Your search keyword '"Mathematics"' showing total 10 results

1. Moving frames and prolongation algebras

Author

Estabrook, F. B

Subjects

Theoretical Mathematics

Abstract

Differential ideals generated by sets of 2-forms which can be written with constant coefficients in a canonical basis of 1-forms are considered. By setting up a Cartan-Ehresmann connection, in a fiber bundle over a base space in which the 2-forms live, one finds an incomplete Lie algebra of vector fields in the fields in the fibers. Conversely, given this algebra (a prolongation algebra), one can derive the differential ideal. The two constructs are thus dual, and analysis of either derives properties of both. Such systems arise in the classical differential geometry of moving frames. Examples of this are discussed, together with examples arising more recently: the Korteweg-de Vries and Harrison-Ernst systems.

Published

1982

2. Conformal invariance and Hamilton Jacobi theory for dissipative systems

Author

Kiehn, R. M

Subjects

Theoretical Mathematics

Abstract

For certain dissipative systems, a comparison can be made between the Hamilton-Jacobi theory and the conformal invariance of action theory. The two concepts are not identical, but the conformal action theory covers the Hamilton-Jacobi theory.

Published

1975

3. Prolongation structures of nonlinear evolution equations

Author

Wahlquist, H. D and Estabrook, F. B

Subjects

Theoretical Mathematics

Abstract

A technique is developed for systematically deriving a 'prolongation structure' - a set of interrelated potentials and pseudopotentials - for nonlinear partial differential equations in two independent variables. When this is applied to the Korteweg-de Vries equation, a new infinite set of conserved quantities is obtained. Known solution techniques are shown to result from the discovery of such a structure: related partial differential equations for the potential functions, linear 'inverse scattering' equations for auxiliary functions, Backlund transformations. Generalizations of these techniques will result from the use of irreducible matrix representations of the prolongation structure.

Published

1975

4. On the improper neglect of certain terms in random function theory

Author

Lerche, I and Parker, E. N

Subjects

Mathematics

Abstract

This paper presents some exact solutions of problems in random function theory for the purpose of testing the validity of an approximate method known variously in the many different fields of its application as first order smoothing theory, first order cumulant discard, quasilinear theory, or the adiabatic approximation. The hydromagnetic dynamo equations are used here, as particularly appropriate for such an investigation. The calculations show that in one case the exact and approximate solutions agree. In the other case the approximate solution is wrong. Hence, in the absence of a general criterion for validity, a result based on first order smoothing theory is a conjecture rather than a fact. This impacts strongly on much of the recent work on hydromagnetic dynamos.

Published

1973

5. Prolongation structures of nonlinear evolution equations. II

Author

Estabrook, F. B and Wahlquist, H. D

Subjects

Theoretical Mathematics

Abstract

The prolongation structure of a closed ideal of exterior differential forms is further discussed, and its use illustrated by application to an ideal (in six dimensions) representing the cubically nonlinear Schroedinger equation. The prolongation structure in this case is explicitly given, and recurrence relations derived which support the conjecture that the structure is open - i.e., does not terminate as a set of structure relations of a finite-dimensional Lie group. We introduce the use of multiple pseudopotentials to generate multiple Baecklund transformation, and derive the double Baecklund transformation. This symmetric transformation concisely expresses the (usually conjectured) theorem of permutability, which must consequently apply to all solutions irrespective of asymptotic constraints.

Published

1976

6. Herglotz-Noether theorem in conformal space- time.

Author

Estabrook, F. B and Wahlquist, H. D

Subjects

Mathematics

Abstract

Dyadic formalism to prove Herglotz-Noether theorem for flat manifolds

Published

1967

7. Time-dependent Green's function for a moving isotropic nondispersive medium.

Author

Tai, C. T

Subjects

Mathematics

Abstract

Time-dependent Green function for moving isotropic nondispersive medium

Published

1967

8. Homogeneous Lichnerowicz universes.

Author

Ozsvath, I

Subjects

Mathematics

Abstract

Homogeneous solutions of Einstein-Lichnerowicz equations for electrically charged fluid with infinite conductivity universes

Published

1967

9. Adiabatic invariants and the 'third' integral.

Author

Contopoulos, G

Subjects

Mathematics

Abstract

Adiabatic invariants and third integrals of motion in periodic potentials in periodically time- dependent Hamiltonian systems of n degrees of freedom

Published

1966

10. The problem of exact interior solutions for rotating rigid bodies in general relativity

Author

Wahlquist, H. D

Subjects

Physics (General)

Abstract

The (3 + 1) dyadic formalism for timelike congruences is applied to derive interior solutions for stationary, axisymmetric, rigidly rotating bodies. In this approach the mathematics is formulated in terms of three-space-covariant, first-order, vector-dyadic, differential equations for a and Omega, the acceleration and angular velocity three-vectors of the rigid body; for T, the stress dyadic of the matter; and for A and B, the 'electric' and 'magnetic' Weyl curvature dyadics which describe the gravitational field. It is shown how an appropriate ansatz for the forms of these dyadics can be used to discover exact rotating interior solutions such as the perfect fluid solution first published in 1968. By incorporating anisotropic stresses, a generalization is found of that previous solution and, in addition, a very simple new solution that can only exist in toroidal configurations.

Published

1993