Exceptional Solutions of Hill Equations

The main purpose of this paper is to present an explicit formula for the general hierarchy of soliton equations constructed by Kac-Wakimoto from the basic representation of an arbitrary affine Kac-Moody algebra. The results turn out that the differential operators of the corresponding Hirota bilinea

In this paper, we introduce "approximate solutions" to solve the following problem: given a polynomial F (x, y) over Q, where x represents an n-tuple of variables, can we find all the polynomials G(x) such that F (x, G(x)) is identically equal to a constant c in Q? We have the following: let F (x, y

## Abstract We study operator equations within the Turing machine based framework for computability in analysis. Is there an algorithm that maps pairs (__T__, __u__) (where __T__ is given in form of a program) to solutions of __Tx__ = __u__ ? Here we consider the case when __T__ is a bounded linear