Berger, Mitchell A.
Lectures on Topological Fluid Mechanics [electronic resource] / by Mitchell A. Berger, Louis H. Kauffman, Boris Khesin, H. Keith Moffatt, Renzo L. Ricca, De Witt Sumners ; edited by Renzo L. Ricca. - Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 2009. - XII, 223 p. online resource. - Lecture Notes in Mathematics, 1973 0075-8434 ; . - Lecture Notes in Mathematics, 1973 .
Braids and Knots -- Topological Quantities: Calculating Winding, Writhing, Linking, and Higher Order Invariants -- Tangles, Rational Knots and DNA -- The Group and Hamiltonian Descriptions of Hydrodynamical Systems -- Singularities in Fluid Dynamics and their Resolution -- Structural Complexity and Dynamical Systems -- Random Knotting: Theorems, Simulations and Applications.
Helmholtz's seminal paper on vortex motion (1858) marks the beginning of what is now called topological fluid mechanics.After 150 years of work, the field has grown considerably. In the last several decades unexpected developments have given topological fluid mechanics new impetus, benefiting from the impressive progress in knot theory and geometric topology on the one hand, and in mathematical and computational fluid dynamics on the other. This volume contains a wide-ranging collection of up-to-date, valuable research papers written by some of the most eminent experts in the field. Topics range from fundamental aspects of mathematical fluid mechanics, including topological vortex dynamics and magnetohydrodynamics, integrability issues, Hamiltonian structures and singularity formation, to DNA tangles and knotted DNAs in sedimentation. A substantial introductory chapter on knots and links, covering elements of modern braid theory and knot polynomials, as well as more advanced topics in knot classification, provides an invaluable addition to this material.
9783642008375
10.1007/978-3-642-00837-5 doi
Physics.
Differentiable dynamical systems.
Differential equations, partial.
Topology.
Thermodynamics.
Physics.
Mechanics, Fluids, Thermodynamics.
Dynamical Systems and Ergodic Theory.
Several Complex Variables and Analytic Spaces.
Topology.
Lectures on Topological Fluid Mechanics [electronic resource] / by Mitchell A. Berger, Louis H. Kauffman, Boris Khesin, H. Keith Moffatt, Renzo L. Ricca, De Witt Sumners ; edited by Renzo L. Ricca. - Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 2009. - XII, 223 p. online resource. - Lecture Notes in Mathematics, 1973 0075-8434 ; . - Lecture Notes in Mathematics, 1973 .
Braids and Knots -- Topological Quantities: Calculating Winding, Writhing, Linking, and Higher Order Invariants -- Tangles, Rational Knots and DNA -- The Group and Hamiltonian Descriptions of Hydrodynamical Systems -- Singularities in Fluid Dynamics and their Resolution -- Structural Complexity and Dynamical Systems -- Random Knotting: Theorems, Simulations and Applications.
Helmholtz's seminal paper on vortex motion (1858) marks the beginning of what is now called topological fluid mechanics.After 150 years of work, the field has grown considerably. In the last several decades unexpected developments have given topological fluid mechanics new impetus, benefiting from the impressive progress in knot theory and geometric topology on the one hand, and in mathematical and computational fluid dynamics on the other. This volume contains a wide-ranging collection of up-to-date, valuable research papers written by some of the most eminent experts in the field. Topics range from fundamental aspects of mathematical fluid mechanics, including topological vortex dynamics and magnetohydrodynamics, integrability issues, Hamiltonian structures and singularity formation, to DNA tangles and knotted DNAs in sedimentation. A substantial introductory chapter on knots and links, covering elements of modern braid theory and knot polynomials, as well as more advanced topics in knot classification, provides an invaluable addition to this material.
9783642008375
10.1007/978-3-642-00837-5 doi
Physics.
Differentiable dynamical systems.
Differential equations, partial.
Topology.
Thermodynamics.
Physics.
Mechanics, Fluids, Thermodynamics.
Dynamical Systems and Ergodic Theory.
Several Complex Variables and Analytic Spaces.
Topology.