In this research paper, we present a class of polynomials referred to as Apostol-type Hermite-Bernoulli/Euler polynomials Uν(x, y; ρ; µ), which can be given by the following generating function 2 − µ + µ 2 ξ ρeξ + (1 − µ) e xξ+yξ2 = X∞ ν=0 Uν(x, y; ρ; µ) ξ ν ν! , for some particular values of ρ and µ. Further, the summation formulae and determinant forms of these polynomials are derived. This novel family encompasses both the classical Appell-type polynomials and their noteworthy extensions. Our investigations heavily rely on generating function techniques, supported by illustrative examples to demonstrate the validity of our results. Furthermore, we introduce derivative and multiplicative operators, facilitating the definition of the Apostol-type Hermite-Bernoulli/Euler polynomials as a quasi-monomial set.
Appell-type polynomials, Bernoulli and Euler numbers and polynomials, Hermite polynomials, quasi-monomial