Algebras and differential equations

Abstract

One purpose of this paper is a purely algebraic study of (systems of) ordinary differential equations of the typewhere the coefficients are taken from a fixed associative, commutative, unital ring R, such as the field R of real or C of complex numbers or a commutative, unital Banach algebra. The right hand sides of D are considered to be elements in the polynomial ring R[X₁, …, X_n] of associating but non-commuting variables X₁, …, X_n. An algebraic study calls for maps between such differential equations and, in fact, morphisms are defined between differential equations having the same arity m but not necessarily the same dimension n. These morphisms are rectangular matrices with entries in R which satisfy certain relations. This leads to a category _RDiff_m whose objects are precisely the differential equations of arity m and in which the composition of the morphisms is the usual matrix multiplication.