states. In addition, we investigate possible consequences of the introduced formalism in quantum field theories, as for instance, deviations from linearity in the dispersion relation for free quasibosons.
arXiv Detail & Related papers (2020-09-10T20:53:58Z)
Newton series expansion of bosonic operator functions [0.0]
We show how series expansions of functions of bosonic number operators are naturally derived from finite-difference calculus. The scheme employs Newton series rather than Taylor series known from differential calculus, and also works in cases where the Taylor expansion fails.
arXiv Detail & Related papers (2020-08-25T16:11:31Z)

This list is automatically generated from the titles and abstracts of the papers in this site.