## Preprints submitted in 2014

- 2014-016
Alberto Bressan, Geng Chen, and Qingtian Zhang:

Unique conservative solutions to a variational wave equation.
- 2014-015
Darko Mitrović and Andrej Novak:

Transport-collapse scheme for heterogeneous scalar conservation laws.
- 2014-014
Alberto Bressan, Geng Chen, Qingtian Zhang, and Shengguo Zhu:

No BV bounds for approximate solutions to p-system with general pressure law.
- 2014-013
E. Yu. Panov:

On the Cauchy problem for scalar conservation laws on the Bohr compactification of **R**^{n}.
- 2014-012
Rinaldo M. Colombo and Helge Holden:

On the Braess paradox with nonlinear dynamics and control theory.
- 2014-011
Alberto Bressan and Tao Huang:

Representation of dissipative solutions to a nonlinear variational wave equation.
- 2014-010
E. Yu. Panov:

On the Cauchy problem for scalar conservation laws in the class of Besicovitch almost periodic functions.
- 2014-009
Alberto Bressan and Khai T. Nguyen:

Conservation law models for traffic flow on a network of roads.
- 2014-008
Alberto Bressan and Fang Yu:

Continuous Riemann solvers for traffic flow at a junction.
- 2014-007
Marco Di Francesco and Massimiliano D. Rosini:

Rigorous derivation of the Lighthill–Whitham–Richards model from the follow the-leader model as many particle limit.
- 2014-006
Anupam Pal Choudhury, K. T. Joseph and Manas R. Sahoo:

Spherically symmetric solutions of multi-dimensional zero-pressure gas dynamics system.
- 2014-005
Debora Amadori and Laurent Gosse:

Error estimates for well-balanced and time-split schemes on a damped semilinear wave equation.
- 2014-004
Alberto Bressan and Khai T. Nguyen:

Global existence of weak solutions for the Burgers–Hilbert equation.
- 2014-003
Alberto Bressan and Wen Shen:

A semigroup approach to an integro-differential equation modeling slow erosion.
- 2014-002
A. Bressan, S. Čanić, M. Garavello, M. Herty and B. Piccoli:

Flows on networks: recent results and perspectives.
- 2014-001
Alberto Bressan, Geng Chen, and Qingtian Zhang:

Uniqueness of conservative solutions to the Camassa–Holm equation via characteristics