Pseudoholomoprhic curves on the LCS-fication of contact manifolds

Abstract

For each contact diffeomorphism φ: (Q,) (Q,) of (Q,), we equip its mapping torus Mφ with a locally conformal symplectic form of Banyaga's type, which we call the lcs mapping torus of contact diffeomorphism φ. In the present paper, we consider the product Q × S1= Mid (corresponding to φ = id) and develop basic analysis of the associated J-holomorphic curve equation, which has the form ∂π w = 0, w*λ j = f*dθ for the map u = (w,f): Q × S1 for the λ-compatible almost complex structure J and a punctured Riemann surface ( , j). In particular, w is a contact instanton in the sense of [OW2, OW3]. We develop a scheme of treating the non-vanishing charge by introducing the notion of charge class in H1( , Z) and develop the geometric framework for the study of pseudoholomorphic curves, a correct choice of energy and the definition of moduli spaces towards the construction of compactification of the moduli space on the lcs-fication of (Q,λ) (more generally on arbitrary locally conformal symplectic manifolds).