Œ! and ŒP are the most common two-character atoms. I think it's OK to make code-page alternatives like § for ỵ and ẓ here.
eۯ is the most common trigraph. This is followed by A or D to get masks of alphabets/digits in a string.
⁼¥Ƈ is the second most common trigraph. I guess Ƒ was introduced a little later?
Apparently UÐe (reverse every other element) is a surprisingly common operation in golf.
condition + Ạ$Ƈ is common. Maybe this could be ÐẠ "filter-all".
QƑƇ is common: keep only elements that have no duplicates. It's like a meta version of Q. How about Œq?
I investigated Ø.,U and apparently this is common because people are writing Ø.,U$ to get [[0,1],[1,0]] and Ø.,U$;N$ to get [[0,1],[1,0],[0,-1],[-1,0]]. So these should both just be nilads. ØX and Øx maybe.
Perhaps ƝẠ$ could be ɲ. e.g. <ɲ checks if a list is strictly ascending.
ŒDṙL: I can see why you would want the diagonals in this order.
fØDV€ turns “a2b~3,f16!” into [2,3,1,6].
_²§½ is about point distances. I think there should be a dyad δ so that [3,3]δ[[3,4],[4,4],[5,3]] is 1,√(2),2.
I queried SE for new Jelly code since some suggestions in #69 got implemented (May 2018).
I did analysis on the CSV and got a new corpus with new most common {2,3,4}-graphs:
Remarks:
Œ!
andŒP
are the most common two-character atoms. I think it's OK to make code-page alternatives like§
forỵ
andẓ
here.eۯ
is the most common trigraph. This is followed byA
orD
to get masks of alphabets/digits in a string.⁼¥Ƈ
is the second most common trigraph. I guessƑ
was introduced a little later?UÐe
(reverse every other element) is a surprisingly common operation in golf.Ạ$Ƈ
is common. Maybe this could beÐẠ
"filter-all".QƑƇ
is common: keep only elements that have no duplicates. It's like a meta version ofQ
. How aboutŒq
?Ø.,U
and apparently this is common because people are writingØ.,U$
to get [[0,1],[1,0]] andØ.,U$;N$
to get [[0,1],[1,0],[0,-1],[-1,0]]. So these should both just be nilads.ØX
andØx
maybe.ƝẠ$
could beɲ
. e.g.<ɲ
checks if a list is strictly ascending.ŒDṙL
: I can see why you would want the diagonals in this order.fØDV€
turns“a2b~3,f16!”
into[2,3,1,6]
._²§½
is about point distances. I think there should be a dyadδ
so that[3,3]δ[[3,4],[4,4],[5,3]]
is1,√(2),2
.œc3
into a monadŒƈ
.