A study on partial dynamic equation on time scales involving derivatives of polynomials

Abstract

Let P(m,b,x) be a 2m+1-degree polynomial in x,b. Let be a two-dimensional timescale 2 = T1 × T2 = \t=(x, b) \; x∈T1, \; b∈T2 \ such that T1 = T2. In this manuscript we derive and discuss an identity that connects the timescale derivative of odd-power polynomial with partial derivatives of polynomial P(m,b,x) evaluated in particular points. For every t∈T1 and (x,b) ∈ 2 \[ x2m+1 x(t) = ∂ P(m,b,x) x (m, σ(t), t) + ∂ P(m,b,x) b (m, t, t) \] such that σ(t) > t is forward jump operator. In addition, we discuss various derivative operators in context of partial cases of above equation, we show finite difference, classical derivative, q-derivative, q-power derivative on behalf of it.