LAPLACES LAW ADAPTED TO A BLOOD-VESSEL WITH 2-PHASE WALL STRUCTURE Conference Paper

abstract

• Traditional equations describing the equilibrium wall tension in a blood vessel assume that the wall consists of a solid material, although it is known to have both solid and fluid components. By describing the forces acting on the blood vessel and applying the Starling Hypothesis, a more general equation is derived describing the tension in a blood vessel wall that includes the individual contributions of the fiber and fluid components. Results show that, unlike in Laplace's Law, fiber tension is a function of transmural pressure and the average oncotic pressure within the wall. In cases where the fluid pressure within the wall is sufficiently negative, the vessel becomes unstable and tends toward closure.

name of conference

• Proceedings of the IEEE 21st Annual Northeast Bioengineering Conference

authors

• Quick, Christopher

published proceedings

• PROCEEDINGS OF THE IEEE 21ST ANNUAL NORTHEAST BIOENGINEERING CONFERENCE

author list (cited authors)

• QUICK, C. M., LI, J., WEIZSACKER, H. W., & NOORDERGRAAF, A.

citation count

• 2

complete list of authors

• QUICK, CM||LI, JKJ||WEIZSACKER, HW||NOORDERGRAAF, A

publication date

• January 1995

publisher

• Institute of Electrical and Electronics Engineers (IEEE)  Publisher

keywords

• 40 Engineering
• 4012 Fluid Mechanics And Thermal Engineering

Digital Object Identifier (DOI)

• 10.1109/NEBC.1995.513710

International Standard Book Number (ISBN) 10

• 0-7803-2692-X

start page

• 1

end page

• 3

URL

• http://dx.doi.org/10.1109/nebc.1995.513710