By making use of a G?odel-type relabeling of quantum states we show that spin coherent states play a fundamental role in number theory. We generalize the representation of the M?obius function obtained in Spector (1990 Commun. Math. Phys. 127 239) by giving a quantum mechanical interpretation of a generalization of the M?obius function: the Fleck function. We also show that inversion convolution theorem for the Liouville function and some key relations giving theM?obius inversion theorem can be understood from the orthogonality properties of the spin coherent states. Our results show a fruitful interplay of quantum mechanics and number theory
The Hamiltonian for the oscillator has earlier been written in the form H=ℏω(2v+v+λ+·λ+3/2), where v...
The Quantum coherent states were established under the bases of the quantum laws of the nature. Thes...
A general procedure for constructing coherent states, which are eigenstates of annihilation operator...
Since symmetry properties of coherent states (CS) on M\"obius strip (MS) and fermions are closely re...
This book presents the various types of coherent states introduced and studied in the physics and ma...
Abstract. Coherent states provide an appealing method to reconstruct efficiently the pure state of a...
Coherent states are special types of wavefunctions that minimize a generalized uncertainty principle...
In the coherent state of the harmonic oscillator, the probability density is that of the ground stat...
This self-contained introduction discusses the evolution of the notion of coherent states, from the ...
Coherent states provide an appealing method to reconstruct efficiently a pure state of a quantum mec...
International audienceA family of q-coherent states is constructed allowing us to obtain a new quant...
Berezin-Klauder-Toeplitz (“anti-Wick”) or “coherent state” quantization of the complex plane, viewed...
A transform between functions in R and functions in Zd is used to define the analogue of number and ...
10 pages, 1 figureThe domain of application of quantization methods is traditionally restricted to s...
The definition and formulas for the harmonic oscillator coherent states and spin coherent states are...
The Hamiltonian for the oscillator has earlier been written in the form H=ℏω(2v+v+λ+·λ+3/2), where v...
The Quantum coherent states were established under the bases of the quantum laws of the nature. Thes...
A general procedure for constructing coherent states, which are eigenstates of annihilation operator...
Since symmetry properties of coherent states (CS) on M\"obius strip (MS) and fermions are closely re...
This book presents the various types of coherent states introduced and studied in the physics and ma...
Abstract. Coherent states provide an appealing method to reconstruct efficiently the pure state of a...
Coherent states are special types of wavefunctions that minimize a generalized uncertainty principle...
In the coherent state of the harmonic oscillator, the probability density is that of the ground stat...
This self-contained introduction discusses the evolution of the notion of coherent states, from the ...
Coherent states provide an appealing method to reconstruct efficiently a pure state of a quantum mec...
International audienceA family of q-coherent states is constructed allowing us to obtain a new quant...
Berezin-Klauder-Toeplitz (“anti-Wick”) or “coherent state” quantization of the complex plane, viewed...
A transform between functions in R and functions in Zd is used to define the analogue of number and ...
10 pages, 1 figureThe domain of application of quantization methods is traditionally restricted to s...
The definition and formulas for the harmonic oscillator coherent states and spin coherent states are...
The Hamiltonian for the oscillator has earlier been written in the form H=ℏω(2v+v+λ+·λ+3/2), where v...
The Quantum coherent states were established under the bases of the quantum laws of the nature. Thes...
A general procedure for constructing coherent states, which are eigenstates of annihilation operator...