Generalized classical dynamics, and the ‘classical analogue’ of a Fermioscillator

Nonlinear evolution equations with (1,1)-supersymmetric time, Fractional generalized Hamilton method for equilibrium stability of dynamical systems, Remarks on the Nature of Relativistic Particle Orbits, Behaviour of charged spinning massless particles, A new Lie symmetrical method of finding a conserved quantity for a dynamical system in phase space, A pseudoclassical model for \(P,T\)-invariant planar fermions, Stability for manifolds of equilibrium state of generalized Hamiltonian system with additional terms, Fractional generalized Hamiltonian mechanics, A Lie symmetrical basic integral variable relation and a new conservation law for generalized Hamiltonian systems, Distributions and partial differential equations on superspace, Is there a « classical analogue » of Dirac’s theory?, Analysis on superspace: an overview, Worldline path integral for the massive Dirac propagator: A four-dimensional approach, Stability for manifolds of equilibrium states of generalized Hamiltonian systems, Lie algebraic structure and generalized Poisson conservation law for fractional generalized Hamiltonian systems, Fractional relativistic Yamaleev oscillator model and its dynamical behaviors, One-dimensional super Calabi-Yau manifolds and their mirrors, Manifestly covariant worldline actions from coadjoint orbits. I: Generalities and vectorial descriptions, Perturbation to conformal invariance and adiabatic invariants of generalized perturbed Hamiltonian system with additional terms, On the families of fractional dynamical models, A new type of non-Noether exact invariants and adiabatic invariants of generalized Hamiltonian systems, Fractional generalized Hamiltonian equations and its integral invariants, Fractional generalized Hamiltonian mechanics and Poisson conservation law in terms of combined Riesz derivatives, Functional Integrals and Statistical Physics, Distribution spaces and a new construction of stochastic processes associated with the Grassmann algebra, The Hamiltonian structure of the modified and fifth-order Korteweg–de Vries equation, Foundations of calculus on super Euclidean space \({\mathfrak R}^{m/n}\) based on a Fréchet-Grassmann algebra, Real non-archimedean structure of spacetime, Quantization on supermanifolds and an analytic proof of the Atiyah-Singer index theorem, Pseudo-fermionic coherent states with time-dependent metric, A new method of dynamical stability, i.e. fractional generalized Hamiltonian method, and its applications, TIME-REVERSAL, LOOP-ANTILOOP SYMMETRY AND THE BESSEL EQUATION, Foundations of analysis on superspace. I: Differential calculus, Reduction theory and the Lagrange–Routh equations, A new method of fractional dynamics, i.e., fractional Mei symmetrical method for finding conserved quantity, and its applications to physics, A new type of fractional Lie symmetrical method and its applications, NILPOTENT QUANTUM MECHANICS, Majorana representation for dissipative spin systems, Linear odd Poisson bracket on Grassmann variables, Fermionic realisations of simple Lie algebras and their invariant fermionic operators, A general method of fractional dynamics, i.e., fractional Jacobi last multiplier method, and its applications, Grassmann electrodynamics and general relativity, Particle spin dynamics as the Grassmann variant of classical mechanics, Stability for manifolds of equilibrium states of fractional generalized Hamiltonian systems, Applications of nonstandard number systems in mathematical physics, A rigorous path integral for quantum spin using flat-space Wiener regularization, Fractional Nambu dynamics, p-adic superanalysis. I. Infinitely generated Banach superalgebras and algebraic groups, \(P,T\)-invariant system of Chern-Simons fields: Pseudoclassical model and hidden symmetries, Clebsch canonization of Lie-Poisson systems, Fractional Lorentz-Dirac model and its dynamical behaviors, Superanalysis, I. Differential calculus, Differential equations with supersymmetric time