Pages that link to "Item:Q939481"

The following pages link to Computational high frequency waves through curved interfaces via the Liouville equation and geometric theory of diffraction (Q939481):

Displaying 12 items.

• An adaptive spectral/DG method for a reduced phase-space based level set approach to geometrical optics on curved elements (Q348743) (← links)
• A high order numerical method for computing physical observables in the semiclassical limit of the one-dimensional linear Schrödinger equation with discontinuous potentials (Q618545) (← links)
• Computational high frequency wave diffraction by a corner via the Liouville equation and geometric theory of diffraction (Q631362) (← links)
• Computation of transmissions and reflections in geometrical optics via the reduced Liouville equation (Q661484) (← links)
• A geometric optics method for high-frequency electromagnetic fields computations near fold caustics. II: The energy (Q1877128) (← links)
• Accurate and efficient simulations of Hamiltonian mechanical systems with discontinuous potentials (Q2134713) (← links)
• Fast computation of wave propagation in the open acoustical waveguide with a curved interface (Q2420968) (← links)
• Computing highly oscillatory physical optics integral on the polygonal domain by an efficient numerical steepest descent path method (Q2449775) (← links)
• A level set method for the semiclassical limit of the Schrödinger equation with discontinuous potentials (Q2638261) (← links)
• Mathematical and computational methods for semiclassical Schrödinger equations (Q3100347) (← links)
• High-frequency surface wave excitation at a curved impedence boundary (Q4223886) (← links)
• Hamiltonian-Preserving Discontinuous Galerkin Methods for the Liouville Equation With Discontinuous Potential (Q5043373) (← links)