A137307 - OEIS

A137307

A triangular sequence of coefficients of even plus odd Chebyshev polynomials, A053120: q(x,n) = T(x,2*n-1)+T(x,2*n).

1, 1, -1, 1, 2, 1, -3, -8, 4, 8, -1, 5, 18, -20, -48, 16, 32, 1, -7, -32, 56, 160, -112, -256, 64, 128, -1, 9, 50, -120, -400, 432, 1120, -576, -1280, 256, 512, 1, -11, -72, 220, 840, -1232, -3584, 2816, 6912, -2816, -6144, 1024, 2048, -1, 13, 98, -364, -1568, 2912, 9408, -9984, -26880, 16640, 39424, -13312, -28672, 4096, 8192

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OFFSET

1,5

COMMENTS

The row sums are all 2 and double integrations are all orthogonal except for the zero to one level.

This arose from an idea of Chladni Chebyshev's:

q(exp(i*t),n) = T(cos(2*Pi*t),2*n-1)+T(sin(2*Pi*t),2*n)

which are strange looping spirals.

LINKS

Table of n, a(n) for n=1..65.

FORMULA

q(x,n) = T(x,2*n-1)+T(x,2*n).

EXAMPLE

Triangle begins:

{1, 1},

{-1, 1, 2},

{1, -3, -8, 4, 8},

{-1, 5, 18, -20, -48, 16, 32},

{1, -7, -32, 56, 160, -112, -256, 64, 128},

{-1, 9, 50, -120, -400, 432, 1120, -576, -1280, 256, 512},

{1, -11, -72, 220, 840, -1232, -3584, 2816, 6912, -2816, -6144, 1024, 2048},

{-1, 13, 98, -364, -1568, 2912, 9408, -9984, -26880, 16640, 39424, -13312, -28672, 4096, 8192},

...

MATHEMATICA

Q[x_, n_] := ChebyshevT[2*n - 1, x] + ChebyshevT[2*n, x]; Table[ExpandAll[Q[x, n]], {n, 0, 10}]; a0 = Table[CoefficientList[Q[x, n], x], {n, 0, 10}]; Flatten[a0]

CROSSREFS

Cf. A053120.

Sequence in context: A248354 A260142 A194505 * A256420 A205391 A352858

Adjacent sequences: A137304 A137305 A137306 * A137308 A137309 A137310

KEYWORD

uned,tabf,sign

AUTHOR

Roger L. Bagula, Apr 20 2008

STATUS

approved