Oscillatory Weight Function at Robert Behrendt blog

Oscillatory Weight Function. this gaussian rule is truly optimal for oscillatory integrals of the form (1) throughout the frequency regime. The method is efficient for.  — in this paper we consider polynomials orthogonal with respect to an oscillatory weight function w (x) = x e i m. in this paper we use a complex oscillatory weight function w(x)defined on [−1,1 ]by w(x)=xeim x, where m is an integer. Cvetkovi¶c abstract in this paper we.  — in this paper we consider polynomials orthogonal with respect to an oscillatory weight function.  — for signed weight function, it holds for all even n if w is a weight function on [−1,1] and det µ2(k+j)−1 n k,j=1 6= 0, for.  — in this paper we consider weighted integrals with respect to a modification of the generalized laguerre. a collocation method for approximating integrals of rapidly oscillatory functions is presented.

in this paper we use a complex oscillatory weight function w(x)defined on [−1,1 ]by w(x)=xeim x, where m is an integer.  — in this paper we consider polynomials orthogonal with respect to an oscillatory weight function w (x) = x e i m. this gaussian rule is truly optimal for oscillatory integrals of the form (1) throughout the frequency regime. a collocation method for approximating integrals of rapidly oscillatory functions is presented.  — in this paper we consider weighted integrals with respect to a modification of the generalized laguerre.  — for signed weight function, it holds for all even n if w is a weight function on [−1,1] and det µ2(k+j)−1 n k,j=1 6= 0, for. Cvetkovi¶c abstract in this paper we.  — in this paper we consider polynomials orthogonal with respect to an oscillatory weight function. The method is efficient for.

Figure 1 from Numerical Integration of Highly Oscillating Functions

Oscillatory Weight Function  — in this paper we consider polynomials orthogonal with respect to an oscillatory weight function w (x) = x e i m. Cvetkovi¶c abstract in this paper we. a collocation method for approximating integrals of rapidly oscillatory functions is presented. this gaussian rule is truly optimal for oscillatory integrals of the form (1) throughout the frequency regime. in this paper we use a complex oscillatory weight function w(x)defined on [−1,1 ]by w(x)=xeim x, where m is an integer.  — in this paper we consider polynomials orthogonal with respect to an oscillatory weight function w (x) = x e i m. The method is efficient for.  — in this paper we consider weighted integrals with respect to a modification of the generalized laguerre.  — in this paper we consider polynomials orthogonal with respect to an oscillatory weight function.  — for signed weight function, it holds for all even n if w is a weight function on [−1,1] and det µ2(k+j)−1 n k,j=1 6= 0, for.