Building bridges: between mathematics and computer science
Grötschel, M.
Katona, G.O.
Discrete mathematics and theoretical computer science are closely linked research areas with strong impacts on applications and various other scientific disciplines. Both fields deeply cross fertilize each other. One of the persons who particularly contributed to building bridges between these and many other areas is László Lovász, a scholar whose outstanding scientific work has definedand shaped many research directions in the last 40 years. A number of friendsand colleagues, all top authorities in their fields of expertise and all invited plenary speakers at one of two conferences in August 2008 in Hungary, bothcelebrating Lovász’s 60th birthday, have contributed their latest research papers to this volume. This collection of articles offers an excellent view on the state combinatorics and related topics and will be of interest for experienced specialists as well as young researchers An exceptional collection of papers published on the occasion of László Lovász' 60th birthday in August 2008 Contributions by experts in discrete mathematics, set theory, probabilistic methods and stochastic structures, theoretical computer science The book contains excellent survey papers and/or genuine research papers all related to the joint work of the authors with L. Lovász INDICE: From the contents Preface Curriculum Vitae of L. Lovász.- Publications of László Lovász.- I. Bárány: On the Power of Linear Dependencies.- J. Beck: Surplus of Graphs and the Lovász Local Lemma.- A. Björner: RandomWalks, Arrangements, Cell Complexes, Greedoids, and Self-organizing Libraries.- A. Blokhuis and F. Mazzocca: The Finite Field Kakeya Problem.- B. Bollobás and V. Nikiforov: An Abstract Szemerédi Regularity Lemma.- U. Feige: Small Linear Dependencies for Binary Vectors of Low Weight.- A. A. Benczúr and M. X. Goemans: Deformable Polygon Representation and Near-Mincuts.- A. Schrijver: Graph Invariants in the Edge Model.- J. Nesetril and P. Ossona de Mendez: Structural Properties of Sparse Graphs.- K. Gyarmati, M. Matolcsi and I. Z. Ruzsa: Plünnecke's Inequality for Different Summands.- H. E. Scarf: The Structure of the Complex of Maximal Lattice Free Bodies for a Matrix of Size (n + 1) x n.- J. Solymosi: Incidences and the Spectra of Graphs.- J. Spencer: The Maturation of the Probabilistic Method.
- ISBN: 978-3-540-85218-6
- Editorial: Springer
- Encuadernacion: Cartoné
- Páginas: 500
- Fecha Publicación: 01/09/2008
- Nº Volúmenes: 1
- Idioma: Inglés