Can anyone tell me what are the prerequisites to learning lambda calculus (if any)?

That really depends on what you want to do with the lambda calculus. If you want to learn it just to see how it works there really aren't any prerequisites; it's pretty selfcontained. However, if you want to understand any of the proofs about it (Turingcompleteness, Church numerals, normalization, etc.) you might need more math prereqs. In particular, I'd suggest a background in inductive proof techniques, especially structural induction. It also might be nice to know a little about either the halting problem or some sort of incompleteness theorem, since some of the fun results with lambda calculus involve noncomputability. 


There are no prerequisites for understanding the Lambda Calculus itself. If you are not a computer scientist and don't even know recursion, you can learn the basics of (untyped) Lambda Calculus informally in about 30 minutes here: http://palmstroem.blogspot.de/2012/05/lambdacalculusforabsolutedummies.html This should give you a working intuition about what it does and how it works. If you are familiar with basic mathematical notations and recursive definitions, you can go for a standard introduction. Especially, if you want to learn about the Lambda Calculus as a basis for Haskell, you should delve into the depths of the typed Lambda Calculus: http://www.cse.chalmers.se/research/group/logic/TypesSS05/Extra/geuvers.pdf 

