Jim, Why talk about complex interrelated variables when you could be talking about constants?
As a comet nears the Sun, it's present velocity and kinetic energy increase; so do the velocity and kinetic energy required to escape the Sun's gravity at the comet's present distance from the sun. The difference between present kinetic energy and escape kinetic energy remains constant---so long as no 3rd body interferes. Why talk about the difference between present kinetic energy and escape kinetic energy---both of which are constantly changing---when we could be talking about things that remain constant?
A comet's total energy relative to the Sun (kinetic + potential) is constant, as long as no 3rd body interferes. If we talk about a comet's total energy, there is ONE constant, Ex, for all comets under the Sun's influence. If a comet's total energy is less than Ex, it is an Oort Cloud comet, with an ellyptical orbit. If its total energy is exactly equal to Ex, it is an interstell comet with a parabolic trajectory. If it's total energy is greater than Ex, it is an interstellar comet with a hyperbolic trajectory.
<b>{EDIT, added 2005/07/16, 05:00 UT: </b>
Oops! I meant to say that that <b>Ex/M</b> is the same for all comets. Obviously, a more massive comet will need more energy to escape the Sun's gravity.
Also, I should note that potential energy is calculated relative to some arbitrary distance from the Sun; it could be relative to the Sun's center, the Sun's surface, the comet's perihelion or aphelion, or it could be relative to infinite distance from the Sun. We must choose a reference distance and stick with it.
Let's choose infinite distance. Then, a comet at the farthest extent of the Oort cloud has near zero potential energy. If it is an Oort Cloud comet at its aphelion, its kinetic energy and total energy are also near zero; we'll give it a gentle horizontal nudge to keep if from crashing into the Sun. As it falls toward the Sun, it's kinetic energy will increase and its potential energy will be go negative by the same amount, keeping the total energy at zero. At perihelion, the comet will have velocity Vx which is the escape velocity for that distance from the Sun. The kinetic energy will then be M(Vx squared) and potential energy will be -M(Vx squared).
If energy is lost to a planet on the way down, the perihelion may be higher or lower than it would have been. Kinetic energy at the new perihelion will less than M(Vx squared), where Vx is escape velocity at the new perihelion.
But why don't we forget about all that perihelion and escape velocity and kinetic and potential; let's just say, the comet lost energy, therefore its total energy is now less that zero, so the comet has too little energy to get back where it came from.
<b>END OF EDIT)</b>
Aside from collisions, the Sun, alone, cannot capture an interstellar comet. Only by passing on the left side of a planet (north being up) can in interstellar comet lose energy to the planet and possibly become an Oort Cloud comet. Conversely, an Oort Cloud comet might pass on the right side of a planet and be sling shotted out of the Sun's sphere of influence (much like the Voyager space capsules).
Yes, solar wind and tidal friction do influence comets very slightly. If a comet is about to pass almost close enough to a planet to be thrown into or out of the Oort Cloud, the solar wind and tidal effects might just tip the scale one way or the other. I believe these effects are statistically more likely to tip the scale in the direction of capture. These effects may slightly increase the total number of captured comets over a period of billions of years.
