| Abstract: | Vector‐valued frames were first introduced under the name of superframes by Balan in the context of signal multiplexing and by Han and Larson from the mathematical aspect. Since then, the wavelet and Gabor frames in  have interested many mathematicians. The space  models vector‐valued causal signal spaces because of the time variable being nonnegative. But it admits no nontrivial shift‐invariant system and thus no wavelet or Gabor frame since  is not a group by addition (not as  ). Observing that  is a group by multiplication, we, in this paper, introduce a class of multiplication‐based dilation‐and‐modulation (  ) systems, and investigate the theory of  frames in  . Since  is not closed under the Fourier transform, the Fourier transform does not fit  . We introduce the notion of Θa transform in  , and using Θa‐transform matrix method, we characterize  frames, Riesz bases, and dual frames in  and obtain an explicit expression of  duals for an arbitrary given  frame. An example theorem is also presented. |
