This thesis examines phenomenon on gravity currents propagating into a linearly stratified ambient fluid within 37 various initial conditions of lock-exchange experiments. The given ratio of the depth of released heavy fluid (h) to total depth (H) and the magnitude of stratification (R) have been found that it will dominate the internal Froude number, Fr=V/NH , when gravity currents in the initial constant phase. For subcritical flow, i.e. Fr is less than the critical value 1/π , it means that the constant initial speed of propagation of heavy gravity currents is less than internal wave. And it resulted in an oscillation of the velocity of its leading edge. On the contrast, for supercritical flow, i.e. Fr>1/π , the phenomenon is opposite. And the velocity decay of the current front is monotonic for the geometries tested here. According to the theoretical derivation and the experimental results, in the limit of large R, the current would resemble one penetrating into a homogeneous ambient fluid to simplify the problem. From the dimensionless analysis results, the Froude number can be calculated from the relevant independent variables, ρ_c,〖 ρ〗_0,〖 ρ〗_(b )and h/H . Moreover, as we get the Fr, it is possible to forecast certain characteristic quantities in this study which listed below, including the constant initial speed of propagation, the initial constant phase distance (X_tr) and time (T_tr), the regime (λ) between the current peak in subcritical flow, the number of speed-up times of current after separating from constant phase, and the initial current height (a) when the velocity begins to decrease for all of lock-release gravity currents in a linearly stratified fluid.