Recipe to determine symmetries of quadratic fermionic Hamiltonian in second quantisation

Consider an arbitrary 1D chain (of length $N$) of fermions with an arbitrary quadratic Hamiltonian of the form

$$mathcal{H}=hat{Psi}^dagger H hat{Psi}$$

with

$$hat{Psi}=left(a_1, a_2, …,a_N,a_1^dagger, a_2^dagger, …,a_N^dagger right)^T$$

a vector of fermionic operators where $a_n^dagger$ creates a fermion at site $n$.

Are there some straight forward recipes for determining whether the Hamiltonian has any symmetries, specifically chiral, time-reversal, and particle-hole symmetry etc.?