The moduli space of even surfaces of general type with , and

R&urn& We introduce a new invariant, Pontryagin-Viro form, of real algebraic surfaces. We evaluate it for real Enriques surfaces with non-negative minimal Euler characteristic of the components of the real part and prove that, when combined with the known topological invariants. it distinguishes the

We measure, in two distinct ways, the extent to which the boundary region of moduli space contributes to the "simple type" condition of Donaldson theory. Using the natural geometric representative of µ(pt) defined in [L. Sadun, Commun. Math. Phys. 178 (1996) 107-113], the boundary region of moduli s

A 2-form is constructed on the space of connections on a principal bundle over an oriented surface with boundary. This induces a symplectic structure for the moduli space of flat connections with boundary holonomies lying in prescribed conjugacy classes. The Yang-Mills quantum field measure is descr