Litcius/Paper detail

Two energy-conserving and compact finite difference schemes for two-dimensional Schrödinger-Boussinesq equations

Feng Liao, Luming Zhang, Ting-Chun Wang

2020Numerical Algorithms21 citationsDOI

Topics & Concepts

MathematicsFinite differenceTheory of computationFinite difference methodConvergence (economics)Conservation lawComputationRate of convergenceNumerical analysisCompact finite differenceApplied mathematicsSolverGridFunction (biology)Energy (signal processing)Finite difference coefficientMathematical analysisMathematical optimizationGeometryFinite element methodAlgorithmMixed finite element methodComputer sciencePhysicsEvolutionary biologyStatisticsThermodynamicsComputer networkEconomic growthBiologyChannel (broadcasting)EconomicsNumerical methods for differential equationsComputational Fluid Dynamics and AerodynamicsAdvanced Mathematical Physics Problems
Two energy-conserving and compact finite difference schemes for two-dimensional Schrödinger-Boussinesq equations | Litcius