7 research outputs found
Singular structure of Toda lattices and cohomology of certain compact Lie groups
We study the singularities (blow-ups) of the Toda lattice associated with a
real split semisimple Lie algebra . It turns out that the total
number of blow-up points along trajectories of the Toda lattice is given by the
number of points of a Chevalley group related to the maximal
compact subgroup of the group with over the finite field . Here is the Langlands dual of . The blow-ups of the Toda lattice
are given by the zero set of the -functions. For example, the blow-ups of
the Toda lattice of A-type are determined by the zeros of the Schur polynomials
associated with rectangular Young diagrams. Those Schur polynomials are the
-functions for the nilpotent Toda lattices. Then we conjecture that the
number of blow-ups is also given by the number of real roots of those Schur
polynomials for a specific variable. We also discuss the case of periodic Toda
lattice in connection with the real cohomology of the flag manifold associated
to an affine Kac-Moody algebra.Comment: 23 pages, 12 figures, To appear in the proceedings "Topics in
Integrable Systems, Special Functions, Orthogonal Polynomials and Random
Matrices: Special Volume, Journal of Computational and Applied Mathematics
On a family of solutions of the KP equation which also satisfy the Toda lattice hierarchy
We describe the interaction pattern in the - plane for a family of
soliton solutions of the Kadomtsev-Petviashvili (KP) equation,
. Those solutions also satisfy the
finite Toda lattice hierarchy. We determine completely their asymptotic
patterns for , and we show that all the solutions (except the
one-soliton solution) are of {\it resonant} type, consisting of arbitrary
numbers of line solitons in both aymptotics; that is, arbitrary incoming
solitons for interact to form arbitrary outgoing solitons
for . We also discuss the interaction process of those solitons,
and show that the resonant interaction creates a {\it web-like} structure
having holes.Comment: 18 pages, 16 figures, submitted to JPA; Math. Ge
Algebraic varieties in Birkhoff strata of the Grassmannian Gr: Harrison cohomology and integrable systems
Local properties of families of algebraic subsets in Birkhoff strata
of Gr containing hyperelliptic curves of genus are
studied. It is shown that the tangent spaces for are isomorphic to
linear spaces of 2-coboundaries. Particular subsets in are described by
the intergrable dispersionless coupled KdV systems of hydrodynamical type
defining a special class of 2-cocycles and 2-coboundaries in . It is
demonstrated that the blows-ups of such 2-cocycles and 2-coboundaries and
gradient catastrophes for associated integrable systems are interrelated.Comment: 28 pages, no figures. Generally improved version, in particular the
Discussion section. Added references. Corrected typo