\newcommand{\etalchar}[1]{$^{#1}$} \providecommand{\bysame}{\leavevmode\hbox to3em{\hrulefill}\thinspace} \providecommand{\MR}{\relax\ifhmode\unskip\space\fi MR } % \MRhref is called by the amsart/book/proc definition of \MR. \providecommand{\MRhref}[2]{% \href{http://www.ams.org/mathscinet-getitem?mr=#1}{#2} } \providecommand{\href}[2]{#2} \begin{thebibliography}{DDLR11} \bibitem[Cre]{cremona:onlinetables} J.\thinspace{}E. Cremona, \emph{{E}lliptic {C}urves {D}ata}, \url{http://www.warwick.ac.uk/~masgaj/ftp/data/}. \bibitem[Cre97]{cremona:algs} \bysame, \emph{Algorithms for modular elliptic curves}, second ed., Cambridge University Press, Cambridge, 1997, \url{http://www.warwick.ac.uk/~masgaj/book/fulltext/}. \bibitem[DDLR11]{darmon_daub_lichtenstein_rotger:chow_heegner} Henri Darmon, Michael Daub, Sam Lichtenstein, and Victor Rotger, \emph{The {E}ffective {C}omputation of {I}terated {I}ntegrals and {C}how-{H}eegner {P}oints on {T}riple {P}roducts}, In Preparation (2011). \bibitem[Del02]{delaunay:thesis} Christophe Delaunay, \emph{Formes modulaires et invariants de courbes elliptiques d\'efinies sur $\mathbf{Q}$}, Th\`ese de Doctorat, Universit\'e Bordeaux I, available at \url{http://math.univ-lyon1.fr/~delaunay/}. \bibitem[Dok04]{dokchitser:lfun} Tim Dokchitser, \emph{Computing special values of motivic {$L$}-functions}, Experiment. Math. \textbf{13} (2004), no.~2, 137--149, \url{http://arxiv.org/abs/math/0207280}. \MR{2068888 (2005f:11128)} \bibitem[DRS11]{darmon_rotger_sols:iterated} Henri Darmon, Victor Rotger, and Ignacio Sols, \emph{Iterated integrals, diagonal cycles and rational points on elliptic curves}, Preprint (2011), \url{http://www-ma2.upc.edu/vrotger/docs/DRS1.pdf}. \bibitem[GJP{\etalchar{+}}09]{bsdalg1} G.~Grigorov, A.~Jorza, S.~Patrikis, C.~Tarnita, and W.~Stein, \emph{Computational verification of the {B}irch and {S}winnerton-{D}yer conjecture for individual elliptic curves}, Math. Comp. \textbf{78} (2009), 2397--2425, \url{http://wstein.org/papers/bsdalg/}. \bibitem[GK92]{gross-kudla} Benedict~H. Gross and Stephen~S. Kudla, \emph{Heights and the central critical values of triple product {$L$}-functions}, Compositio Math. \textbf{81} (1992), no.~2, 143--209, \url{http://www.numdam.org.offcampus.lib.washington.edu/item?id=CM_1992__81_2_143_0}. \MR{1145805 (93g:11047)} \bibitem[MSD74]{mazur-swinnerton-dyer:arithmetic} B.~Mazur and P.~Swinnerton-Dyer, \emph{Arithmetic of {W}eil curves}, Invent. Math. \textbf{25} (1974), 1--61. \MR{50 \#7152} \bibitem[S{\etalchar{+}}11]{sage} W.\thinspace{}A. Stein et~al., \emph{{S}age {M}athematics {S}oftware ({V}ersion 4.6.2)}, The Sage Development Team, 2011, \url{http://www.sagemath.org}. \bibitem[Wat02]{watkins:moddeg} M.~Watkins, \emph{Computing the modular degree of an elliptic curve}, Experiment. Math. \textbf{11} (2002), no.~4, 487--502 (2003). \MR{1 969 641} \bibitem[YZZ11]{yuan-zhang-zhang:triple} X.~Yuan, S.~Zhang, and W.~Zhang, \emph{Triple product {$L$}-series and {G}ross-{S}choen cycles {I}: split case}, Preprint (2011), \url{http://www.math.columbia.edu/~yxy/preprints/triple.pdf}. \end{thebibliography}