Quantum generalized Euler heat equation

Based on nuclear algebra of operators acting on spaces of entire functions with θ-exponential growth of minimal type, we introduce the quantum generalized Fourier-Gauss transform, the quantum second quantization as well as the quantum generalized Euler operator of which the quantum differential second quantization and the quantum generalized Gross Laplacian are particular examples. Important relation between the quantum generalized Fourier-Gauss transform, the quantum second quantization and the quantum convolution operator is given. Then, using this relation and under some conditions, we investigate the solution of a initial-value problem associated to the quantum generalized Euler operator. More precisely, we show that the aforementioned solution is the composition of a quantum second quantization and a quantum convolution operator.