YES

# Compositional parallel critical pair system (Shintani and Hirokawa 2022).

Consider the left-linear TRS R:

  a() -> a()
  b() -> h(f(f(f(b()))),h(b(),f(a())))

Let C be the following subset of R:

  a() -> a()
  b() -> h(f(f(f(b()))),h(b(),f(a())))

The parallel critical pair system PCPS(R,C) is:

  (empty)

The TRS R is locally confluent and PCPS(R,C)/R is terminating.
Therefore, the confluence of R follows from that of C.

# Parallel rule labeling (Zankl et al. 2015).

Consider the left-linear TRS R:

  a() -> a()
  b() -> h(f(f(f(b()))),h(b(),f(a())))

All parallel critical peaks (except C's) are decreasing wrt rule labeling:

  phi(a() -> a()) = 1
  phi(b() -> h(f(f(f(b()))),h(b(),f(a())))) = 1

  psi(a() -> a()) = 1
  psi(b() -> h(f(f(f(b()))),h(b(),f(a())))) = 1