The following pages link to Debris flow modeling: A review (Q1913488):
Displaying 23 items.
- A depth-integrated viscoplastic model for dilatant saturated cohesive-frictional fluidized mixtures: application to fast catastrophic landslides (Q377099) (← links)
- Important aspects in the formulation of solid-fluid debris-flow models. I: Thermodynamic implications (Q407662) (← links)
- Volume-weighted mixture theory for granular materials (Q841899) (← links)
- A mesoscopic continuum description of dry granular materials (Q1007063) (← links)
- Microcontinuum derivation of Goodman-Cowin theory for granular materials (Q1018490) (← links)
- Recent bibliography on extended irreversible thermodynamics and related topics (1995-1998) (Q1292946) (← links)
- Extended irreversible thermodynamics approach to magnetorheological fluids (Q1419602) (← links)
- Surrogate-based parameter inference in debris flow model (Q1629727) (← links)
- A shock-capturing wave-propagation method for dry and saturated granular flows (Q1880731) (← links)
- Dynamic equations for debris flow (Q1895503) (← links)
- Channel flow simulation of a mixture with a full-dimensional generalized quasi two-phase model (Q1997664) (← links)
- Multilayer models for shallow two-phase debris flows with dilatancy effects (Q2125464) (← links)
- A multi-layer SPH method for generic water-soil dynamic coupling problems. I: Revisit, theory, and validation (Q2156795) (← links)
- Distribution of sediment concentration in debris flow using Rényi entropy (Q2157166) (← links)
- Statistical analysis of pulsating non-Newtonian flow in a corrugated channel using lattice-Boltzmann method (Q2164130) (← links)
- The inverse problem in creeping film flows (Q2392303) (← links)
- Micromorphic modeling of granular dynamics (Q2428246) (← links)
- Comparison of 2D debris-flow simulation models with field events (Q2434012) (← links)
- Steady solution and spatial stability of gravity-driven thin-film flow: reconstruction of an uneven slippery bottom substrate (Q2628739) (← links)
- A continuum approach for predicting segregation in flowing polydisperse granular materials (Q2973605) (← links)
- 1-D numerical modelling of shallow flows with variable horizontal density (Q3550248) (← links)
- A two-fluid model for avalanche and debris flows (Q5301843) (← links)
- A continuum model for granular materials: Considering dilatancy and the Mohr-Coulomb criterion (Q5956709) (← links)
