Numerical integration based on quasi-interpolating splines C Dagnino, V Demichelis, E Santi Computing (Wien. Print) 50 (2), 149-163, 1993 | 52 | 1993 |
Numerical integration of 2‐D integrals based on local bivariate C 1 quasi‐interpolating splines C Dagnino, P Lamberti Advances in Computational Mathematics 8, 19-31, 1998 | 34 | 1998 |
Spline product quadrature rules for Cauchy singular integrals C Dagnino, E Santi Journal of computational and applied mathematics 33 (2), 133-140, 1990 | 32 | 1990 |
On the solution of Fredholm integral equations based on spline quasi-interpolating projectors C Dagnino, S Remogna, P Sablonnière BIT Numerical Mathematics 54, 979-1008, 2014 | 31 | 2014 |
Some performances of local bivariate quadratic C1 quasi-interpolating splines on nonuniform type-2 triangulations C Dagnino, P Lamberti Journal of computational and applied mathematics 173 (1), 21-37, 2005 | 28 | 2005 |
On the convergence of spline product quadratures for Cauchy principal value integrals C Dagnino, E Santi Journal of computational and applied mathematics 36 (2), 181-187, 1991 | 27 | 1991 |
Numerical integration over polygons using an eight-node quadrilateral spline finite element CJ Li, P Lamberti, C Dagnino Journal of computational and applied mathematics 233 (2), 279-292, 2009 | 26 | 2009 |
Product integration of singular integrands using quasi-interpolatory splines C Dagnino, P Rabinowitz Computers & Mathematics with Applications 33 (1-2), 59-67, 1997 | 26 | 1997 |
On the approximation power of bivariate quadratic C1 splines C Dagnino, P Lamberti Journal of computational and applied mathematics 131 (1-2), 321-332, 2001 | 24 | 2001 |
An algorithm for numerical integration based on quasi-interpolating splines. C Dagnino, V Demichelis, E Santi Numer. Algorithms 5 (9), 443-452, 1993 | 22 | 1993 |
On the construction of local quadratic spline quasi-interpolants on bounded rectangular domains C Dagnino, P Lamberti Journal of computational and applied mathematics 221 (2), 367-375, 2008 | 21 | 2008 |
On the evaluation of one-dimensional Cauchy principal value integrals by rules based on cubic spline interpolation C Dagnino, E Santi Computing 43 (3), 267-276, 1990 | 19 | 1990 |
Error bounds on the approximation of functions and partial derivatives by quadratic spline quasi-interpolants on non-uniform criss-cross triangulations of a rectangular domain C Dagnino, S Remogna, P Sablonnière BIT Numerical Mathematics 53, 87-109, 2013 | 17 | 2013 |
Numerical evaluation of Cauchy principal value integrals based on local spline approximation operators C Dagnino, P Lamberti Journal of computational and applied mathematics 76 (1-2), 231-238, 1996 | 16 | 1996 |
Local spline approximation methods for singular product integration C Dagnino, V Demichelis, E Santi Approximation Theory and its Applications 12 (3), 37-51, 1996 | 16 | 1996 |
Product integration of piecewise continuous integrands based on cubic splineinterpolation at equally spaced nodes C Dagnino, AP Orsi Numerische Mathematik 52 (4), 459-466, 1988 | 15 | 1988 |
Point and differential C1 quasi-interpolation on three direction meshes D Barrera, C Dagnino, MJ Ibáñez, S Remogna Journal of Computational and Applied Mathematics 354, 373-389, 2019 | 14 | 2019 |
Spline quasi-interpolating projectors for the solution of nonlinear integral equations C Dagnino, A Dallefrate, S Remogna Journal of Computational and Applied Mathematics 354, 360-372, 2019 | 14 | 2019 |
Quasi-interpolation by C1 quartic splines on type-1 triangulations D Barrera, C Dagnino, MJ Ibáñez, S Remogna Journal of Computational and Applied Mathematics 349, 225-238, 2019 | 14 | 2019 |
Extended product integration rules C Dagnino BIT Numerical Mathematics 23, 487-499, 1983 | 14 | 1983 |