AbstractIn this paper, we shall, by using Hamiltonian and Lagrangian formalism study the generalized Hermite operator: L=−∑j=1n∂2∂xj2+∑j,k=1nbjkxjxk. Given two points x0 and x in Rn, we count the number of “geodesics” connecting these two points. Here geodesics are defined as the projection of solutions of the Hamiltonian system onto the x-space. Then we construct the action function. Using the famous Van Vleckʼs formula, one may construct the heat kernel for the operator ∂∂t+L
AbstractIn this paper, we establish several new Lyapunov-type inequalities for the first-order nonli...
AbstractAn iterative method for solving nonlinear functional equations, viz. nonlinear Volterra inte...
In this paper we study the use of energy-conserving methods, in the class of Hamiltonian Boundary Va...
AbstractIn this paper, we prove some generalisations of several theorems given in [K.A. Driver, S.J....
AbstractWe obtain a simple algorithm for computing additional solutions of a weighted heat equation
AbstractIn a previous paper we have determined a generic formula for the polynomial solution familie...
AbstractWe present a simple method to calculate the Stokes matrix for the quantum cohomology of the ...
AbstractThe method of differentiation by integration due to Lanczos is generalized to cover derivati...
AbstractWe solve the inhomogeneous Hermite equation and apply this result to estimate the error boun...
AbstractThe exp-function method is used to find exact solutions of the generalized nonlinear heat co...
AbstractIt is shown that an appropriate combination of methods, relevant to generalized operational ...
AbstractWe construct a convex Hamiltonian diffeomorphism on the unit ball of cotangent bundle of Tn ...
We develop a new method of umbral nature to treat blocks of Her mite and of Hermite like poly- nom...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...
AbstractIn this paper, we establish several new Lyapunov-type inequalities for the first-order nonli...
AbstractAn iterative method for solving nonlinear functional equations, viz. nonlinear Volterra inte...
In this paper we study the use of energy-conserving methods, in the class of Hamiltonian Boundary Va...
AbstractIn this paper, we prove some generalisations of several theorems given in [K.A. Driver, S.J....
AbstractWe obtain a simple algorithm for computing additional solutions of a weighted heat equation
AbstractIn a previous paper we have determined a generic formula for the polynomial solution familie...
AbstractWe present a simple method to calculate the Stokes matrix for the quantum cohomology of the ...
AbstractThe method of differentiation by integration due to Lanczos is generalized to cover derivati...
AbstractWe solve the inhomogeneous Hermite equation and apply this result to estimate the error boun...
AbstractThe exp-function method is used to find exact solutions of the generalized nonlinear heat co...
AbstractIt is shown that an appropriate combination of methods, relevant to generalized operational ...
AbstractWe construct a convex Hamiltonian diffeomorphism on the unit ball of cotangent bundle of Tn ...
We develop a new method of umbral nature to treat blocks of Her mite and of Hermite like poly- nom...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...
AbstractIn this paper, we establish several new Lyapunov-type inequalities for the first-order nonli...
AbstractAn iterative method for solving nonlinear functional equations, viz. nonlinear Volterra inte...
In this paper we study the use of energy-conserving methods, in the class of Hamiltonian Boundary Va...