Abstract
In the current investigation, we obtain the generating function for Hermite-based degenerate Bernoulli polynomials attached to chi of higher order using p-adic methods over the ring of integers. Useful identities, formulae and relations with well known families of polynomials and numbers including the Bernoulli numbers, Daehee numbers and the Stirling numbers are established. We also give identities of symmetry and additive property for Hermite-based generalized degenerate Bernoulli polynomials attached to chi of higher order. Results are supported by remarks and corollaries.