2021
DOI: 10.1007/s13239-021-00572-5
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A Computational Framework for Pre-Interventional Planning of Peripheral Arteriovenous Malformations

Abstract: Purpose Peripheral arteriovenous malformations (pAVMs) are congenital lesions characterised by abnormal high-flow, low-resistance vascular connections—the so-called nidus—between arteries and veins. The mainstay treatment typically involves the embolisation of the nidus, however the complexity of pAVMs often leads to uncertain outcomes. This study aims at developing a simple, yet effective computational framework to aid the clinical decision making around the treatment of pAVMs using routinely ac… Show more

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Cited by 4 publications
(2 citation statements)
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“…As a kind of fluid, blood was often described by continuum model. According to the property of venous blood flow, 1118 the blood fluid was considered as incompressible, laminar, steady and homogeneous. The corresponding governing equation for blood flow was written as follows: ρ[]boldu∂tgoodbreak+()bolduboldugoodbreak=goodbreak−pgoodbreak+μ2boldu where boldu is the velocity of the fluid flow, p is the pressure, ρ is the density, μ is the dynamic viscosity.…”
Section: Methodsmentioning
confidence: 99%
See 1 more Smart Citation
“…As a kind of fluid, blood was often described by continuum model. According to the property of venous blood flow, 1118 the blood fluid was considered as incompressible, laminar, steady and homogeneous. The corresponding governing equation for blood flow was written as follows: ρ[]boldu∂tgoodbreak+()bolduboldugoodbreak=goodbreak−pgoodbreak+μ2boldu where boldu is the velocity of the fluid flow, p is the pressure, ρ is the density, μ is the dynamic viscosity.…”
Section: Methodsmentioning
confidence: 99%
“…Integrated with Darcy's law, it considered the momentum transfer phenomenon caused by viscosity effect and pressure gradient near the interface between free flow and porous media flow, and then realized the coupling of external free flow and porous media flow. Finally, the velocity and pressure of the liquid are calculated by solving the coupled Brinkman‐Forchheimer equation given as follows: 1italicεp2italicρ[]boldutgoodbreak+()bolduboldugoodbreak=goodbreak−pgoodbreak+italicμ1italicεp2boldugoodbreak−()μκgoodbreak+CFitalicρ||ugoodbreak−italicρbolduitalicεp2boldu where the porosity of thrombus takes value of εp=0.15,0.5emκ is the permeability of thrombus, taking κ=5×10110.5emm2. 18 . C F is the Forchheimer constant.…”
Section: Methodsmentioning
confidence: 99%