TODO
- Author(s):
- Reynald Affeldt (initial)
- Yves Bertot (initial)
- License: CeCILL-C
- Compatible Coq versions: Coq >= 8.17, MathComp >= 2.2.0
- Additional dependencies:
- Coq namespace:
mathcomp.trajectories
- Related publication(s):
The easiest way to install the latest released version of Trajectories is via OPAM:
opam repo add coq-released https://coq.inria.fr/opam/released
opam install coq-mathcomp-trajectories
To instead build and install manually, do:
git clone https://github.com/math-comp/trajectories.git
cd trajectories
make # or make -j <number-of-cores-on-your-machine>
make install
TODO
tentative update of https://gitlab.inria.fr/bertot/cadcoq
references:
- Root Isolation for one-variable polynomials (2010) https://wiki.portal.chalmers.se/cse/uploads/ForMath/rootisol
- A formal study of Bernstein coefficients and polynomials (2010) https://hal.inria.fr/inria-00503017v2/document
- Theorem of three circles in Coq (2013) https://arxiv.org/abs/1306.0783
- Safe Smooth Paths between straight line obstacles https://inria.hal.science/hal-04312815 https://link.springer.com/chapter/10.1007/978-3-031-61716-4_3
On April 2, 2023, a file smooth_trajectories.v
was added to illustrate a
program to compute smooth trajectories for a "point" between obstacles given
by straight edges.
The example can be played with by changing the contents of variables
example_bottom
, example_top
, example_edge_list
, and changing
the coordinates of points given as argument to example_test
in the
Compute
command that appears at the end of the file. This compute
commands produces text that should be placed in a postscript file and
can be displayed with any postscript enabled viewer. A perl-script is
provided to produce this, so that the following command is a handy
way to produce example outputs:
(cd theories; ./run_tests.sh)
At the time of writing this paragraph, the code seems complete but many bugs have been found in parts of the code that have not been proved formally.
If you play with this code and you obtain a trajectory that obviously crosses the given edges, please report.
TODO
TODO