Mathematical physicists are familiar with a large set of tools designed for dealing with linear operators, which are so common in both the classical and quantum theories; but many of those tools are useless with nonlinear equations of motion. In this work a general algebra and calculus is developed for working with nonlinear operators: The basic new tool being the ‘‘slash product,’’ defined by A(1+eB) = A+eA/B + O(e^2). For a generic time development equation, the propagator is constructed and then there follows the formal version of time dependent perturbation theory, in remarkable similarity to the linear situation. A nonperturbative approximation scheme capable of producing high accuracy computations, previously developed for linear oper...
A theory of the analysis of nonlinear systems is developed. The central problem is the mathematical ...
In this book, we study theoretical and practical aspects of computing methods for mathematical model...
Time-independent perturbation theory is developed for an arbitrary operator [Physical Formula] which...
This work extends the previous development of new mathematical machinery for nonlinear operators act...
Explicit formulas expressing the solution to non-autonomous differential equations are of great impo...
We present a generalization of the quantum mechanical formalism to a class of propagators that is cl...
In this report the method of functional iteration is introduced as a means for solving nonlinear fee...
The operator T from a domain D into the space of measurable functions is called a nonanticipating op...
UnrestrictedThe concept of Dynamics exists everywhere in our lives. As an integral component of dail...
The operator T from a domain D into the space of measurable functions is called a nonanticipating op...
We present a novel projection operator method for deriving the ordinary differential equations (ODEs...
AbstractA class of operators is introduced and referred to as nonlinear nuclear operators. As in the...
A time-dependent variant of the WKB method is developed for propagators which do not have the simple...
ArticleIn this article we provide a set of sufficient conditions that allow a natural extension of C...
A formal calculus is developed which includes the Born and Jordan matrix dynamics, and also the rema...
A theory of the analysis of nonlinear systems is developed. The central problem is the mathematical ...
In this book, we study theoretical and practical aspects of computing methods for mathematical model...
Time-independent perturbation theory is developed for an arbitrary operator [Physical Formula] which...
This work extends the previous development of new mathematical machinery for nonlinear operators act...
Explicit formulas expressing the solution to non-autonomous differential equations are of great impo...
We present a generalization of the quantum mechanical formalism to a class of propagators that is cl...
In this report the method of functional iteration is introduced as a means for solving nonlinear fee...
The operator T from a domain D into the space of measurable functions is called a nonanticipating op...
UnrestrictedThe concept of Dynamics exists everywhere in our lives. As an integral component of dail...
The operator T from a domain D into the space of measurable functions is called a nonanticipating op...
We present a novel projection operator method for deriving the ordinary differential equations (ODEs...
AbstractA class of operators is introduced and referred to as nonlinear nuclear operators. As in the...
A time-dependent variant of the WKB method is developed for propagators which do not have the simple...
ArticleIn this article we provide a set of sufficient conditions that allow a natural extension of C...
A formal calculus is developed which includes the Born and Jordan matrix dynamics, and also the rema...
A theory of the analysis of nonlinear systems is developed. The central problem is the mathematical ...
In this book, we study theoretical and practical aspects of computing methods for mathematical model...
Time-independent perturbation theory is developed for an arbitrary operator [Physical Formula] which...