Tangent spaces to the Teichmueller space from the energy-conscious perspective

Abstract

Usually, the description of tangent spaces to the Teichmueller space T(g) of a compact Riemann surface g of genus g ≥ 2 (which we can identify with the quotient space H2 / g of the upper half plane H2 by a discrete cocompact subgroup g of PSL(2, R)) comes in two different flavours: the space of holomorphic quadratic differentials on g which are holomorphic sections of the tensor square of the canonical line bundle of g and the first cohomology group H1(g; g) of the fundamental group g of g with coefficients in the vector space g of Killing vector fields on H2 (or on D), a.k.a the Lie algebra of PSL(2, R). In this article, we are concerned with connecting the above-mentioned descriptions using the notion of a harmonic vector field on the upper half plane H2 (equivalently, on D) that takes inspiration from the theory of harmonic maps between compact hyperbolic Riemann surfaces. As an application, we also show that how a harmonic vector field on H2 (or on D) describes a connection on the universal Teichmueller curve.