You need to have a good dynamics model of the system you are trying to estimate in order for a Kalman filter to make sense for the application. E.g., for an airplane you've got physics of flight associated with that particular airplane along with accelerometer & gyro & baro altimeter etc inputs as well. This dynamics model is needed in order to develop a meaningful Kalman filter for estimating system properties (like position and velocity). The dynamics model would be able to propagate the airplane position and velocity etc in the absence of GPS updates. The GPS updates would be used by the Kalman filter to augment and correct the estimated position and velocity.
You don't have any such dynamics model for your bird. The only thing you apparently have are the GPS measurements themselves. You have nothing that can be used to propagate the bird position and velocity in any meaningful way in the absence of the GPS measurements, so trying to develop a Kalman filter that somehow incorporates those GPS measurements makes no sense.
If you somehow thought for some reason that the GPS measurements were too erratic and needed smoothing in some fashion, or you are trying to develop some type of curve fitting or interpolation scheme for those in between points, that's a different issue.
