For detection of distant galaxies by gravitational lensing-induced magnification, roughly what are the distance ratios from the lensing systems?

Question

Discussion in comments under the question Does seeing a gravitationally lensed/magnified galaxy imply that they could also see us as well? have got me wondering about the geometry behind detection of distant galaxies that were made possible by gravitational lensing-induced magnification (in size but more importantly in brightness) like the scenarios discussed in What exactly is it that is being magnified 50 times in this gravitational lensing observation? and its answers.

Acknowledging that these are not simple lenses with well-defined focal lengths, we perhaps can no longer relate the magnification to the ratio of the distances from the lens to the conjugate focal planes. So I'd like to ask.

Question: For detection scenarios of distant galaxies that were made possible by gravitational lensing-induced magnification, roughly what are the distance ratios from the lensing systems to the observing and detecting galaxies?

note: In this question the "detecting galaxy" is always our galaxy

Is it like 1:10? Or 1:1000. Or larger? Or smaller?

---

Related questions and answers, some may provide helpful examples for this question:

• Within a given image of a multiple-image producing gravitational lens, does Fermat's principle apply?
• Cases of gravitational lensing resulting in a recognizable image of an extended object?
• How are all the intermediate images between the "lensed" and "unlensed" endpoints of this video generated?
• If I can't unscramble an egg, how do Astronomers unscramble views gravitationally lensed by complex mass distributions?
• Has a gravitational microlensing event ever been predicted? If so, has it been observed?
• Are astronomers waiting to see something in an image from a gravitational lens that they've already seen in an adjacent image?
• How well conserved is etendue in extreme gravitational lensing scenarios?
• Can weak gravitational lensing or microlensing-induced wavefront distortion limit resolution of absurdly large aperture telescopes?

Answer 1

For $z < 1.5$ the diameter distance grows linearly so we have,

$$\sqrt{\frac{D_{LS}}{D_S D_L}} = \sqrt{\frac{1 - D_L/D_S}{D_L}}$$ If the source galaxy is twice as far as the lens galaxy, then the deflections are at about 70% of the maximum at infinity. But, if the source is only 1% farther, then the effect is only 10% of maximum.

Therefore, the answer is that a source to lens anglar distance ratio smaller than 10:1 still has detectable lensing. A ratio of 2:1 gives nearly maximal magnification. A ratio of 1.01:1 would affect the photometry, but the source images will probably be within the lensing galaxy and may be hard to distinguish from galaxy structure. Whether lensing can be detected at such low ratios would depends on the light distribution of the lens.

For high z or for higher precision one should use the more precise formula for $D_{LS}$, and the above formula becomes: $$\sqrt{\frac{D_{LS}}{D_S D_L}} = \sqrt{\frac{1 - \frac{(1+Z_L)D_L}{(1+Z_S)D_S}}{D_L}}$$

which compensates for the angular diameter distance D_S slowly shrinking at high z. It is now saying that if the redshift ratio is 2:1 the lensing deflections can be reasonably strong.