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6 votes
0 answers
381 views

Reference request: colored Motzkin path interpretation of Catalan numbers

Recall that a Dyck path of length $2n$ is a lattice path in $\mathbb{Z}^2$ from $(0,0)$ to $(2n,0)$ consisting of $n$ up steps $U=(1,1)$ and $n$ down steps $D=(1,-1)$ which never goes below the $x$-...
Sam Hopkins's user avatar
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10 votes
0 answers
349 views

A bijective proof for the odd companion to Shapiro's Catalan convolution

Shapiro's Catalan convolution is the following formula (where $C_n$ is the $n$th Catalan number): $$ \sum_{k=0}^{n}{C_{2k}C_{2(n-k)}}=4^nC_n. $$ In other words, letting $C(z)=\sum_{n=0}^{\infty}{C_nz^...
Alexander Burstein's user avatar
30 votes
1 answer
1k views

Mysterious symmetry - in search for a bijection

I have a mysterious symmetry that I have not managed to prove. First some definitions (see picture below) Fix a partition that fit in a staircase shape with $n$ rows. There are $Catalan(n)$ such ...
Per Alexandersson's user avatar
10 votes
1 answer
753 views

Curious Catalan convolutions

Question. Do these identities involving even-index Catalan numbers have a known combinatorial interpretation? They look as though they should. I haven’t seen one in the literature. $$\sum_{a+b=n}C_{...
Robin Houston's user avatar
4 votes
2 answers
599 views

Is there a combinatorial interpretation or bijective proof for this Catalan number identity?

Is there any combinatorial interpretation or bijective proof for this identity $$2C_n=4{2n \choose n}-{2n+2 \choose n+1}$$ where $C_n$ is the sequence of Catalan numbers?
Radmir Sultamuratov's user avatar