We consider noncommutative two-dimensional quantum harmonic oscillators and extend them to the case of twisted algebra. We obtained modified raising and lowering operators. Also we study statistical mechanics and thermodynamics and calculated partition function which yields the free energy of the system
An extended treatment of the one-dimensional q-harmonic oscillator, based on two examples of inequiv...
An algebraic model based on Lie-algebraic techniques is applied to vibrational molecular thermodynam...
An extended treatment of the one-dimensional q-harmonic oscillator, based on two examples of inequiv...
We study the structure of a quantum algebra in which a parity-violating term modifies the standard c...
Abstract We propose a model of dynamical noncommutative quantum mechanics in which the noncommutativ...
The symmetry algebra of the two-dimensional quantum harmonic oscillator with rational ratio of frequ...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
We discuss in detail the parasupersymmetric quantum mechanics of arbitrary order where the parasuper...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
Noncommutative mathematics is a significant new trend of mathematics. Initially motivated by the dev...
An algebraic model based on Lie-algebraic techniques is applied to vibrational molecular thermodynam...
An extended treatment of the one-dimensional q-harmonic oscillator, based on two examples of inequiv...
An algebraic model based on Lie-algebraic techniques is applied to vibrational molecular thermodynam...
An extended treatment of the one-dimensional q-harmonic oscillator, based on two examples of inequiv...
We study the structure of a quantum algebra in which a parity-violating term modifies the standard c...
Abstract We propose a model of dynamical noncommutative quantum mechanics in which the noncommutativ...
The symmetry algebra of the two-dimensional quantum harmonic oscillator with rational ratio of frequ...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
We discuss in detail the parasupersymmetric quantum mechanics of arbitrary order where the parasuper...
By twisting the commutation relations between creation and annihilation operators, we show that quan...
Noncommutative mathematics is a significant new trend of mathematics. Initially motivated by the dev...
An algebraic model based on Lie-algebraic techniques is applied to vibrational molecular thermodynam...
An extended treatment of the one-dimensional q-harmonic oscillator, based on two examples of inequiv...
An algebraic model based on Lie-algebraic techniques is applied to vibrational molecular thermodynam...
An extended treatment of the one-dimensional q-harmonic oscillator, based on two examples of inequiv...
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