INTERNATIONAL JOURNAL OF THEORETICAL PHYSICS, vol.51, no.12, pp.3963-3969, 2012 (SCI-Expanded)
We present the (1+1)-dimension Duffin-Kemmer-Petiau equation for the spin-0 and spin-1 cases with vector and scalar linear potentials in the context of modified quantum mechanics. The minimal length is characterized in the presence of a non-zero minimum uncertainty in position. The energy eigenvalues and eigenfunctions are obtained for both cases in the momentum space. There is an energy eigenvalue in spite of the n=0 case due to the presence of the minimal length.