In this work, we have performed two kinematic parametrizations for $Λ(t)$CDM models, namely, the linear expansions $Λ(z)=Λ_0+Λ_1z$ and $Q(z)=Q_0+Q_1z$, where $Q$ is the interaction term. In the case of the $Q(z)$ parametrization, we have also tested the particular case of a constant interaction term, $Q(z)=Q_0$. In order to constrain the free parameters of these models, we have used Cosmic Chronometers (CC), SNe Ia data (Pantheon+\&SH0ES) and BAO data. As a general result, we have found weak constrains over the free parameters of the analysed models. In the case of $Λ(z)$, we have found for the $Λ$ variation parameter, $Ω_{\Lambda1}\equiv\frac{Λ_1}{3H_0^2}=0.02\pm0.14$. In the case of the $Q(z)$ parametrization, we have worked with the dimensionless interaction term $\gQ(z)\equiv\frac{8πGQ(z)}{3H_0^3}$, from which we have found $\gQ_0=0.1\pm5.8$ and $\gQ_1=0.06\pm0.67$. In the particular case of a constant interaction term, we have found $\gQ_0=-0.1\pm5.7$. All these constraints are at 68\% c.l. The constraints we have obtained are compatible with the standard $Λ$CDM model, although still providing a large margin for $Λ$ variation.
