About Lagrangian formulation of classical fields within Riemann-Liouville fractional derivatives D Baleanu, SI Muslih International Design Engineering Technical Conferences and Computers and …, 2005 | 304 | 2005 |
The Hamilton formalism with fractional derivatives EM Rabei, KI Nawafleh, RS Hijjawi, SI Muslih, D Baleanu Journal of Mathematical Analysis and Applications 327 (2), 891-897, 2007 | 254 | 2007 |
Hamiltonian formulation of systems with linear velocities within Riemann–Liouville fractional derivatives SI Muslih, D Baleanu Journal of Mathematical Analysis and Applications 304 (2), 599-606, 2005 | 220 | 2005 |
On fractional Euler–Lagrange and Hamilton equations and the fractional generalization of total time derivative D Baleanu, SI Muslih, EM Rabei Nonlinear Dynamics 53, 67-74, 2008 | 119 | 2008 |
Formulation of Hamiltonian equations for fractional variational problems SI Muslih, D Baleanu Czechoslovak Journal of Physics 55, 633-642, 2005 | 112 | 2005 |
A fractional Schrödinger equation and its solution SI Muslih, OP Agrawal, D Baleanu International Journal of Theoretical Physics 49, 1746-1752, 2010 | 109 | 2010 |
Fractional Hamiltonian analysis of higher order derivatives systems D Baleanu, SI Muslih, K Taş Journal of Mathematical Physics 47 (10), 2006 | 89 | 2006 |
Generalized variational calculus in terms of multi-parameters fractional derivatives OP Agrawal, SI Muslih, D Baleanu Communications in Nonlinear Science and Numerical Simulation 16 (12), 4756-4767, 2011 | 88 | 2011 |
Riesz fractional derivatives and fractional dimensional space SI Muslih, OP Agrawal International Journal of Theoretical Physics 49, 270-275, 2010 | 88 | 2010 |
Fractional multipoles in fractional space SI Muslih, D Baleanu Nonlinear Analysis: Real World Applications 8 (1), 198-203, 2007 | 75 | 2007 |
On fractional Schrödinger equation in α-dimensional fractional space R Eid, SI Muslih, D Baleanu, E Rabei Nonlinear Analysis: Real World Applications 10 (3), 1299-1304, 2009 | 64 | 2009 |
Is gauge fixing of constrained systems necessary? SI Muslih, Y Guler | 53 | 1998 |
A fractional Dirac equation and its solution SI Muslih, OP Agrawal, D Baleanu Journal of Physics A: Mathematical and Theoretical 43 (5), 055203, 2010 | 52 | 2010 |
Hamiltonian formulation of classical fields within Riemann–Liouville fractional derivatives SI Muslih, D Baleanu, E Rabei Physica Scripta 73 (5), 436, 2006 | 50 | 2006 |
Hamilton–Jacobi formulation of systems within Caputo's fractional derivative EM Rabei, I Almayteh, SI Muslih, D Baleanu Physica Scripta 77 (1), 015101, 2007 | 46 | 2007 |
Quantization of parametrization-invariant theories SI Muslih Nuovo Cimento della Societa Italiana di Fisica [Sezione] B 115, 2000 | 44 | 2000 |
Fractional Euler—Lagrange equations of motion in fractional space SI Muslih, D Baleanu Journal of Vibration and Control 13 (9-10), 1209-1216, 2007 | 42 | 2007 |
Path integral quantization of electromagnetic theory SI Muslih Nuovo Cimento B Serie 115 (1), 7, 2000 | 41 | 2000 |
Hamilton–Jacobi and fractional like action with time scaling MAE Herzallah, SI Muslih, D Baleanu, EM Rabei Nonlinear Dynamics 66, 549-555, 2011 | 38 | 2011 |
Solutions of a Particle with Fractional δ-Potential in a Fractional Dimensional Space SI Muslih International Journal of Theoretical Physics 49, 2095-2104, 2010 | 34 | 2010 |