Korous type inequalities for orthogonal polynomials in two variables

Rok, strany: 2014, 1 - 12

J. Korous reached an important result for general orthogonal polynomials in one variable. He dealt with the boundedness and uniform boundedness of polynomials $\bl\{P_n(x)\br\}_n=0^∞$ orthonormal with the weight function

$$ h(x)=δ (x)\widetilde{h}(x), $$

where $\widetilde{h}(x)$ is the weight function of another system of polynomials $\bl\{\widetilde{P}_n(x)\br\}_n=0^∞$ orthonormal in the same interval and

$$ δ(x)≥ δ ₀ >0 $$

is a certain function. We generalize this result for orthogonal polynomials in two variables multiplying their weight function $h(x,y)$ by a polynomial, dividing $h(x,y)$ by a polynomial, and multiplying $h(x,y)$ with separated variables by a certain function $δ (x,y)$.

ISO 690:

Ftorek, B., Oršanský, P. 2014. Korous type inequalities for orthogonal polynomials in two variables. In Tatra Mountains Mathematical Publications, vol. 58, no.1, pp. 1-12. 1210-3195.

APA:

Ftorek, B., Oršanský, P. (2014). Korous type inequalities for orthogonal polynomials in two variables. Tatra Mountains Mathematical Publications, 58(1), 1-12. 1210-3195.