Brill-Noether generality of binary curves

Abstract: We show that the space $G^r_{\underline d}(X)$ of linear series of certain multi-degree $\underline d=(d_1,d_2)$ (including the balanced ones) and rank r on a general genus-g binary curve X has dimension $\rho _{g,r,d}=g-(r+1)(g-d+r)$ if nonempty, where $d=d_1+d_2$ . This generalizes Caporaso’s result from the case $r\leq 2$ to arbitrary rank, and shows that t… Show more

“…In the same way, Prym maps we studied in [6] via degeneration to binary curves. Moreover, these curves were also used as test models for results that hold for smooth curves but are yet unknown for singular ones, as in [2], [9] and [13].…”

Characterizing gonality for two-component stable curves

“…In the same way, Prym maps we studied in [6] via degeneration to binary curves. Moreover, these curves were also used as test models for results that hold for smooth curves but are yet unknown for singular ones, as in [2], [9] and [13].…”

Characterizing gonality for two-component stable curves