Pages that link to "Item:Q2969390"

The following pages link to On Solving the Ill-Conditioned System Ax=b: General-Purpose Conditioners Obtained From the Boundary-Collocation Solution of the Laplace Equation, Using Trefftz Expansions With Multiple Length Scales (Q2969390):

Displaying 13 items.

• Optimally scaled vector regularization method to solve ill-posed linear problems (Q450287) (← links)
• A fast multiple-scale polynomial solution for the inverse Cauchy problem of elasticity in an arbitrary plane domain (Q521280) (← links)
• A multiple-scale Pascal polynomial for 2D Stokes and inverse Cauchy-Stokes problems (Q729513) (← links)
• Solving Helmholtz equation with high wave number and ill-posed inverse problem using the multiple scales Trefftz collocation method (Q1654843) (← links)
• A multiple-scale Pascal polynomial triangle solving elliptic equations and inverse Cauchy problems (Q1654875) (← links)
• A multiple scale Trefftz method for the Laplace equation subjected to large noisy boundary data (Q1654951) (← links)
• A Trefftz collocation method (TCM) for three-dimensional linear elasticity by using the Papkovich-Neuber solutions with cylindrical harmonics (Q1656392) (← links)
• A dynamical Tikhonov regularization for solving ill-posed linear algebraic systems (Q1938001) (← links)
• Regularized meshless method for nonhomogeneous problems (Q1944411) (← links)
• Numerical simulation of the two-dimensional sloshing problem using a multi-scaling Trefftz method (Q1944609) (← links)
• A multiple-scale Trefftz method for an incomplete Cauchy problem of biharmonic equation (Q2450998) (← links)
• A globally optimal tri-vector method to solve an ill-posed linear system (Q2511179) (← links)
• DRBEM solution of singularly perturbed coupled MHD flow equations (Q6539891) (← links)