On NP-complete search problems on finite algebras

We investigate under which structural assumptions on a finite algebra A the problem 3SAT with complexity measure the number of clauses can be reduced to POLSAT(A) in logarithmic space and with a linear growth of the problem size. Our results imply that under the exponential time hypothesis, no two-element algebra of tame congruence theory type 3 has a sub-exponential algorithm to solve a single polynomial equation.