Estimating causal effects from observational data in the presence of latent variables sometimes leads to spurious relationships which can be misconceived as causal. This is an important issue in many fields such as finance and climate science. We propose Sequential Causal Effect Variational Autoencoder (SCEVAE), a novel method for time series causality analysis under hidden confounding. It is based on the CEVAE framework and recurrent neural networks. The causal link's intensity of the confounded variables is calculated by using direct causal criteria based on Pearl's do-calculus. We show the efficacy of SCEVAE by applying it to synthetic datasets with both linear and nonlinear causal links. Furthermore, we apply our method to real aerosol-cloud-climate observation data. We compare our approach to a time series deconfounding method with and without substitute confounders on the synthetic data. We demonstrate that our method performs better by comparing both methods to the ground truth. In the case of real data, we use the expert knowledge of causal links and show how the use of correct proxy variables aids data reconstruction.