AbstractThis paper based on the Levin collocation method and Levin-type method together with composite two-point Gauss–Legendre quadrature presents efficient quadrature for integral transformations of highly oscillatory functions with critical points. The effectiveness and accuracy of the quadrature are tested
We consider the integration of one-dimensional highly oscillatory functions. Based on analytic conti...
AbstractPerformance of an improved-Levin quadrature method for oscillatory integrals is studied. In ...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
New methods are proposed for evaluation of one-dimensional highly oscillatory integrals with and wit...
Numerical approximation of highly oscillatory functions is an area of research that has received con...
Numerical approximation of highly oscillatory functions is an area of research that has received con...
The last few years have witnessed substantive developments in the computation of highly oscillatory ...
The last few years have witnessed substantive developments in the computation of highly oscillatory ...
AbstractThis paper shows that for any suitably smooth function f(x) and arbitrarily selected interpo...
Summary. The last few years have witnessed substantive developments in the com-putation of highly os...
Abstract. We consider two types of highly oscillatory bivariate integrals with a nondegenerate criti...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
We construct and analyze Gauss-type quadrature rules with complex-valued nodes and weights to approx...
We consider the integration of one-dimensional highly oscillatory functions. Based on analytic conti...
AbstractPerformance of an improved-Levin quadrature method for oscillatory integrals is studied. In ...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
New methods are proposed for evaluation of one-dimensional highly oscillatory integrals with and wit...
Numerical approximation of highly oscillatory functions is an area of research that has received con...
Numerical approximation of highly oscillatory functions is an area of research that has received con...
The last few years have witnessed substantive developments in the computation of highly oscillatory ...
The last few years have witnessed substantive developments in the computation of highly oscillatory ...
AbstractThis paper shows that for any suitably smooth function f(x) and arbitrarily selected interpo...
Summary. The last few years have witnessed substantive developments in the com-putation of highly os...
Abstract. We consider two types of highly oscillatory bivariate integrals with a nondegenerate criti...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
We construct and analyze Gauss-type quadrature rules with complex-valued nodes and weights to approx...
We consider the integration of one-dimensional highly oscillatory functions. Based on analytic conti...
AbstractPerformance of an improved-Levin quadrature method for oscillatory integrals is studied. In ...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
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