User blog:Primussupremus/Notation based on chained arrow notation.

This notation is based on Chained arrow notation using this notation we can express longer and longer chains in the shortest way possible. To start off I will need to give you some examples: 10→10→10→10=10→(3) the 3 in the brackets represent how many arrows are in the chain. 5→6→7=5|6|7→7(2) if you have different elements in the chain say for 5→6→7 then you place|'s between them. K Lets say you have 6 elements and 2 of them are the same: 2→3→4→2→5→6 because you have two 2's you do this (2,2)→(3→4)→(5→6) the comma in between the two 2's is used to group them together the expression (2,2)→(3→4)→(5→6) is still the same as 2→3→4→2→5→6 by the way. Lets try another example 100→100→100→100→100→100→100→100→100→100...100→100→100→100→100→100→100→100→100→100 where the number of arrows in the chain is 100→100→100→100→100→100→100→100→100→100. This is my Marmalade number that I defined in an earlier blog post but how can we express this in a more elegant way.

100→(9)|100→(9) the second 100→(9) represents the number of things in the chain. To finish off I have some questions to ask: Do you think that this is a good way of making chains look more elegant or is there room for improvement? If so how can I improve?