IDEALS OF FUNCTION SPACE IN THE LIGHT OF AN EXPONENTIAL ALGEBRA.

Exponential algebra is a new algebraic structure consisting of a semigroup structure, a scalar multiplication, an internal multiplication and a partial order [introduced in [4]]. This structure is based on the structure 'exponential vector space' which is thoroughly developed by Priti Sharma et. al. in [11] [This structure was actually proposed by S. Ganguly et. al. in [1] with the name 'quasi-vector space'] Exponential algebra can be considered as an algebraic ordered extension of the concept of algebra. In the present paper we have shown that the function space C⁺(X) of all non-negative continuous functions on a topological space X is a topological exponential algebra under the compact open topology. Also we have discussed the ideals and maximal ideals of C⁺(X). We find an ideal of C⁺(X) which is not a maximal ideal in general; actually maximality of that ideal depends on the topology of X. The concept of ideals of exponential algebra was introduced by us in. [ABSTRACT FROM AUTHOR]