Dear Colleague,

A short note -- our recently developed "todo" list to finish
the analysis of the E00-102 data:

1.  determine the "reduced" yield on an event-by-event basis.
    Employ symmetric R-factor cuts of 0.05.

2.  bin the data according to (\omega, Q2, pmiss) with bin
    sizes to be determined

    - plot \phi_reduced (out-of plane-angle) for reals and
      accidentals, normalize and subtract

    - correct these data for "experimental factors" (such as
      left-arm EDT and more importantly right-arm EDT, anything
      else remaining)

    - normalize by the H(e,e) yield to determine the relative
      cross section

    - require a phase-space population of 50% or more (to begin
      with) and divide \phi_i by the phase space to get relative \sigma_i

    - apply radiative corrections

3.  examine the \phi distribution to extract relative R_LT

    - fit, no phase-space matching required

    - evaluate based on moments, phase-space matching required

    - apply the difference method, phase-space matching required

      (all answers should be the same, all methods will not work
       for all kinematics)

4.  extract the \phi distribution to extract relative A_LT

    - fit, no phase-space matching required

    - evaluate based on moments, phase-space matching required

    - apply the difference method, phase-space matching required

      (all answers should be the same, all methods will not work
       for all kinematics)

5.  average over Q2, \omega

6.  normalize

To be addressed in the immediate future:

1.  multitrack correction
2.  phase-space cut
3.  reduced cross section for A+/-, D+/-
4.  \omega vs. Q2 as a function of pmiss to determine binning