Introduction.- Bächle et al: Algorithmic aspects of units in group rings.- M. Barakat et al: A constructice approach to the module of twisted glocal sections on relative projective spaces.- J. Böhm et al: Local to global algorithms for the Gorenstein adjoint ideal of a curve.- M. Börner et al: Picard curves with small conductor.- W. Bruns et al: Normaliz 2013-2016.- T. Centeleghe et al: Integral Frobenius for abelian varieties with real multiplication.- M. Dettweiler et al: Monodromy of the multiplicative and the additive convolution.- B. Eick et al: Constructing groups of ‘small’ order: Recent results and open problems.- B. Eick et al: Classifying nilpotent associative algebras: small coclass and finite fields.- A. Fruehbis-Krüger et al: Desingularization of arithmetic surfaces: algorithmic aspects.- A. Gathmann et al: Moduli spaces of curves in tropical varieties.- A. Gathmann et al: Tropical moduli spaces of stable maps to a curve.- M. Geck et al: Invariant bilinear forms on W-graph representations and linear algebra over integral domains.- S. Hampe et al: Tropical computations in polymake.- M. Hoff: Focal schemes to families of secant spaces to canonical curves.- T. Hoge et al: Inductive and recursive freeness of localizations of multiarrangements.- L. Kastner: Toric ext and tor in polymake and Singular: The twodimensional case and beyond.- M. Lange-Hegermann et al: The differential dimension polynomial for characterizable differential ideals.- V. Levandovskyy: Factorization of Z-homogeneous polynomials in the first q-Weyl algebra.- E.W. Mayr et al: Complexity of membership problems of different types of polynomial ideals.- T. Moeller et al: Localizations of inductively factored arrangements.- G. Nebe et al: One class genera of lattice chains over number fields.- A. Paffenholz: polyDB: A database for polytopes and related objects.- G. G. Pfister et al: Construction of neron desingularization for two-dimensional rings. - T. Rossmann et al: A framework for computing zeta functions of groups, algebras, and modules.- A. Shalile: On decomposition numbers of diagram algebras.- U. Spreckels et al: Koblitz’ conjecture for abelian varieties.- M. Stoll: Chabauty without the Mordell-Weil group.- M. Stoll: An explicit theory of heights for hyperelliptic Jacobians of genus three.- T. Theobald: Some recent developments in spectrahedral computation.- G. Wiese et al: Topics on modular Galois representations modulo prime powers.
Gebhard Böckle is professor of mathematics at the Universität Heidelberg. His research themes are Galois representations over number and function fields, the arithmetic of function fields, and cohomological methods in positive characteristic.
Wolfram Decker is professor of mathematics at TU Kaiserslautern.His research fields are algebraic geometry and computer algebra. He heads the development team of the computer algebra systemSingular. From 2010-2016, he was the coordinator of the DFG Priority Program SPP 1489 from which this volume originates.
Gunter Malle is professor of mathematics at TU Kaiserslautern. He is working in group representation theory with particular emphasis on algorithmic aspects.
This book presents state-of-the-art research and survey articles that highlight work done within the Priority Program SPP 1489 “Algorithmic and Experimental Methods in Algebra, Geometry and Number Theory”, which was established and generously supported by the German Research Foundation (DFG) from 2010 to 2016. The goal of the program was to substantially advance algorithmic and experimental methods in the aforementioned disciplines, to combine the different methods where necessary, and to apply them to central questions in theory and practice. Of particular concern was the further development of freely available open source computer algebra systems and their interaction in order to create powerful new computational tools that transcend the boundaries of the individual disciplines involved.
The book covers a broad range of topics addressing the design and theoretical foundations, implementation and the successful application of algebraic algorithms in order to solve mathematical research problems.
It offers a valuable resource for all researchers, from graduate students through established experts, who are interested in the computational aspects of algebra, geometry, and/or number theory.