Covers such topics as construction of new knot invariants, stable cohomology of complementary spaces to diffusion diagrams, topological properties of spaces of Legendre maps, application of Weierstrass bifurcation points in projective curve flattenings, classification of singularities of projective surfaces with boundary, and control theory.
Covers such topics as construction of new knot invariants, stable cohomology of complementary spaces to diffusion diagrams, topological properties of ...
The papers in this volume were written by members of the seminar on representation theory at Moscow University, which has been running continuously since 1961. Among the topics included are representation theory of large groups and dual objects for certain real reductive Lie groups.
The papers in this volume were written by members of the seminar on representation theory at Moscow University, which has been running continuously si...
This volume contains papers by participants in the celebrated seminar of I. M. Gelfand, which ran for more than forty years at Moscow State University. Among the authors are some of the world's most renowned mathematicians. The high scientific level of the articles makes this an important contribution to the literature.
This volume contains papers by participants in the celebrated seminar of I. M. Gelfand, which ran for more than forty years at Moscow State University...
This volume contains papers from the work of the Singularity Seminar at Moscow State University. The main topic of most of the papers is the analysis of singularities of discriminant hypersurfaces formed by the degenerate objects in different spaces of mappings. Among the topics covered are: the space of mappings of the circle to three-space; invariants, bifurcations, and classifications of plane curves; algebraic invariants of the Morse complex; complex boundary singularities; spaces of morsifications of singularities; and the number of singular points on a complex projective hypersurface.
This volume contains papers from the work of the Singularity Seminar at Moscow State University. The main topic of most of the papers is the analysis ...
Idempotent analysis is a new branch of mathematical analysis concerned with functional spaces and their mappings when the algebraic structure is generated by an idempotent operation. The articles in this collection show how idempotent analysis is playing a unifying role in many branches of mathematics related to external phenomena and structures---a role similar to that played by functional analysis in mathematical physics, or numerical methods in partial differential equations. Such a unification necessitates study of the algebraic and analytic structures appearing in spaces of functions...
Idempotent analysis is a new branch of mathematical analysis concerned with functional spaces and their mappings when the algebraic structure is gener...
