Progress in hyperbolic problems and applications - Part III of VI
For Part I, see MS-We-E-13
For Part II, see MS-Th-BC-13
For Part IV, see MS-Th-E-13
For Part V, see MS-Fr-D-13
For Part VI, see MS-Fr-E-13

Date: August 13
Time: 13:30--15:30
Room: 3-2

(Note: Click title to show the abstract.)

Wang, Ying (Univ. of Oklahoma)
Tesdall, Allen (City Univ. of New York, College of Staten Island)

Abstract: Hyperbolic conservation laws form the basis for the mathematical modeling of many physical systems, and describe a wide range of wave propagation and fluid flow phenomena, including shock waves in nonlinear situations. For one dimensional systems with small data, a well-posedness theory of entropy weak solutions is well known. Analysis in several space dimensions, however, remains an enormous challenge. In this minisymposium, recent results in the theory and numerical analysis of hyperbolic problems will be presented. A variety of computational techniques, including finite volume, finite element, spectral, WENO, and discontinuous Galerkin methods, will be represented.

Entropy Stability of Conservative schemes for Conservation Laws
Li, Jiequan (Beijing Normal Univ.)

Full compressible Euler equations with damping on bounded domains
Zhao, Kun (Tulane Univ.)
Pan, Ronghua (Georgia Inst. of Tech.)

Well Posedness and Optimal Control in Structured Population Models
Colombo, Rinaldo M. (Univ. of Brescia)

Krylov implicit integration factor WENO methods for high dimensional convection-diffusion problems
Zhang, Yong-Tao (Univ. of Notre Dame)


Code: Type-Date-Time-Room No.
Type : IL=Invited Lecture, SL=Special Lectures, MS=Minisymposia, IM=Industrial Minisymposia, CP=Contributed Papers, PP=Posters
Date: Mo=Monday, Tu=Tuesday, We=Wednesday, Th=Thursday, Fr=Friday
Time : A=8:30-9:30, B=10:00-11:00, C=11:10-12:10, BC=10:00-12:10, D=13:30-15:30, E=16:00-18:00, F=19:00-20:00, G=12:10-13:30, H=15:30-16:00
Room No.: TBA