Browsing by Author "Murid, AHM"
Now showing 1 - 6 of 6
Results Per Page
Sort Options
- Some of the metrics are blocked by yourconsent settings
Publication Conformal Mapping of Unbounded Multiply Connected Regions onto Canonical Slit Regions(Hindawi Ltd, 2012) ;Yunus, AAM ;Murid, AHMNasser, MMSWe present a boundary integral equation method for conformal mapping of unbounded multiply connected regions onto five types of canonical slit regions. For each canonical region, three linear boundary integral equations are constructed from a boundary relationship satisfied by an analytic function on an unbounded multiply connected region. The integral equations are uniquely solvable. The kernels involved in these integral equations are the modified Neumann kernels and the adjoint generalized Neumann kernels. - Some of the metrics are blocked by yourconsent settings
Publication Conformal Mapping of Unbounded Multiply Connected Regions onto Logarithmic Spiral Slit with Infinite Straight Slit(Amer Inst Physics, 2017) ;Yunus, AAMMurid, AHMThis paper presents a boundary integral equation method with the adjoint generalized Neumann kernel for conformal mapping of unbounded multiply connected regions. The canonical region is the entire complex plane bounded by an infinite straight slit on the line Im omega = 0 and finite logarithmic spiral slits. Some linear boundary integral equations are constructed from a boundary relationship satisfied by an analytic function on a multiply connected region. These integral equations are uniquely solvable. The kernel involved in these integral equations is the adjoint generalized Neumann kernel. - Some of the metrics are blocked by yourconsent settings
Publication Numerical conformal mapping and its inverse of unbounded multiply connected regions onto logarithmic spiral slit regions and straight slit regions(Royal Soc, 2014) ;Yunus, AAM ;Murid, AHMNasser, MMSThis paper presents a boundary integral equation method with the adjoint generalized Neumann kernel for computing conformal mapping of unbounded multiply connected regions and its inverse onto several classes of canonical regions. For each canonical region, two integral equations are solved before one can approximate the boundary values of the mapping function. Cauchy's-type integrals are used for computing the mapping function and its inverse for interior points. This method also works for regions with piecewise smooth boundaries. Three examples are given to illustrate the effectiveness of the proposed method. - Some of the metrics are blocked by yourconsent settings
Publication Numerical Conformal Mapping onto the Exterior Unit Disk with a Straight Slit and Logarithmic Spiral Slits(IOP Publishing Ltd, 2019) ;Murid, AHM ;Yunus, AAMNasser, MMSThis paper presents a fast boundary integral equation method for numerical conformal mapping of unbounded multiply connected regions onto a disk with an infinite straight slit and finite logarithmic spiral slits. Some numerical examples are given to show the effectiveness of the proposed method. - Some of the metrics are blocked by yourconsent settings
Publication Numerical Evaluation of Conformal Mapping and its Inverse for Unbounded Multiply Connected Regions(Malaysian Mathematical Sciences Soc, 2014) ;Yunus, AAM ;Murid, AHMNasser, MMSA boundary integral equation method for numerical evaluation of the conformal mapping and its inverse from unbounded multiply connected regions onto five canonical slit regions is presented in this paper. This method is based on a uniquely solvable boundary integral equation with the adjoint generalized Neumann kernel. This method is accurate and reliable. Some numerical examples are presented to illustrate the effectiveness of this method. - Some of the metrics are blocked by yourconsent settings
Publication Radial Slits Maps of Unbounded Multiply Connected Regions(Amer Inst Physics, 2013) ;Yunus, AAM ;Murid, AHMNasser, MMSThis paper presents a boundary integral equation method for conformal mapping of an unbounded multiply connected region onto a radial slits region. Two linear boundary integral equations are constructed from a boundary relationship satisfied by an analytic function on an unbounded multiply connected region. These integral equations are uniquely solvable. The kernels involved in these integral equations are the adjoint generalized Neumann kernels. Two numerical examples are presented to show the effectiveness of the proposed method.