The fundamental continuity theory of optimization on a compact space. I

Let K be a compact connected Lie group, L be a connected closed subgroup of K. It is well known that L is a subgroup of maximal rank of K if and only if the Euler characteristic of the manifold M = K/L is positive. Such homogeneous spaces M have been classified in [7,10]. However, their topological

Let C R (X) denote, as usual, the Banach algebra of all real valued continuous functions on a compact Hausdorff space X endowed with the supremum norm. We present an elementary proof of the following extension result for C R (X): For a given g ∈ C R (X) with zero set Zg and for the n-tuple (f1, . .

Foundations of the theory of continuous systems based on the concept of states are studied with rigorous definitions, using generalized functions. Both finite-and infinite-dimensional, linear, time-invariant systems are characterized; application to Cauchy problems and distribution semigroups is pre