A way to visualize a rotation is with three perpendicular axis-ex. A quaternion is a more compact representation, but you can still view it as having three axis-es.
LookRotation will align one of the rotation axes to the given direction, but with only one direction there is one degree of freedom left, the other two rotation axes.
That is what the 'up' vector is for, it locks in one of the other axes and forces it to be perpendicular to both the direction and up-vector. The third rotation axis is always perpendicular to both, so we have three perpendicular axes, i.e. a complete rotation.
You can do something similar yourself with a cross product, since that produces a perpendicular vector to two others. Pseudocode:
var xDir = direction;
var zDir= xDir.CrossProduct(upVector)
var yDir = zDir.CrossProduct(xDir)
var matrix = CreateARotationMatrixFromAxises(xDir, yDir, zDir)
var quaternion = CreateQuaternionFromRotationMatrix(matrix)
Note that the direction and up-vector cannot be parallel, or you will get some kind of error.