On difference equations of Kravchuk-Sobolev type polynomials of higher order

Abstract: In this contribution we consider sequences of monic polynomials orthogonal with respect to Sobolev-type inner product [ \left\langle f,g\right\rangle {\lambda,\mu}!=!\sum{x=0}^Nf(x)g(x)\frac{\Gamma(N+1) p^x(1-p)^{N-x} }{\Gamma (N-x+1) \Gamma(x+1) }+\lambda\Delta^j f(0)\Delta^j g(0)+\mu\Delta^j f(N)\Delta^j g(N), ] where $0<p <1$, $\lambda,\mu\in \mathbb R_{+}$, $n\leq N\in \mathbb Z_{+}$, $j\in \mathbb Z_{+}$ and $\Delta$ denotes the forward difference operators. We derive an explicit representation for these polynomials. In addition, the ladder operators associated with these polynomials are obtained. As a consequence, the linear difference equations of second order are also given.