[摘要] In this paper, we introduce a new class of generalized polynomials associated with the modified Milne-Thomson's polynomials $\Phi_{n}^{(\alpha)}(x,\nu)$ of degree n and order $\alpha$ introduced by Dere and Simsek. The concepts of Poly-Bernoulli numbers $B_n^{(k)}(a,b)$, Poly-Bernoulli polynomials $B_n^{(k)}(x,a,b)$ of Joalny et al, Hermite-Bernoulli polynomials ${_HB}_n(x,y)$ of Dattoli et al and ${_HB}_n^{(\alpha)} (x,y)$ of Pathan et al are generalized to the one $ {_HB}_n^{(k)}(x,y,a,b,c)$ which is called the generalized polynomials depending on three positive real parameters. Numerous properties of these polynomials and some relationships between $B_n^{(k)}(a,b)$, $B_n^{(k)}(x,a,b)$, $B_n^{(k)}(x;a,b,c)$ and ${}_HB_n^{(k)}(x,y;a,b,c)$ are established. Some implicit summation formulae and general symmetry identities are derived by using different analytical means and applying generating functions. These results extend some known summations and identities of generalized Poly-Bernoulli numbers and polynomials.