On number and evenness of solutions of the SU(3) Toda system on flat tori with non-critical parameters

Abstract

We study the SU(3) Toda system with singular sources \[ cases u+2eu-ev=4πΣk=0m n1,kδpk on \; Eτ,\\ v+2ev-eu=4π Σk=0m n2,kδpk on \; Eτ, cases \] where Eτ:=C/(Z+Zτ) with Imτ>0 is a flat torus, δpk is the Dirac measure at pk, and ni,k∈Z≥ 0 satisfy Σkn1,k Σk n2,k 3. This is known as the non-critical case and it follows from a general existence result of BJMR that solutions always exist. In this paper we prove that (i) The system has at most \[13× 2m+1Πk=0m(n1,k+1)(n2,k+1)(n1,k+n2,k+2)∈N\] solutions. We have several examples to indicate that this upper bound should be sharp. Our proof presents a nice combination of the apriori estimates from analysis and the classical B\'ezout theorem from algebraic geometry. (ii) For m=0 and p0=0, the system has even solutions if and only if at least one of \n1,0, n2,0\ is even. Furthermore, if n1,0 is odd, n2,0 is even and n1,0<n2,0, then except for finitely many τ's modulo SL(2,Z) action, the system has exactly n1,0+12 even solutions. Differently from BJMR, our proofs are based on the integrability of the Toda system, and also imply a general non-existence result for even solutions of the Toda system with four singular sources.