Trapped modes in a channel containing three layers of fluids and asubmerged cylinder (2005)
Chakrabarti, A, Daripa, P, Hamsapriye, *
The problem of existence of trapped waves in fluids due to a cylinderis investigated for the hydrodynamic set-up which involves a horizontal channel of infinite length and depth and of finite width...
Trapped modes in a channel containing three layers of fluids and a submerged cylinder (2005)
Chakrabarti, A, Daripa, P, Hamsapriye, *
The problem of existence of trapped waves in fluids due to a cylinder is investigated for the hydrodynamic set-up which involves a horizontal channel of infinite length and depth and of finite width...
Trapped modes in a channel containing three layers of fluids and asubmerged cylinder (2005)
Chakrabarti, A, Daripa, P, Hamsapriye, *
The problem of existence of trapped waves in fluids due to a cylinderis investigated for the hydrodynamic set-up which involves a horizontal channel of infinite length and depth and of finite width...
Trapped modes in a channel containing three layers of fluids and a submerged cylinder (2005)
Chakrabarti, A, Daripa, P, Hamsapriye, *
The problem of existence of trapped waves in fluids due to a cylinder is investigated for the hydrodynamic set-up which involves a horizontal channel of infinite length and depth and of finite width...
The Role of Special Functions in a Viscous Flow Problem Involving Two Cylinders (2000)
The theoretical understanding of slow, axi-symmetric, steady, creeping motion of viscous fluids, in the cylindrical geometry ${(\rho,\phi,z)}$ denoting the cylindrical coordinates of a material point...
The Role of Special Functions in a Viscous Flow Problem Involving Two Cylinders (2000)
The theoretical understanding of slow, axi-symmetric, steady, creeping motion of viscous fluids, in the cylindrical geometry ${(\rho,\phi,z)}$ denoting the cylindrical coordinates of a material point...
Simple methods are presented to derive closed-form expressions for the errors involved in the Lagrange interpolation formula. As applications of this formula for the error in the interpolation, the...
Simple methods are presented to derive closed-form expressions for the errors involved in the Lagrange interpolation formula. As applications of this formula for the error in the interpolation, the...
On modified Gregory rules based on a generalised mixed interpolation formula (1997)
A mixed interpolation function in its generalised form is used to derive the generalised modified Gregory formulae. These formulae are expressed in the form of the classical rules along with two...
On modified Gregory rules based on a generalised mixed interpolation formula (1997)
A mixed interpolation function in its generalised form is used to derive the generalised modified Gregory formulae. These formulae are expressed in the form of the classical rules along with two...
Modified quadrature rules based on a generalised mixed interpolation formula (1996)
In the present paper, based on a recently developed generalised mixed interpolation formula, which integrates exactly any linear combination of polynomials up to (n-2) degree and two other functions...
Derivation of a general mixed interpolation formula (1996)
A general procedure is developed to derive a mixed interpolation formula for approximating any (n + 1) times differentiable function f(x), for x \in [0,nh], by a function $f_n(x)$ of the type...
Modified quadrature rules based on a generalised mixed interpolation formula (1996)
In the present paper, based on a recently developed generalised mixed interpolation formula, which integrates exactly any linear combination of polynomials up to (n-2) degree and two other functions...
Derivation of a general mixed interpolation formula (1996)
A general procedure is developed to derive a mixed interpolation formula for approximating any (n + 1) times differentiable function f(x), for x \in [0,nh], by a function $f_n(x)$ of the type...