On Trace Functions

## Abstract Let __X__ be a standard Markov process with state space __E__ and let __F__ be a closed subset of __E__. A nonnegative function __f__ on __F__ is extended probabilistically to a function __h~f~__ on the whole space __E__. We show that the extension __h~f~__ is harmonic with respect to _

Let p be a prime number, Q p the field of p-adic numbers, Q p a fixed algebraic closure of Q p , and C p the completion of Q p . For elements T # C p which satisfy a certain diophantine condition (V) we construct a power series F(T, Z) with coefficients in Q p and show that two elements T, U produce

## Abstract We consider the Sobolev spaces of square integrable functions __v__, from ℝ^__n__^ or from one of its hyperquadrants __Q__, into a complex separable Hilbert space, with square integrable sum of derivatives ∑∂~__𝓁__~__v__. In these spaces we define closed trace operators on the boundarie

We describe an efficient construction of a canonical noncommutative deformation of the algebraic functions on the moduli spaces of flat connections on a Riemann surface. The resulting algebra is a variant of the quantum moduli algebra introduced by Alekseev, Grosse, and Schomerus and Buffenoir and R