Caloric polynomial

Caloric polynomial

In differential equations, the "m"th-degree caloric polynomial (or heat polynomial) is a "parabolically "m"-homogeneous" polynomial "P""m"("x", "t") that satisfies the heat equation

: frac{partial P}{partial t} = frac{partial^2 P}{partial x^2}.

"Parabolically "m"-homogeneous" means

: P(lambda x, lambda^2 t) = lambda^m P(x,t) ext{ for }lambda > 0.,

The polynomial is given by

: P_m(x,t) = sum_{ell=0}^{lfloor m/2 floor} frac{m!}{ell!(m - 2ell)!} x^{m - 2ell} t^ell.

It is unique up to a factor.

With "t" = −1, this polynomial reduces to the "m"th-degree Hermite polynomial in "x".

References

*citation|first=John|last=Cannon|title=The One-Dimensional Heat Equation|publisher=Addison-Wesley|year=1984|series=Encyclopedia of mathematics and its applications|isbn=0-521-30243-9

External links

* [http://arxiv.org/pdf/math.AP/0612506.pdf Zeroes of complex caloric functions and singularities of complex viscous Burgers equation]


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