HOMONOLO'13

Nova Louka, December 1-6, 2013

Organized by KAM and IUUK, supported by DIMATIA, CE-ITI and GraDR.

The workshop continues the tradition started at Nova Louka in late fall 2000. This year, for the third time, the workshop will be devoted mainly to solving geometrical problems (as well as to structural properties, algebraic aspects, algorithmic complexity and other aspects of graph homomorphisms and related topics).

It will follow the informal atmosphere of Prague Midsummer Combinatorial Workshops, in particular participants are welcomed to present some open problems in a 20-30 minute long talk, but no abstracts are required beforehand. The program is decided on the spot, so that enough time remains for discussions, problem solving and sightseeing.

The venue of the workshop is a historic wooden hunters' lodge far away from traces of civilization. Sporting activities include crosscountry skiing or alternatively mountain biking and table tennis. The lodge is equipped with a sauna.

List of participants:

Travel instructions

The lodge Samalova chata at Nova Louka is located in the center of one of the nicest Czech hills Jizerske hory, located in the north part of Czech Republic (close to the Polish and German borders).

A shuttle bus departs from Prague - Metro station "Nadrazi Holesovice" on Sunday December 1 at 1:00 p.m. We will meet beside the exit stairs from metro station Nadrazi Holesovice to the train station Nadrazi Holesovice (note that there are two exits from metro station but only north exit heads to the train station). See the map for more details. Bus returns to Prague - Metro station Cerny most - on Friday afternoon (4:00-5:00 p.m.).

The easiest way by car to Nova Louka is through Liberec (highway R10 north from Prague and then R35), then to Bedrichov and then finally to Nova Louka. Beyond Bedrichov the road is closed for public, but hotel guests are allowed to drive in (notice that in case of snowing you may need snow chains).

Samalova chata



October 2013 - Marek Tesar (tesar -at- kam.mff.cuni.cz)