We define new symbol classes for pseudodifferential operators and investigate their pseudodifferential calculus. The symbol classes are parametrized by commutative convolution algebras. To every solid convolution algebra $𝒜$ over a lattice $\Lambda$ we associate a symbol class $M^{\infty ,𝒜}$. Then every operator with a symbol in $M^{\infty ,𝒜}$ is almost diagonal with respect to special wave packets (coherent states or Gabor frames), and the rate of almost diagonalization is described precisely by the underlying convolution algebra $𝒜$. Furthermore, the corresponding class of pseudodifferential operators is a Banach algebra of bounded operators on $L^2\left({ℝ}^d\right)$. If a version of Wiener’s lemma holds for $𝒜$, then the algebra of pseudodifferential operators is closed under inversion. The theory contains as a special case the fundamental results about Sjöstrand’s class and yields a new proof of a theorem of Beals about the Hörmander class $S_{0,0}^0$.