Narayana polynomials are a class of polynomials whose coefficients are the Narayana numbers. The Narayana numbers and Narayana polynomials are named after the Canadian mathematician T. V. Narayana (1930–1987). They appear in several combinatorial problems.[1][2][3]

Definitions

For a positive integer and for an integer such that , the Narayana number is defined by

The number is defined as . For a positive integer , the -th Narayana polynomial is defined by

.

The polynomial is defined as the constant polynomial . The associated Narayana polynomial is defined by

.

The first few Narayana polynomials are

Properties

A few of the properties of the Narayana polynomials and the associated Narayana polynomials are collected below. Further information on the properties of these polynomials are available in the references cited.

Alternative form of the Narayana polynomials

The Narayana polynomials can be expressed in the following alternative form:[4]

Special values

  • is the -th Catalan number . The first few Catalan numbers are . (sequence A000108 in the OEIS).[5]
  • is the -th large Schröder number. This is the number of plane trees having edges with leaves colored by one of two colors. The first few Schröder numbers are . (sequence A006318 in the OEIS).[5]
  • For integers , let denote the number of underdiagonal paths from to in a grid having step set . Then .[6]

Recurrence relations

  • For , satisfies the following nonlinear recurrence relation:[6]
.
  • For , satisfies the following second order linear recurrence relation:[6]
with and .

Integral representation

The -th degree Legendre polynomial is given by

Then, the Narayana polynomial can be expressed in the following form:

  • .

See also

References

  1. D. G. Rogers (1981). "Rhyming schemes: Crossings and coverings" (PDF). Discrete Mathematics. 33: 67–77. doi:10.1016/0012-365X(81)90259-4. Retrieved 2 December 2023.
  2. R.P. Stanley (1999). Enumerative Combinatorics, Vol. 2. Cambridge University Press.
  3. Rodica Simian and Daniel Ullman (1991). "On the structure of the lattice of noncrossing partitions" (PDF). Discrete Mathematics. 98 (3): 193–206. doi:10.1016/0012-365X(91)90376-D. Retrieved 2 December 2023.
  4. Ricky X. F. Chen and Christian M. Reidys (2014). "Narayana polynomials and some generalizations". arXiv:1411.2530 [math.CO].
  5. 1 2 Toufik Mansour, Yidong Sun (2008). "Identities involving Narayana polynomials and Catalan numbers". arXiv:0805.1274 [math.CO].
  6. 1 2 3 Curtis Coker (2003). "Enumerating a class oflattice paths" (PDF). Discrete Mathematics. 271 (1–3): 13–28. doi:10.1016/S0012-365X(03)00037-2. Retrieved 1 December 2023.
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